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Modelling handball outcomes using univariate and bivariate approaches
Published 5 Apr 2024 in stat.ME and stat.AP | (2404.04213v1)
Abstract: Handball has received growing interest during the last years, including academic research for many different aspects of the sport. On the other hand modelling the outcome of the game has attracted less interest mainly because of the additional challenges that occur. Data analysis has revealed that the number of goals scored by each team are under-dispersed relative to a Poisson distribution and hence new models are needed for this purpose. Here we propose to circumvent the problem by modelling the score difference. This removes the need for special models since typical models for integer data like the Skellam distribution can provide sufficient fit and thus reveal some of the characteristics of the game. In the present paper we propose some models starting from a Skellam regression model and also considering zero inflated versions as well as other discrete distributions in $\mathbb Z$. Furthermore, we develop some bivariate models using copulas to model the two halves of the game and thus providing insights on the game. Data from German Bundesliga are used to show the potential of the new models.
- Abramowitz, M. and I.A. Stegun. 1974. Handbook of Mathematical Functions. New York: Dover. Barbiero [2014] Barbiero, A. 2014. An alternative discrete skew Laplace distribution. Statistical Methodology 16: 47–67 . Bryson et al. [2021] Bryson, A., P. Dolton, J.J. Reade, D. Schreyer, and C. Singleton. 2021. Causal effects of an absent crowd on performances and refereeing decisions during Covid-19. Economics Letters 198: 109664 . Csató [2021] Csató, L. 2021. Coronavirus and sports leagues: obtaining a fair ranking when the season cannot resume. IMA Journal of Management Mathematics 32(4): 547–560 . Dixon and Coles [1997] Dixon, M.J. and S.G. Coles. 1997. Modelling association football scores and inefficiencies in the football betting market. Journal of the Royal Statistical Society: Series C (Applied Statistics) 46(2): 265–280 . Dumangane et al. [2009] Dumangane, M., N. Rosati, and A. Volossovitch. 2009. Departure from independence and stationarity in a handball match. Journal of Applied Statistics 36(7): 723–741 . Felice [2023] Felice, F. 2023. Ranking handball teams from statistical strength estimation. arXiv preprint arXiv:2307.06754 . Felice and Ley [2023] Felice, F. and C. Ley. 2023. Prediction of handball matches with statistically enhanced learning via estimated team strengths. arXiv preprint arXiv:2307.11777 . Groll et al. [2020] Groll, A., J. Heiner, G. Schauberger, and J. Uhrmeister. 2020. Prediction of the 2019 IHF World Men’s Handball Championship–a sparse Gaussian approximation model. Journal of Sports Analytics 6(3): 187–197 . Holmes and McHale [2024] Holmes, B. and I.G. McHale. 2024. Forecasting football match results using a player rating based model. International Journal of Forecasting 40(1): 302–312 . Irwin [1937] Irwin, J.O. 1937. The frequency distribution of the difference between two independent variates following the same Poisson distribution. Journal of the Royal Statistical Society 100(3): 415–416 . Jiang et al. [2014] Jiang, L., K. Mao, and R. Wu. 2014. A Skellam model to identify differential patterns of gene expression induced by environmental signals. BMC Genomics 15(1): 1–9 . Karlis and Mamode Khan [2023] Karlis, D. and N. Mamode Khan. 2023. Models for integer data. Annual Review of Statistics and its Application 10: 297–323 . Karlis and Ntzoufras [2006] Karlis, D. and I. Ntzoufras. 2006. Bayesian analysis of the differences of count data. Statistics in Medicine 25(11): 1885–1905 . Koopman et al. [2017] Koopman, S.J., R. Lit, and A. Lucas. 2017. Intraday stochastic volatility in discrete price changes: the dynamic Skellam model. Journal of the American Statistical Association 112(520): 1490–1503 . Lago-Peñas et al. [2013] Lago-Peñas, C., M.A. Gomez, J. Viaño, and I. González-García. 2013. Home advantage in elite handball: the impact of the quality of opposition on team performance. International Journal of Performance Analysis in Sport 13(3): 724–733 . Maher [1982] Maher, M.J. 1982. Modelling association football scores. Statistica Neerlandica 36(3): 109–118 . McHale and Scarf [2007] McHale, I. and P. Scarf. 2007. Modelling soccer matches using bivariate discrete distributions with general dependence structure. Statistica Neerlandica 61(4): 432–445 . Michels et al. [2023] Michels, R., M. Ötting, and D. Karlis. 2023. Extending the Dixon and Coles model: an application to women’s football data. arXiv preprint arXiv:2307.02139 . Michels et al. [2023] Michels, R., M. Ötting, and R. Langrock. 2023. Bettors’ reaction to match dynamics: Evidence from in-game betting. European Journal of Operational Research 310(3): 1118–1127 . Ntzoufras et al. [2021] Ntzoufras, I., V. Palaskas, and S. Drikos. 2021. Bayesian models for prediction of the set-difference in volleyball. IMA Journal of Management Mathematics 32(4): 491–518 . Ötting et al. [2024] Ötting, M., R. Michels, R. Langrock, and C. Deutscher. 2024. Demand for live betting: An analysis using state-space models. Applied Stochastic Models in Business and Industry . Pelechrinis and Winston [2021] Pelechrinis, K. and W. Winston. 2021. A Skellam regression model for quantifying positional value in soccer. Journal of Quantitative Analysis in Sports 17(3): 187–201 . Prieto et al. [2016] Prieto, J., M.Á. Gómez, A. Volossovitch, and J. Sampaio. 2016. Effects of team timeouts on the teams’ scoring performance in elite handball close games. Kinesiology 48(1.): 115–123 . Singh et al. [2023] Singh, A., P. Scarf, and R. Baker. 2023. A unified theory for bivariate scores in possessive ball-sports: The case of handball. European Journal of Operational Research 304(3): 1099–1112 . Skellam [1946] Skellam, J. 1946. The frequency distribution of the difference between two Poisson variates belonging to different populations. Journal of the Royal Statistical Society. Series A 109(3): 296–296 . Smiatek and Heuer [2012] Smiatek, J. and A. Heuer. 2012. A statistical view on team handball results: home advantage, team fitness and prediction of match outcomes. arXiv preprint arXiv:1207.0700 . Tomy and Veena [2022] Tomy, L. and G. Veena. 2022. A retrospective study on Skellam and related distributions. Austrian Journal of Statistics 51(1): 102–111 . Van Eetvelde et al. [2023] Van Eetvelde, H., L.M. Hvattum, and C. Ley. 2023. The probabilistic final standing calculator: a fair stochastic tool to handle abruptly stopped football seasons. AStA Advances in Statistical Analysis 107(1-2): 251–269 . Volossovitch and Debanne [2021] Volossovitch, A. and T. Debanne. 2021. Home advantage in handball. Home Advantage in Sport: Causes and the Effect on Performance: 220–227 . Barbiero, A. 2014. An alternative discrete skew Laplace distribution. Statistical Methodology 16: 47–67 . Bryson et al. [2021] Bryson, A., P. Dolton, J.J. Reade, D. Schreyer, and C. Singleton. 2021. Causal effects of an absent crowd on performances and refereeing decisions during Covid-19. Economics Letters 198: 109664 . Csató [2021] Csató, L. 2021. Coronavirus and sports leagues: obtaining a fair ranking when the season cannot resume. IMA Journal of Management Mathematics 32(4): 547–560 . Dixon and Coles [1997] Dixon, M.J. and S.G. Coles. 1997. Modelling association football scores and inefficiencies in the football betting market. Journal of the Royal Statistical Society: Series C (Applied Statistics) 46(2): 265–280 . Dumangane et al. [2009] Dumangane, M., N. Rosati, and A. Volossovitch. 2009. Departure from independence and stationarity in a handball match. Journal of Applied Statistics 36(7): 723–741 . Felice [2023] Felice, F. 2023. Ranking handball teams from statistical strength estimation. arXiv preprint arXiv:2307.06754 . Felice and Ley [2023] Felice, F. and C. Ley. 2023. Prediction of handball matches with statistically enhanced learning via estimated team strengths. arXiv preprint arXiv:2307.11777 . Groll et al. [2020] Groll, A., J. Heiner, G. Schauberger, and J. Uhrmeister. 2020. Prediction of the 2019 IHF World Men’s Handball Championship–a sparse Gaussian approximation model. Journal of Sports Analytics 6(3): 187–197 . Holmes and McHale [2024] Holmes, B. and I.G. McHale. 2024. Forecasting football match results using a player rating based model. International Journal of Forecasting 40(1): 302–312 . Irwin [1937] Irwin, J.O. 1937. The frequency distribution of the difference between two independent variates following the same Poisson distribution. Journal of the Royal Statistical Society 100(3): 415–416 . Jiang et al. [2014] Jiang, L., K. Mao, and R. Wu. 2014. A Skellam model to identify differential patterns of gene expression induced by environmental signals. BMC Genomics 15(1): 1–9 . Karlis and Mamode Khan [2023] Karlis, D. and N. Mamode Khan. 2023. Models for integer data. Annual Review of Statistics and its Application 10: 297–323 . Karlis and Ntzoufras [2006] Karlis, D. and I. Ntzoufras. 2006. Bayesian analysis of the differences of count data. Statistics in Medicine 25(11): 1885–1905 . Koopman et al. [2017] Koopman, S.J., R. Lit, and A. Lucas. 2017. Intraday stochastic volatility in discrete price changes: the dynamic Skellam model. Journal of the American Statistical Association 112(520): 1490–1503 . Lago-Peñas et al. [2013] Lago-Peñas, C., M.A. Gomez, J. Viaño, and I. González-García. 2013. Home advantage in elite handball: the impact of the quality of opposition on team performance. International Journal of Performance Analysis in Sport 13(3): 724–733 . Maher [1982] Maher, M.J. 1982. Modelling association football scores. Statistica Neerlandica 36(3): 109–118 . McHale and Scarf [2007] McHale, I. and P. Scarf. 2007. Modelling soccer matches using bivariate discrete distributions with general dependence structure. Statistica Neerlandica 61(4): 432–445 . Michels et al. [2023] Michels, R., M. Ötting, and D. Karlis. 2023. Extending the Dixon and Coles model: an application to women’s football data. arXiv preprint arXiv:2307.02139 . Michels et al. [2023] Michels, R., M. Ötting, and R. Langrock. 2023. Bettors’ reaction to match dynamics: Evidence from in-game betting. European Journal of Operational Research 310(3): 1118–1127 . Ntzoufras et al. [2021] Ntzoufras, I., V. Palaskas, and S. Drikos. 2021. Bayesian models for prediction of the set-difference in volleyball. IMA Journal of Management Mathematics 32(4): 491–518 . Ötting et al. [2024] Ötting, M., R. Michels, R. Langrock, and C. Deutscher. 2024. Demand for live betting: An analysis using state-space models. Applied Stochastic Models in Business and Industry . Pelechrinis and Winston [2021] Pelechrinis, K. and W. Winston. 2021. A Skellam regression model for quantifying positional value in soccer. Journal of Quantitative Analysis in Sports 17(3): 187–201 . Prieto et al. [2016] Prieto, J., M.Á. Gómez, A. Volossovitch, and J. Sampaio. 2016. Effects of team timeouts on the teams’ scoring performance in elite handball close games. Kinesiology 48(1.): 115–123 . Singh et al. [2023] Singh, A., P. Scarf, and R. Baker. 2023. A unified theory for bivariate scores in possessive ball-sports: The case of handball. European Journal of Operational Research 304(3): 1099–1112 . Skellam [1946] Skellam, J. 1946. The frequency distribution of the difference between two Poisson variates belonging to different populations. Journal of the Royal Statistical Society. Series A 109(3): 296–296 . Smiatek and Heuer [2012] Smiatek, J. and A. Heuer. 2012. A statistical view on team handball results: home advantage, team fitness and prediction of match outcomes. arXiv preprint arXiv:1207.0700 . Tomy and Veena [2022] Tomy, L. and G. Veena. 2022. A retrospective study on Skellam and related distributions. Austrian Journal of Statistics 51(1): 102–111 . Van Eetvelde et al. [2023] Van Eetvelde, H., L.M. Hvattum, and C. Ley. 2023. The probabilistic final standing calculator: a fair stochastic tool to handle abruptly stopped football seasons. AStA Advances in Statistical Analysis 107(1-2): 251–269 . Volossovitch and Debanne [2021] Volossovitch, A. and T. Debanne. 2021. Home advantage in handball. Home Advantage in Sport: Causes and the Effect on Performance: 220–227 . Bryson, A., P. Dolton, J.J. Reade, D. Schreyer, and C. Singleton. 2021. Causal effects of an absent crowd on performances and refereeing decisions during Covid-19. Economics Letters 198: 109664 . Csató [2021] Csató, L. 2021. Coronavirus and sports leagues: obtaining a fair ranking when the season cannot resume. IMA Journal of Management Mathematics 32(4): 547–560 . Dixon and Coles [1997] Dixon, M.J. and S.G. Coles. 1997. Modelling association football scores and inefficiencies in the football betting market. Journal of the Royal Statistical Society: Series C (Applied Statistics) 46(2): 265–280 . Dumangane et al. [2009] Dumangane, M., N. Rosati, and A. Volossovitch. 2009. Departure from independence and stationarity in a handball match. Journal of Applied Statistics 36(7): 723–741 . Felice [2023] Felice, F. 2023. Ranking handball teams from statistical strength estimation. arXiv preprint arXiv:2307.06754 . Felice and Ley [2023] Felice, F. and C. Ley. 2023. Prediction of handball matches with statistically enhanced learning via estimated team strengths. arXiv preprint arXiv:2307.11777 . Groll et al. [2020] Groll, A., J. Heiner, G. Schauberger, and J. Uhrmeister. 2020. Prediction of the 2019 IHF World Men’s Handball Championship–a sparse Gaussian approximation model. Journal of Sports Analytics 6(3): 187–197 . Holmes and McHale [2024] Holmes, B. and I.G. McHale. 2024. Forecasting football match results using a player rating based model. International Journal of Forecasting 40(1): 302–312 . Irwin [1937] Irwin, J.O. 1937. The frequency distribution of the difference between two independent variates following the same Poisson distribution. Journal of the Royal Statistical Society 100(3): 415–416 . Jiang et al. [2014] Jiang, L., K. Mao, and R. Wu. 2014. A Skellam model to identify differential patterns of gene expression induced by environmental signals. BMC Genomics 15(1): 1–9 . Karlis and Mamode Khan [2023] Karlis, D. and N. Mamode Khan. 2023. Models for integer data. Annual Review of Statistics and its Application 10: 297–323 . Karlis and Ntzoufras [2006] Karlis, D. and I. Ntzoufras. 2006. Bayesian analysis of the differences of count data. Statistics in Medicine 25(11): 1885–1905 . Koopman et al. [2017] Koopman, S.J., R. Lit, and A. Lucas. 2017. Intraday stochastic volatility in discrete price changes: the dynamic Skellam model. Journal of the American Statistical Association 112(520): 1490–1503 . Lago-Peñas et al. [2013] Lago-Peñas, C., M.A. Gomez, J. Viaño, and I. González-García. 2013. Home advantage in elite handball: the impact of the quality of opposition on team performance. International Journal of Performance Analysis in Sport 13(3): 724–733 . Maher [1982] Maher, M.J. 1982. Modelling association football scores. Statistica Neerlandica 36(3): 109–118 . McHale and Scarf [2007] McHale, I. and P. Scarf. 2007. Modelling soccer matches using bivariate discrete distributions with general dependence structure. Statistica Neerlandica 61(4): 432–445 . Michels et al. [2023] Michels, R., M. Ötting, and D. Karlis. 2023. Extending the Dixon and Coles model: an application to women’s football data. arXiv preprint arXiv:2307.02139 . Michels et al. [2023] Michels, R., M. Ötting, and R. Langrock. 2023. Bettors’ reaction to match dynamics: Evidence from in-game betting. European Journal of Operational Research 310(3): 1118–1127 . Ntzoufras et al. [2021] Ntzoufras, I., V. Palaskas, and S. Drikos. 2021. Bayesian models for prediction of the set-difference in volleyball. IMA Journal of Management Mathematics 32(4): 491–518 . Ötting et al. [2024] Ötting, M., R. Michels, R. Langrock, and C. Deutscher. 2024. Demand for live betting: An analysis using state-space models. Applied Stochastic Models in Business and Industry . Pelechrinis and Winston [2021] Pelechrinis, K. and W. Winston. 2021. A Skellam regression model for quantifying positional value in soccer. Journal of Quantitative Analysis in Sports 17(3): 187–201 . Prieto et al. [2016] Prieto, J., M.Á. Gómez, A. Volossovitch, and J. Sampaio. 2016. Effects of team timeouts on the teams’ scoring performance in elite handball close games. Kinesiology 48(1.): 115–123 . Singh et al. [2023] Singh, A., P. Scarf, and R. Baker. 2023. A unified theory for bivariate scores in possessive ball-sports: The case of handball. European Journal of Operational Research 304(3): 1099–1112 . Skellam [1946] Skellam, J. 1946. The frequency distribution of the difference between two Poisson variates belonging to different populations. Journal of the Royal Statistical Society. Series A 109(3): 296–296 . Smiatek and Heuer [2012] Smiatek, J. and A. Heuer. 2012. A statistical view on team handball results: home advantage, team fitness and prediction of match outcomes. arXiv preprint arXiv:1207.0700 . Tomy and Veena [2022] Tomy, L. and G. Veena. 2022. A retrospective study on Skellam and related distributions. Austrian Journal of Statistics 51(1): 102–111 . Van Eetvelde et al. [2023] Van Eetvelde, H., L.M. Hvattum, and C. Ley. 2023. The probabilistic final standing calculator: a fair stochastic tool to handle abruptly stopped football seasons. AStA Advances in Statistical Analysis 107(1-2): 251–269 . Volossovitch and Debanne [2021] Volossovitch, A. and T. Debanne. 2021. Home advantage in handball. Home Advantage in Sport: Causes and the Effect on Performance: 220–227 . Csató, L. 2021. Coronavirus and sports leagues: obtaining a fair ranking when the season cannot resume. IMA Journal of Management Mathematics 32(4): 547–560 . Dixon and Coles [1997] Dixon, M.J. and S.G. Coles. 1997. Modelling association football scores and inefficiencies in the football betting market. Journal of the Royal Statistical Society: Series C (Applied Statistics) 46(2): 265–280 . Dumangane et al. [2009] Dumangane, M., N. Rosati, and A. Volossovitch. 2009. Departure from independence and stationarity in a handball match. Journal of Applied Statistics 36(7): 723–741 . Felice [2023] Felice, F. 2023. Ranking handball teams from statistical strength estimation. arXiv preprint arXiv:2307.06754 . Felice and Ley [2023] Felice, F. and C. Ley. 2023. Prediction of handball matches with statistically enhanced learning via estimated team strengths. arXiv preprint arXiv:2307.11777 . Groll et al. [2020] Groll, A., J. Heiner, G. Schauberger, and J. Uhrmeister. 2020. Prediction of the 2019 IHF World Men’s Handball Championship–a sparse Gaussian approximation model. Journal of Sports Analytics 6(3): 187–197 . Holmes and McHale [2024] Holmes, B. and I.G. McHale. 2024. Forecasting football match results using a player rating based model. International Journal of Forecasting 40(1): 302–312 . Irwin [1937] Irwin, J.O. 1937. The frequency distribution of the difference between two independent variates following the same Poisson distribution. Journal of the Royal Statistical Society 100(3): 415–416 . Jiang et al. [2014] Jiang, L., K. Mao, and R. Wu. 2014. A Skellam model to identify differential patterns of gene expression induced by environmental signals. BMC Genomics 15(1): 1–9 . Karlis and Mamode Khan [2023] Karlis, D. and N. Mamode Khan. 2023. Models for integer data. Annual Review of Statistics and its Application 10: 297–323 . Karlis and Ntzoufras [2006] Karlis, D. and I. Ntzoufras. 2006. Bayesian analysis of the differences of count data. Statistics in Medicine 25(11): 1885–1905 . Koopman et al. [2017] Koopman, S.J., R. Lit, and A. Lucas. 2017. Intraday stochastic volatility in discrete price changes: the dynamic Skellam model. Journal of the American Statistical Association 112(520): 1490–1503 . Lago-Peñas et al. [2013] Lago-Peñas, C., M.A. Gomez, J. Viaño, and I. González-García. 2013. Home advantage in elite handball: the impact of the quality of opposition on team performance. International Journal of Performance Analysis in Sport 13(3): 724–733 . Maher [1982] Maher, M.J. 1982. Modelling association football scores. Statistica Neerlandica 36(3): 109–118 . McHale and Scarf [2007] McHale, I. and P. Scarf. 2007. Modelling soccer matches using bivariate discrete distributions with general dependence structure. Statistica Neerlandica 61(4): 432–445 . Michels et al. [2023] Michels, R., M. Ötting, and D. Karlis. 2023. Extending the Dixon and Coles model: an application to women’s football data. arXiv preprint arXiv:2307.02139 . Michels et al. [2023] Michels, R., M. Ötting, and R. Langrock. 2023. Bettors’ reaction to match dynamics: Evidence from in-game betting. European Journal of Operational Research 310(3): 1118–1127 . Ntzoufras et al. [2021] Ntzoufras, I., V. Palaskas, and S. Drikos. 2021. Bayesian models for prediction of the set-difference in volleyball. IMA Journal of Management Mathematics 32(4): 491–518 . Ötting et al. [2024] Ötting, M., R. Michels, R. Langrock, and C. Deutscher. 2024. Demand for live betting: An analysis using state-space models. Applied Stochastic Models in Business and Industry . Pelechrinis and Winston [2021] Pelechrinis, K. and W. Winston. 2021. A Skellam regression model for quantifying positional value in soccer. Journal of Quantitative Analysis in Sports 17(3): 187–201 . Prieto et al. [2016] Prieto, J., M.Á. Gómez, A. Volossovitch, and J. Sampaio. 2016. Effects of team timeouts on the teams’ scoring performance in elite handball close games. Kinesiology 48(1.): 115–123 . Singh et al. [2023] Singh, A., P. Scarf, and R. Baker. 2023. A unified theory for bivariate scores in possessive ball-sports: The case of handball. European Journal of Operational Research 304(3): 1099–1112 . Skellam [1946] Skellam, J. 1946. The frequency distribution of the difference between two Poisson variates belonging to different populations. Journal of the Royal Statistical Society. Series A 109(3): 296–296 . Smiatek and Heuer [2012] Smiatek, J. and A. Heuer. 2012. A statistical view on team handball results: home advantage, team fitness and prediction of match outcomes. arXiv preprint arXiv:1207.0700 . Tomy and Veena [2022] Tomy, L. and G. Veena. 2022. A retrospective study on Skellam and related distributions. Austrian Journal of Statistics 51(1): 102–111 . Van Eetvelde et al. [2023] Van Eetvelde, H., L.M. Hvattum, and C. Ley. 2023. The probabilistic final standing calculator: a fair stochastic tool to handle abruptly stopped football seasons. AStA Advances in Statistical Analysis 107(1-2): 251–269 . Volossovitch and Debanne [2021] Volossovitch, A. and T. Debanne. 2021. Home advantage in handball. Home Advantage in Sport: Causes and the Effect on Performance: 220–227 . Dixon, M.J. and S.G. Coles. 1997. Modelling association football scores and inefficiencies in the football betting market. Journal of the Royal Statistical Society: Series C (Applied Statistics) 46(2): 265–280 . Dumangane et al. [2009] Dumangane, M., N. Rosati, and A. Volossovitch. 2009. Departure from independence and stationarity in a handball match. Journal of Applied Statistics 36(7): 723–741 . Felice [2023] Felice, F. 2023. Ranking handball teams from statistical strength estimation. arXiv preprint arXiv:2307.06754 . Felice and Ley [2023] Felice, F. and C. Ley. 2023. Prediction of handball matches with statistically enhanced learning via estimated team strengths. arXiv preprint arXiv:2307.11777 . Groll et al. [2020] Groll, A., J. Heiner, G. Schauberger, and J. Uhrmeister. 2020. Prediction of the 2019 IHF World Men’s Handball Championship–a sparse Gaussian approximation model. Journal of Sports Analytics 6(3): 187–197 . Holmes and McHale [2024] Holmes, B. and I.G. McHale. 2024. Forecasting football match results using a player rating based model. International Journal of Forecasting 40(1): 302–312 . Irwin [1937] Irwin, J.O. 1937. The frequency distribution of the difference between two independent variates following the same Poisson distribution. Journal of the Royal Statistical Society 100(3): 415–416 . Jiang et al. [2014] Jiang, L., K. Mao, and R. Wu. 2014. A Skellam model to identify differential patterns of gene expression induced by environmental signals. BMC Genomics 15(1): 1–9 . Karlis and Mamode Khan [2023] Karlis, D. and N. Mamode Khan. 2023. Models for integer data. Annual Review of Statistics and its Application 10: 297–323 . Karlis and Ntzoufras [2006] Karlis, D. and I. Ntzoufras. 2006. Bayesian analysis of the differences of count data. Statistics in Medicine 25(11): 1885–1905 . Koopman et al. [2017] Koopman, S.J., R. Lit, and A. Lucas. 2017. Intraday stochastic volatility in discrete price changes: the dynamic Skellam model. Journal of the American Statistical Association 112(520): 1490–1503 . Lago-Peñas et al. [2013] Lago-Peñas, C., M.A. Gomez, J. Viaño, and I. González-García. 2013. Home advantage in elite handball: the impact of the quality of opposition on team performance. International Journal of Performance Analysis in Sport 13(3): 724–733 . Maher [1982] Maher, M.J. 1982. Modelling association football scores. Statistica Neerlandica 36(3): 109–118 . McHale and Scarf [2007] McHale, I. and P. Scarf. 2007. Modelling soccer matches using bivariate discrete distributions with general dependence structure. Statistica Neerlandica 61(4): 432–445 . Michels et al. [2023] Michels, R., M. Ötting, and D. Karlis. 2023. Extending the Dixon and Coles model: an application to women’s football data. arXiv preprint arXiv:2307.02139 . Michels et al. [2023] Michels, R., M. Ötting, and R. Langrock. 2023. Bettors’ reaction to match dynamics: Evidence from in-game betting. European Journal of Operational Research 310(3): 1118–1127 . Ntzoufras et al. [2021] Ntzoufras, I., V. Palaskas, and S. Drikos. 2021. Bayesian models for prediction of the set-difference in volleyball. IMA Journal of Management Mathematics 32(4): 491–518 . Ötting et al. [2024] Ötting, M., R. Michels, R. Langrock, and C. Deutscher. 2024. Demand for live betting: An analysis using state-space models. Applied Stochastic Models in Business and Industry . Pelechrinis and Winston [2021] Pelechrinis, K. and W. Winston. 2021. A Skellam regression model for quantifying positional value in soccer. Journal of Quantitative Analysis in Sports 17(3): 187–201 . Prieto et al. [2016] Prieto, J., M.Á. Gómez, A. Volossovitch, and J. Sampaio. 2016. Effects of team timeouts on the teams’ scoring performance in elite handball close games. Kinesiology 48(1.): 115–123 . Singh et al. [2023] Singh, A., P. Scarf, and R. Baker. 2023. A unified theory for bivariate scores in possessive ball-sports: The case of handball. European Journal of Operational Research 304(3): 1099–1112 . Skellam [1946] Skellam, J. 1946. The frequency distribution of the difference between two Poisson variates belonging to different populations. Journal of the Royal Statistical Society. Series A 109(3): 296–296 . Smiatek and Heuer [2012] Smiatek, J. and A. Heuer. 2012. A statistical view on team handball results: home advantage, team fitness and prediction of match outcomes. arXiv preprint arXiv:1207.0700 . Tomy and Veena [2022] Tomy, L. and G. Veena. 2022. A retrospective study on Skellam and related distributions. Austrian Journal of Statistics 51(1): 102–111 . Van Eetvelde et al. [2023] Van Eetvelde, H., L.M. Hvattum, and C. Ley. 2023. The probabilistic final standing calculator: a fair stochastic tool to handle abruptly stopped football seasons. AStA Advances in Statistical Analysis 107(1-2): 251–269 . Volossovitch and Debanne [2021] Volossovitch, A. and T. Debanne. 2021. Home advantage in handball. Home Advantage in Sport: Causes and the Effect on Performance: 220–227 . Dumangane, M., N. Rosati, and A. Volossovitch. 2009. Departure from independence and stationarity in a handball match. Journal of Applied Statistics 36(7): 723–741 . Felice [2023] Felice, F. 2023. Ranking handball teams from statistical strength estimation. arXiv preprint arXiv:2307.06754 . Felice and Ley [2023] Felice, F. and C. Ley. 2023. Prediction of handball matches with statistically enhanced learning via estimated team strengths. arXiv preprint arXiv:2307.11777 . Groll et al. [2020] Groll, A., J. Heiner, G. Schauberger, and J. Uhrmeister. 2020. Prediction of the 2019 IHF World Men’s Handball Championship–a sparse Gaussian approximation model. Journal of Sports Analytics 6(3): 187–197 . Holmes and McHale [2024] Holmes, B. and I.G. McHale. 2024. Forecasting football match results using a player rating based model. International Journal of Forecasting 40(1): 302–312 . Irwin [1937] Irwin, J.O. 1937. The frequency distribution of the difference between two independent variates following the same Poisson distribution. Journal of the Royal Statistical Society 100(3): 415–416 . Jiang et al. [2014] Jiang, L., K. Mao, and R. Wu. 2014. A Skellam model to identify differential patterns of gene expression induced by environmental signals. BMC Genomics 15(1): 1–9 . Karlis and Mamode Khan [2023] Karlis, D. and N. Mamode Khan. 2023. Models for integer data. Annual Review of Statistics and its Application 10: 297–323 . Karlis and Ntzoufras [2006] Karlis, D. and I. Ntzoufras. 2006. Bayesian analysis of the differences of count data. Statistics in Medicine 25(11): 1885–1905 . Koopman et al. [2017] Koopman, S.J., R. Lit, and A. Lucas. 2017. Intraday stochastic volatility in discrete price changes: the dynamic Skellam model. Journal of the American Statistical Association 112(520): 1490–1503 . Lago-Peñas et al. [2013] Lago-Peñas, C., M.A. Gomez, J. Viaño, and I. González-García. 2013. Home advantage in elite handball: the impact of the quality of opposition on team performance. International Journal of Performance Analysis in Sport 13(3): 724–733 . Maher [1982] Maher, M.J. 1982. Modelling association football scores. Statistica Neerlandica 36(3): 109–118 . McHale and Scarf [2007] McHale, I. and P. Scarf. 2007. Modelling soccer matches using bivariate discrete distributions with general dependence structure. Statistica Neerlandica 61(4): 432–445 . Michels et al. [2023] Michels, R., M. Ötting, and D. Karlis. 2023. Extending the Dixon and Coles model: an application to women’s football data. arXiv preprint arXiv:2307.02139 . Michels et al. [2023] Michels, R., M. Ötting, and R. Langrock. 2023. Bettors’ reaction to match dynamics: Evidence from in-game betting. European Journal of Operational Research 310(3): 1118–1127 . Ntzoufras et al. [2021] Ntzoufras, I., V. Palaskas, and S. Drikos. 2021. Bayesian models for prediction of the set-difference in volleyball. IMA Journal of Management Mathematics 32(4): 491–518 . Ötting et al. [2024] Ötting, M., R. Michels, R. Langrock, and C. Deutscher. 2024. Demand for live betting: An analysis using state-space models. Applied Stochastic Models in Business and Industry . Pelechrinis and Winston [2021] Pelechrinis, K. and W. Winston. 2021. A Skellam regression model for quantifying positional value in soccer. Journal of Quantitative Analysis in Sports 17(3): 187–201 . Prieto et al. [2016] Prieto, J., M.Á. Gómez, A. Volossovitch, and J. Sampaio. 2016. Effects of team timeouts on the teams’ scoring performance in elite handball close games. Kinesiology 48(1.): 115–123 . Singh et al. [2023] Singh, A., P. Scarf, and R. Baker. 2023. A unified theory for bivariate scores in possessive ball-sports: The case of handball. European Journal of Operational Research 304(3): 1099–1112 . Skellam [1946] Skellam, J. 1946. The frequency distribution of the difference between two Poisson variates belonging to different populations. Journal of the Royal Statistical Society. Series A 109(3): 296–296 . Smiatek and Heuer [2012] Smiatek, J. and A. Heuer. 2012. A statistical view on team handball results: home advantage, team fitness and prediction of match outcomes. arXiv preprint arXiv:1207.0700 . Tomy and Veena [2022] Tomy, L. and G. Veena. 2022. A retrospective study on Skellam and related distributions. Austrian Journal of Statistics 51(1): 102–111 . Van Eetvelde et al. [2023] Van Eetvelde, H., L.M. Hvattum, and C. Ley. 2023. The probabilistic final standing calculator: a fair stochastic tool to handle abruptly stopped football seasons. AStA Advances in Statistical Analysis 107(1-2): 251–269 . Volossovitch and Debanne [2021] Volossovitch, A. and T. Debanne. 2021. Home advantage in handball. Home Advantage in Sport: Causes and the Effect on Performance: 220–227 . Felice, F. 2023. Ranking handball teams from statistical strength estimation. arXiv preprint arXiv:2307.06754 . Felice and Ley [2023] Felice, F. and C. Ley. 2023. Prediction of handball matches with statistically enhanced learning via estimated team strengths. arXiv preprint arXiv:2307.11777 . Groll et al. [2020] Groll, A., J. Heiner, G. Schauberger, and J. Uhrmeister. 2020. Prediction of the 2019 IHF World Men’s Handball Championship–a sparse Gaussian approximation model. Journal of Sports Analytics 6(3): 187–197 . Holmes and McHale [2024] Holmes, B. and I.G. McHale. 2024. Forecasting football match results using a player rating based model. International Journal of Forecasting 40(1): 302–312 . Irwin [1937] Irwin, J.O. 1937. The frequency distribution of the difference between two independent variates following the same Poisson distribution. Journal of the Royal Statistical Society 100(3): 415–416 . Jiang et al. [2014] Jiang, L., K. Mao, and R. Wu. 2014. A Skellam model to identify differential patterns of gene expression induced by environmental signals. BMC Genomics 15(1): 1–9 . Karlis and Mamode Khan [2023] Karlis, D. and N. Mamode Khan. 2023. Models for integer data. Annual Review of Statistics and its Application 10: 297–323 . Karlis and Ntzoufras [2006] Karlis, D. and I. Ntzoufras. 2006. Bayesian analysis of the differences of count data. Statistics in Medicine 25(11): 1885–1905 . Koopman et al. [2017] Koopman, S.J., R. Lit, and A. Lucas. 2017. Intraday stochastic volatility in discrete price changes: the dynamic Skellam model. Journal of the American Statistical Association 112(520): 1490–1503 . Lago-Peñas et al. [2013] Lago-Peñas, C., M.A. Gomez, J. Viaño, and I. González-García. 2013. Home advantage in elite handball: the impact of the quality of opposition on team performance. International Journal of Performance Analysis in Sport 13(3): 724–733 . Maher [1982] Maher, M.J. 1982. Modelling association football scores. Statistica Neerlandica 36(3): 109–118 . McHale and Scarf [2007] McHale, I. and P. Scarf. 2007. Modelling soccer matches using bivariate discrete distributions with general dependence structure. Statistica Neerlandica 61(4): 432–445 . Michels et al. [2023] Michels, R., M. Ötting, and D. Karlis. 2023. Extending the Dixon and Coles model: an application to women’s football data. arXiv preprint arXiv:2307.02139 . Michels et al. [2023] Michels, R., M. Ötting, and R. Langrock. 2023. Bettors’ reaction to match dynamics: Evidence from in-game betting. European Journal of Operational Research 310(3): 1118–1127 . Ntzoufras et al. [2021] Ntzoufras, I., V. Palaskas, and S. Drikos. 2021. Bayesian models for prediction of the set-difference in volleyball. IMA Journal of Management Mathematics 32(4): 491–518 . Ötting et al. [2024] Ötting, M., R. Michels, R. Langrock, and C. Deutscher. 2024. Demand for live betting: An analysis using state-space models. Applied Stochastic Models in Business and Industry . Pelechrinis and Winston [2021] Pelechrinis, K. and W. Winston. 2021. A Skellam regression model for quantifying positional value in soccer. Journal of Quantitative Analysis in Sports 17(3): 187–201 . Prieto et al. [2016] Prieto, J., M.Á. Gómez, A. Volossovitch, and J. Sampaio. 2016. Effects of team timeouts on the teams’ scoring performance in elite handball close games. Kinesiology 48(1.): 115–123 . Singh et al. [2023] Singh, A., P. Scarf, and R. Baker. 2023. A unified theory for bivariate scores in possessive ball-sports: The case of handball. European Journal of Operational Research 304(3): 1099–1112 . Skellam [1946] Skellam, J. 1946. The frequency distribution of the difference between two Poisson variates belonging to different populations. Journal of the Royal Statistical Society. Series A 109(3): 296–296 . Smiatek and Heuer [2012] Smiatek, J. and A. Heuer. 2012. A statistical view on team handball results: home advantage, team fitness and prediction of match outcomes. arXiv preprint arXiv:1207.0700 . Tomy and Veena [2022] Tomy, L. and G. Veena. 2022. A retrospective study on Skellam and related distributions. Austrian Journal of Statistics 51(1): 102–111 . Van Eetvelde et al. [2023] Van Eetvelde, H., L.M. Hvattum, and C. Ley. 2023. The probabilistic final standing calculator: a fair stochastic tool to handle abruptly stopped football seasons. AStA Advances in Statistical Analysis 107(1-2): 251–269 . Volossovitch and Debanne [2021] Volossovitch, A. and T. Debanne. 2021. Home advantage in handball. Home Advantage in Sport: Causes and the Effect on Performance: 220–227 . Felice, F. and C. Ley. 2023. Prediction of handball matches with statistically enhanced learning via estimated team strengths. arXiv preprint arXiv:2307.11777 . Groll et al. [2020] Groll, A., J. Heiner, G. Schauberger, and J. Uhrmeister. 2020. Prediction of the 2019 IHF World Men’s Handball Championship–a sparse Gaussian approximation model. Journal of Sports Analytics 6(3): 187–197 . Holmes and McHale [2024] Holmes, B. and I.G. McHale. 2024. Forecasting football match results using a player rating based model. International Journal of Forecasting 40(1): 302–312 . Irwin [1937] Irwin, J.O. 1937. The frequency distribution of the difference between two independent variates following the same Poisson distribution. Journal of the Royal Statistical Society 100(3): 415–416 . Jiang et al. [2014] Jiang, L., K. Mao, and R. Wu. 2014. A Skellam model to identify differential patterns of gene expression induced by environmental signals. BMC Genomics 15(1): 1–9 . Karlis and Mamode Khan [2023] Karlis, D. and N. Mamode Khan. 2023. Models for integer data. Annual Review of Statistics and its Application 10: 297–323 . Karlis and Ntzoufras [2006] Karlis, D. and I. Ntzoufras. 2006. Bayesian analysis of the differences of count data. Statistics in Medicine 25(11): 1885–1905 . Koopman et al. [2017] Koopman, S.J., R. Lit, and A. Lucas. 2017. Intraday stochastic volatility in discrete price changes: the dynamic Skellam model. Journal of the American Statistical Association 112(520): 1490–1503 . Lago-Peñas et al. [2013] Lago-Peñas, C., M.A. Gomez, J. Viaño, and I. González-García. 2013. Home advantage in elite handball: the impact of the quality of opposition on team performance. International Journal of Performance Analysis in Sport 13(3): 724–733 . Maher [1982] Maher, M.J. 1982. Modelling association football scores. Statistica Neerlandica 36(3): 109–118 . McHale and Scarf [2007] McHale, I. and P. Scarf. 2007. Modelling soccer matches using bivariate discrete distributions with general dependence structure. Statistica Neerlandica 61(4): 432–445 . Michels et al. [2023] Michels, R., M. Ötting, and D. Karlis. 2023. Extending the Dixon and Coles model: an application to women’s football data. arXiv preprint arXiv:2307.02139 . Michels et al. [2023] Michels, R., M. Ötting, and R. Langrock. 2023. Bettors’ reaction to match dynamics: Evidence from in-game betting. European Journal of Operational Research 310(3): 1118–1127 . Ntzoufras et al. [2021] Ntzoufras, I., V. Palaskas, and S. Drikos. 2021. Bayesian models for prediction of the set-difference in volleyball. IMA Journal of Management Mathematics 32(4): 491–518 . Ötting et al. [2024] Ötting, M., R. Michels, R. Langrock, and C. Deutscher. 2024. Demand for live betting: An analysis using state-space models. Applied Stochastic Models in Business and Industry . Pelechrinis and Winston [2021] Pelechrinis, K. and W. Winston. 2021. A Skellam regression model for quantifying positional value in soccer. Journal of Quantitative Analysis in Sports 17(3): 187–201 . Prieto et al. [2016] Prieto, J., M.Á. Gómez, A. Volossovitch, and J. Sampaio. 2016. Effects of team timeouts on the teams’ scoring performance in elite handball close games. Kinesiology 48(1.): 115–123 . Singh et al. [2023] Singh, A., P. Scarf, and R. Baker. 2023. A unified theory for bivariate scores in possessive ball-sports: The case of handball. European Journal of Operational Research 304(3): 1099–1112 . Skellam [1946] Skellam, J. 1946. The frequency distribution of the difference between two Poisson variates belonging to different populations. Journal of the Royal Statistical Society. Series A 109(3): 296–296 . Smiatek and Heuer [2012] Smiatek, J. and A. Heuer. 2012. A statistical view on team handball results: home advantage, team fitness and prediction of match outcomes. arXiv preprint arXiv:1207.0700 . Tomy and Veena [2022] Tomy, L. and G. Veena. 2022. A retrospective study on Skellam and related distributions. Austrian Journal of Statistics 51(1): 102–111 . Van Eetvelde et al. [2023] Van Eetvelde, H., L.M. Hvattum, and C. Ley. 2023. The probabilistic final standing calculator: a fair stochastic tool to handle abruptly stopped football seasons. AStA Advances in Statistical Analysis 107(1-2): 251–269 . Volossovitch and Debanne [2021] Volossovitch, A. and T. Debanne. 2021. Home advantage in handball. Home Advantage in Sport: Causes and the Effect on Performance: 220–227 . Groll, A., J. Heiner, G. Schauberger, and J. Uhrmeister. 2020. Prediction of the 2019 IHF World Men’s Handball Championship–a sparse Gaussian approximation model. Journal of Sports Analytics 6(3): 187–197 . Holmes and McHale [2024] Holmes, B. and I.G. McHale. 2024. Forecasting football match results using a player rating based model. International Journal of Forecasting 40(1): 302–312 . Irwin [1937] Irwin, J.O. 1937. The frequency distribution of the difference between two independent variates following the same Poisson distribution. Journal of the Royal Statistical Society 100(3): 415–416 . Jiang et al. [2014] Jiang, L., K. Mao, and R. Wu. 2014. A Skellam model to identify differential patterns of gene expression induced by environmental signals. BMC Genomics 15(1): 1–9 . Karlis and Mamode Khan [2023] Karlis, D. and N. Mamode Khan. 2023. Models for integer data. Annual Review of Statistics and its Application 10: 297–323 . Karlis and Ntzoufras [2006] Karlis, D. and I. Ntzoufras. 2006. Bayesian analysis of the differences of count data. Statistics in Medicine 25(11): 1885–1905 . Koopman et al. [2017] Koopman, S.J., R. Lit, and A. Lucas. 2017. Intraday stochastic volatility in discrete price changes: the dynamic Skellam model. Journal of the American Statistical Association 112(520): 1490–1503 . Lago-Peñas et al. [2013] Lago-Peñas, C., M.A. Gomez, J. Viaño, and I. González-García. 2013. Home advantage in elite handball: the impact of the quality of opposition on team performance. International Journal of Performance Analysis in Sport 13(3): 724–733 . Maher [1982] Maher, M.J. 1982. Modelling association football scores. Statistica Neerlandica 36(3): 109–118 . McHale and Scarf [2007] McHale, I. and P. Scarf. 2007. Modelling soccer matches using bivariate discrete distributions with general dependence structure. Statistica Neerlandica 61(4): 432–445 . Michels et al. [2023] Michels, R., M. Ötting, and D. Karlis. 2023. Extending the Dixon and Coles model: an application to women’s football data. arXiv preprint arXiv:2307.02139 . Michels et al. [2023] Michels, R., M. Ötting, and R. Langrock. 2023. Bettors’ reaction to match dynamics: Evidence from in-game betting. European Journal of Operational Research 310(3): 1118–1127 . Ntzoufras et al. [2021] Ntzoufras, I., V. Palaskas, and S. Drikos. 2021. Bayesian models for prediction of the set-difference in volleyball. IMA Journal of Management Mathematics 32(4): 491–518 . Ötting et al. [2024] Ötting, M., R. Michels, R. Langrock, and C. Deutscher. 2024. Demand for live betting: An analysis using state-space models. Applied Stochastic Models in Business and Industry . Pelechrinis and Winston [2021] Pelechrinis, K. and W. Winston. 2021. A Skellam regression model for quantifying positional value in soccer. Journal of Quantitative Analysis in Sports 17(3): 187–201 . Prieto et al. [2016] Prieto, J., M.Á. Gómez, A. Volossovitch, and J. Sampaio. 2016. Effects of team timeouts on the teams’ scoring performance in elite handball close games. Kinesiology 48(1.): 115–123 . Singh et al. [2023] Singh, A., P. Scarf, and R. Baker. 2023. A unified theory for bivariate scores in possessive ball-sports: The case of handball. European Journal of Operational Research 304(3): 1099–1112 . Skellam [1946] Skellam, J. 1946. The frequency distribution of the difference between two Poisson variates belonging to different populations. Journal of the Royal Statistical Society. Series A 109(3): 296–296 . Smiatek and Heuer [2012] Smiatek, J. and A. Heuer. 2012. A statistical view on team handball results: home advantage, team fitness and prediction of match outcomes. arXiv preprint arXiv:1207.0700 . Tomy and Veena [2022] Tomy, L. and G. Veena. 2022. A retrospective study on Skellam and related distributions. Austrian Journal of Statistics 51(1): 102–111 . Van Eetvelde et al. [2023] Van Eetvelde, H., L.M. Hvattum, and C. Ley. 2023. The probabilistic final standing calculator: a fair stochastic tool to handle abruptly stopped football seasons. AStA Advances in Statistical Analysis 107(1-2): 251–269 . Volossovitch and Debanne [2021] Volossovitch, A. and T. Debanne. 2021. Home advantage in handball. Home Advantage in Sport: Causes and the Effect on Performance: 220–227 . Holmes, B. and I.G. McHale. 2024. Forecasting football match results using a player rating based model. International Journal of Forecasting 40(1): 302–312 . Irwin [1937] Irwin, J.O. 1937. The frequency distribution of the difference between two independent variates following the same Poisson distribution. Journal of the Royal Statistical Society 100(3): 415–416 . Jiang et al. [2014] Jiang, L., K. Mao, and R. Wu. 2014. A Skellam model to identify differential patterns of gene expression induced by environmental signals. BMC Genomics 15(1): 1–9 . Karlis and Mamode Khan [2023] Karlis, D. and N. Mamode Khan. 2023. Models for integer data. Annual Review of Statistics and its Application 10: 297–323 . Karlis and Ntzoufras [2006] Karlis, D. and I. Ntzoufras. 2006. Bayesian analysis of the differences of count data. Statistics in Medicine 25(11): 1885–1905 . Koopman et al. [2017] Koopman, S.J., R. Lit, and A. Lucas. 2017. Intraday stochastic volatility in discrete price changes: the dynamic Skellam model. Journal of the American Statistical Association 112(520): 1490–1503 . Lago-Peñas et al. [2013] Lago-Peñas, C., M.A. Gomez, J. Viaño, and I. González-García. 2013. Home advantage in elite handball: the impact of the quality of opposition on team performance. International Journal of Performance Analysis in Sport 13(3): 724–733 . Maher [1982] Maher, M.J. 1982. Modelling association football scores. Statistica Neerlandica 36(3): 109–118 . McHale and Scarf [2007] McHale, I. and P. Scarf. 2007. Modelling soccer matches using bivariate discrete distributions with general dependence structure. Statistica Neerlandica 61(4): 432–445 . Michels et al. [2023] Michels, R., M. Ötting, and D. Karlis. 2023. Extending the Dixon and Coles model: an application to women’s football data. arXiv preprint arXiv:2307.02139 . Michels et al. [2023] Michels, R., M. Ötting, and R. Langrock. 2023. Bettors’ reaction to match dynamics: Evidence from in-game betting. European Journal of Operational Research 310(3): 1118–1127 . Ntzoufras et al. [2021] Ntzoufras, I., V. Palaskas, and S. Drikos. 2021. Bayesian models for prediction of the set-difference in volleyball. IMA Journal of Management Mathematics 32(4): 491–518 . Ötting et al. [2024] Ötting, M., R. Michels, R. Langrock, and C. Deutscher. 2024. Demand for live betting: An analysis using state-space models. Applied Stochastic Models in Business and Industry . Pelechrinis and Winston [2021] Pelechrinis, K. and W. Winston. 2021. A Skellam regression model for quantifying positional value in soccer. Journal of Quantitative Analysis in Sports 17(3): 187–201 . Prieto et al. [2016] Prieto, J., M.Á. Gómez, A. Volossovitch, and J. Sampaio. 2016. Effects of team timeouts on the teams’ scoring performance in elite handball close games. Kinesiology 48(1.): 115–123 . Singh et al. [2023] Singh, A., P. Scarf, and R. Baker. 2023. A unified theory for bivariate scores in possessive ball-sports: The case of handball. European Journal of Operational Research 304(3): 1099–1112 . Skellam [1946] Skellam, J. 1946. The frequency distribution of the difference between two Poisson variates belonging to different populations. Journal of the Royal Statistical Society. Series A 109(3): 296–296 . Smiatek and Heuer [2012] Smiatek, J. and A. Heuer. 2012. A statistical view on team handball results: home advantage, team fitness and prediction of match outcomes. arXiv preprint arXiv:1207.0700 . Tomy and Veena [2022] Tomy, L. and G. Veena. 2022. A retrospective study on Skellam and related distributions. Austrian Journal of Statistics 51(1): 102–111 . Van Eetvelde et al. [2023] Van Eetvelde, H., L.M. Hvattum, and C. Ley. 2023. The probabilistic final standing calculator: a fair stochastic tool to handle abruptly stopped football seasons. AStA Advances in Statistical Analysis 107(1-2): 251–269 . Volossovitch and Debanne [2021] Volossovitch, A. and T. Debanne. 2021. Home advantage in handball. Home Advantage in Sport: Causes and the Effect on Performance: 220–227 . Irwin, J.O. 1937. The frequency distribution of the difference between two independent variates following the same Poisson distribution. Journal of the Royal Statistical Society 100(3): 415–416 . Jiang et al. [2014] Jiang, L., K. Mao, and R. Wu. 2014. A Skellam model to identify differential patterns of gene expression induced by environmental signals. BMC Genomics 15(1): 1–9 . Karlis and Mamode Khan [2023] Karlis, D. and N. Mamode Khan. 2023. Models for integer data. Annual Review of Statistics and its Application 10: 297–323 . Karlis and Ntzoufras [2006] Karlis, D. and I. Ntzoufras. 2006. Bayesian analysis of the differences of count data. Statistics in Medicine 25(11): 1885–1905 . Koopman et al. [2017] Koopman, S.J., R. Lit, and A. Lucas. 2017. Intraday stochastic volatility in discrete price changes: the dynamic Skellam model. Journal of the American Statistical Association 112(520): 1490–1503 . Lago-Peñas et al. [2013] Lago-Peñas, C., M.A. Gomez, J. Viaño, and I. González-García. 2013. Home advantage in elite handball: the impact of the quality of opposition on team performance. International Journal of Performance Analysis in Sport 13(3): 724–733 . Maher [1982] Maher, M.J. 1982. Modelling association football scores. Statistica Neerlandica 36(3): 109–118 . McHale and Scarf [2007] McHale, I. and P. Scarf. 2007. Modelling soccer matches using bivariate discrete distributions with general dependence structure. Statistica Neerlandica 61(4): 432–445 . Michels et al. [2023] Michels, R., M. Ötting, and D. Karlis. 2023. Extending the Dixon and Coles model: an application to women’s football data. arXiv preprint arXiv:2307.02139 . Michels et al. [2023] Michels, R., M. Ötting, and R. Langrock. 2023. Bettors’ reaction to match dynamics: Evidence from in-game betting. European Journal of Operational Research 310(3): 1118–1127 . Ntzoufras et al. [2021] Ntzoufras, I., V. Palaskas, and S. Drikos. 2021. Bayesian models for prediction of the set-difference in volleyball. IMA Journal of Management Mathematics 32(4): 491–518 . Ötting et al. [2024] Ötting, M., R. Michels, R. Langrock, and C. Deutscher. 2024. Demand for live betting: An analysis using state-space models. Applied Stochastic Models in Business and Industry . Pelechrinis and Winston [2021] Pelechrinis, K. and W. Winston. 2021. A Skellam regression model for quantifying positional value in soccer. Journal of Quantitative Analysis in Sports 17(3): 187–201 . Prieto et al. [2016] Prieto, J., M.Á. Gómez, A. Volossovitch, and J. Sampaio. 2016. Effects of team timeouts on the teams’ scoring performance in elite handball close games. Kinesiology 48(1.): 115–123 . Singh et al. [2023] Singh, A., P. Scarf, and R. Baker. 2023. A unified theory for bivariate scores in possessive ball-sports: The case of handball. European Journal of Operational Research 304(3): 1099–1112 . Skellam [1946] Skellam, J. 1946. The frequency distribution of the difference between two Poisson variates belonging to different populations. Journal of the Royal Statistical Society. Series A 109(3): 296–296 . Smiatek and Heuer [2012] Smiatek, J. and A. Heuer. 2012. A statistical view on team handball results: home advantage, team fitness and prediction of match outcomes. arXiv preprint arXiv:1207.0700 . Tomy and Veena [2022] Tomy, L. and G. Veena. 2022. A retrospective study on Skellam and related distributions. Austrian Journal of Statistics 51(1): 102–111 . Van Eetvelde et al. [2023] Van Eetvelde, H., L.M. Hvattum, and C. Ley. 2023. The probabilistic final standing calculator: a fair stochastic tool to handle abruptly stopped football seasons. AStA Advances in Statistical Analysis 107(1-2): 251–269 . Volossovitch and Debanne [2021] Volossovitch, A. and T. Debanne. 2021. Home advantage in handball. Home Advantage in Sport: Causes and the Effect on Performance: 220–227 . Jiang, L., K. Mao, and R. Wu. 2014. A Skellam model to identify differential patterns of gene expression induced by environmental signals. BMC Genomics 15(1): 1–9 . Karlis and Mamode Khan [2023] Karlis, D. and N. Mamode Khan. 2023. Models for integer data. Annual Review of Statistics and its Application 10: 297–323 . Karlis and Ntzoufras [2006] Karlis, D. and I. Ntzoufras. 2006. Bayesian analysis of the differences of count data. Statistics in Medicine 25(11): 1885–1905 . Koopman et al. [2017] Koopman, S.J., R. Lit, and A. Lucas. 2017. Intraday stochastic volatility in discrete price changes: the dynamic Skellam model. Journal of the American Statistical Association 112(520): 1490–1503 . Lago-Peñas et al. [2013] Lago-Peñas, C., M.A. Gomez, J. Viaño, and I. González-García. 2013. Home advantage in elite handball: the impact of the quality of opposition on team performance. International Journal of Performance Analysis in Sport 13(3): 724–733 . Maher [1982] Maher, M.J. 1982. Modelling association football scores. Statistica Neerlandica 36(3): 109–118 . McHale and Scarf [2007] McHale, I. and P. Scarf. 2007. Modelling soccer matches using bivariate discrete distributions with general dependence structure. Statistica Neerlandica 61(4): 432–445 . Michels et al. [2023] Michels, R., M. Ötting, and D. Karlis. 2023. Extending the Dixon and Coles model: an application to women’s football data. arXiv preprint arXiv:2307.02139 . Michels et al. [2023] Michels, R., M. Ötting, and R. Langrock. 2023. Bettors’ reaction to match dynamics: Evidence from in-game betting. European Journal of Operational Research 310(3): 1118–1127 . Ntzoufras et al. [2021] Ntzoufras, I., V. Palaskas, and S. Drikos. 2021. Bayesian models for prediction of the set-difference in volleyball. IMA Journal of Management Mathematics 32(4): 491–518 . Ötting et al. [2024] Ötting, M., R. Michels, R. Langrock, and C. Deutscher. 2024. Demand for live betting: An analysis using state-space models. Applied Stochastic Models in Business and Industry . Pelechrinis and Winston [2021] Pelechrinis, K. and W. Winston. 2021. A Skellam regression model for quantifying positional value in soccer. Journal of Quantitative Analysis in Sports 17(3): 187–201 . Prieto et al. [2016] Prieto, J., M.Á. Gómez, A. Volossovitch, and J. Sampaio. 2016. Effects of team timeouts on the teams’ scoring performance in elite handball close games. Kinesiology 48(1.): 115–123 . Singh et al. [2023] Singh, A., P. Scarf, and R. Baker. 2023. A unified theory for bivariate scores in possessive ball-sports: The case of handball. European Journal of Operational Research 304(3): 1099–1112 . Skellam [1946] Skellam, J. 1946. The frequency distribution of the difference between two Poisson variates belonging to different populations. Journal of the Royal Statistical Society. Series A 109(3): 296–296 . Smiatek and Heuer [2012] Smiatek, J. and A. Heuer. 2012. A statistical view on team handball results: home advantage, team fitness and prediction of match outcomes. arXiv preprint arXiv:1207.0700 . Tomy and Veena [2022] Tomy, L. and G. Veena. 2022. A retrospective study on Skellam and related distributions. Austrian Journal of Statistics 51(1): 102–111 . Van Eetvelde et al. [2023] Van Eetvelde, H., L.M. Hvattum, and C. Ley. 2023. The probabilistic final standing calculator: a fair stochastic tool to handle abruptly stopped football seasons. AStA Advances in Statistical Analysis 107(1-2): 251–269 . Volossovitch and Debanne [2021] Volossovitch, A. and T. Debanne. 2021. Home advantage in handball. Home Advantage in Sport: Causes and the Effect on Performance: 220–227 . Karlis, D. and N. Mamode Khan. 2023. Models for integer data. Annual Review of Statistics and its Application 10: 297–323 . Karlis and Ntzoufras [2006] Karlis, D. and I. Ntzoufras. 2006. Bayesian analysis of the differences of count data. Statistics in Medicine 25(11): 1885–1905 . Koopman et al. [2017] Koopman, S.J., R. Lit, and A. Lucas. 2017. Intraday stochastic volatility in discrete price changes: the dynamic Skellam model. Journal of the American Statistical Association 112(520): 1490–1503 . Lago-Peñas et al. [2013] Lago-Peñas, C., M.A. Gomez, J. Viaño, and I. González-García. 2013. Home advantage in elite handball: the impact of the quality of opposition on team performance. International Journal of Performance Analysis in Sport 13(3): 724–733 . Maher [1982] Maher, M.J. 1982. Modelling association football scores. Statistica Neerlandica 36(3): 109–118 . McHale and Scarf [2007] McHale, I. and P. Scarf. 2007. Modelling soccer matches using bivariate discrete distributions with general dependence structure. Statistica Neerlandica 61(4): 432–445 . Michels et al. [2023] Michels, R., M. Ötting, and D. Karlis. 2023. Extending the Dixon and Coles model: an application to women’s football data. arXiv preprint arXiv:2307.02139 . Michels et al. [2023] Michels, R., M. Ötting, and R. Langrock. 2023. Bettors’ reaction to match dynamics: Evidence from in-game betting. European Journal of Operational Research 310(3): 1118–1127 . Ntzoufras et al. [2021] Ntzoufras, I., V. Palaskas, and S. Drikos. 2021. Bayesian models for prediction of the set-difference in volleyball. IMA Journal of Management Mathematics 32(4): 491–518 . Ötting et al. [2024] Ötting, M., R. Michels, R. Langrock, and C. Deutscher. 2024. Demand for live betting: An analysis using state-space models. Applied Stochastic Models in Business and Industry . Pelechrinis and Winston [2021] Pelechrinis, K. and W. Winston. 2021. A Skellam regression model for quantifying positional value in soccer. Journal of Quantitative Analysis in Sports 17(3): 187–201 . Prieto et al. [2016] Prieto, J., M.Á. Gómez, A. Volossovitch, and J. Sampaio. 2016. Effects of team timeouts on the teams’ scoring performance in elite handball close games. Kinesiology 48(1.): 115–123 . Singh et al. [2023] Singh, A., P. Scarf, and R. Baker. 2023. A unified theory for bivariate scores in possessive ball-sports: The case of handball. European Journal of Operational Research 304(3): 1099–1112 . Skellam [1946] Skellam, J. 1946. The frequency distribution of the difference between two Poisson variates belonging to different populations. Journal of the Royal Statistical Society. Series A 109(3): 296–296 . Smiatek and Heuer [2012] Smiatek, J. and A. Heuer. 2012. A statistical view on team handball results: home advantage, team fitness and prediction of match outcomes. arXiv preprint arXiv:1207.0700 . Tomy and Veena [2022] Tomy, L. and G. Veena. 2022. A retrospective study on Skellam and related distributions. Austrian Journal of Statistics 51(1): 102–111 . Van Eetvelde et al. [2023] Van Eetvelde, H., L.M. Hvattum, and C. Ley. 2023. The probabilistic final standing calculator: a fair stochastic tool to handle abruptly stopped football seasons. AStA Advances in Statistical Analysis 107(1-2): 251–269 . Volossovitch and Debanne [2021] Volossovitch, A. and T. Debanne. 2021. Home advantage in handball. Home Advantage in Sport: Causes and the Effect on Performance: 220–227 . Karlis, D. and I. Ntzoufras. 2006. Bayesian analysis of the differences of count data. Statistics in Medicine 25(11): 1885–1905 . Koopman et al. [2017] Koopman, S.J., R. Lit, and A. Lucas. 2017. Intraday stochastic volatility in discrete price changes: the dynamic Skellam model. Journal of the American Statistical Association 112(520): 1490–1503 . Lago-Peñas et al. [2013] Lago-Peñas, C., M.A. Gomez, J. Viaño, and I. González-García. 2013. Home advantage in elite handball: the impact of the quality of opposition on team performance. International Journal of Performance Analysis in Sport 13(3): 724–733 . Maher [1982] Maher, M.J. 1982. Modelling association football scores. Statistica Neerlandica 36(3): 109–118 . McHale and Scarf [2007] McHale, I. and P. Scarf. 2007. Modelling soccer matches using bivariate discrete distributions with general dependence structure. Statistica Neerlandica 61(4): 432–445 . Michels et al. [2023] Michels, R., M. Ötting, and D. Karlis. 2023. Extending the Dixon and Coles model: an application to women’s football data. arXiv preprint arXiv:2307.02139 . Michels et al. [2023] Michels, R., M. Ötting, and R. Langrock. 2023. Bettors’ reaction to match dynamics: Evidence from in-game betting. European Journal of Operational Research 310(3): 1118–1127 . Ntzoufras et al. [2021] Ntzoufras, I., V. Palaskas, and S. Drikos. 2021. Bayesian models for prediction of the set-difference in volleyball. IMA Journal of Management Mathematics 32(4): 491–518 . Ötting et al. [2024] Ötting, M., R. Michels, R. Langrock, and C. Deutscher. 2024. Demand for live betting: An analysis using state-space models. Applied Stochastic Models in Business and Industry . Pelechrinis and Winston [2021] Pelechrinis, K. and W. Winston. 2021. A Skellam regression model for quantifying positional value in soccer. Journal of Quantitative Analysis in Sports 17(3): 187–201 . Prieto et al. [2016] Prieto, J., M.Á. Gómez, A. Volossovitch, and J. Sampaio. 2016. Effects of team timeouts on the teams’ scoring performance in elite handball close games. Kinesiology 48(1.): 115–123 . Singh et al. [2023] Singh, A., P. Scarf, and R. Baker. 2023. A unified theory for bivariate scores in possessive ball-sports: The case of handball. European Journal of Operational Research 304(3): 1099–1112 . Skellam [1946] Skellam, J. 1946. The frequency distribution of the difference between two Poisson variates belonging to different populations. Journal of the Royal Statistical Society. Series A 109(3): 296–296 . Smiatek and Heuer [2012] Smiatek, J. and A. Heuer. 2012. A statistical view on team handball results: home advantage, team fitness and prediction of match outcomes. arXiv preprint arXiv:1207.0700 . Tomy and Veena [2022] Tomy, L. and G. Veena. 2022. A retrospective study on Skellam and related distributions. Austrian Journal of Statistics 51(1): 102–111 . Van Eetvelde et al. [2023] Van Eetvelde, H., L.M. Hvattum, and C. Ley. 2023. The probabilistic final standing calculator: a fair stochastic tool to handle abruptly stopped football seasons. AStA Advances in Statistical Analysis 107(1-2): 251–269 . Volossovitch and Debanne [2021] Volossovitch, A. and T. Debanne. 2021. Home advantage in handball. Home Advantage in Sport: Causes and the Effect on Performance: 220–227 . Koopman, S.J., R. Lit, and A. Lucas. 2017. Intraday stochastic volatility in discrete price changes: the dynamic Skellam model. Journal of the American Statistical Association 112(520): 1490–1503 . Lago-Peñas et al. [2013] Lago-Peñas, C., M.A. Gomez, J. Viaño, and I. González-García. 2013. Home advantage in elite handball: the impact of the quality of opposition on team performance. International Journal of Performance Analysis in Sport 13(3): 724–733 . Maher [1982] Maher, M.J. 1982. Modelling association football scores. Statistica Neerlandica 36(3): 109–118 . McHale and Scarf [2007] McHale, I. and P. Scarf. 2007. Modelling soccer matches using bivariate discrete distributions with general dependence structure. Statistica Neerlandica 61(4): 432–445 . Michels et al. [2023] Michels, R., M. Ötting, and D. Karlis. 2023. Extending the Dixon and Coles model: an application to women’s football data. arXiv preprint arXiv:2307.02139 . Michels et al. [2023] Michels, R., M. Ötting, and R. Langrock. 2023. Bettors’ reaction to match dynamics: Evidence from in-game betting. European Journal of Operational Research 310(3): 1118–1127 . Ntzoufras et al. [2021] Ntzoufras, I., V. Palaskas, and S. Drikos. 2021. Bayesian models for prediction of the set-difference in volleyball. IMA Journal of Management Mathematics 32(4): 491–518 . Ötting et al. [2024] Ötting, M., R. Michels, R. Langrock, and C. Deutscher. 2024. Demand for live betting: An analysis using state-space models. Applied Stochastic Models in Business and Industry . Pelechrinis and Winston [2021] Pelechrinis, K. and W. Winston. 2021. A Skellam regression model for quantifying positional value in soccer. Journal of Quantitative Analysis in Sports 17(3): 187–201 . Prieto et al. [2016] Prieto, J., M.Á. Gómez, A. Volossovitch, and J. Sampaio. 2016. Effects of team timeouts on the teams’ scoring performance in elite handball close games. Kinesiology 48(1.): 115–123 . Singh et al. [2023] Singh, A., P. Scarf, and R. Baker. 2023. A unified theory for bivariate scores in possessive ball-sports: The case of handball. European Journal of Operational Research 304(3): 1099–1112 . Skellam [1946] Skellam, J. 1946. The frequency distribution of the difference between two Poisson variates belonging to different populations. Journal of the Royal Statistical Society. Series A 109(3): 296–296 . Smiatek and Heuer [2012] Smiatek, J. and A. Heuer. 2012. A statistical view on team handball results: home advantage, team fitness and prediction of match outcomes. arXiv preprint arXiv:1207.0700 . Tomy and Veena [2022] Tomy, L. and G. Veena. 2022. A retrospective study on Skellam and related distributions. Austrian Journal of Statistics 51(1): 102–111 . Van Eetvelde et al. [2023] Van Eetvelde, H., L.M. Hvattum, and C. Ley. 2023. The probabilistic final standing calculator: a fair stochastic tool to handle abruptly stopped football seasons. AStA Advances in Statistical Analysis 107(1-2): 251–269 . Volossovitch and Debanne [2021] Volossovitch, A. and T. Debanne. 2021. Home advantage in handball. Home Advantage in Sport: Causes and the Effect on Performance: 220–227 . Lago-Peñas, C., M.A. Gomez, J. Viaño, and I. González-García. 2013. Home advantage in elite handball: the impact of the quality of opposition on team performance. International Journal of Performance Analysis in Sport 13(3): 724–733 . Maher [1982] Maher, M.J. 1982. Modelling association football scores. Statistica Neerlandica 36(3): 109–118 . McHale and Scarf [2007] McHale, I. and P. Scarf. 2007. Modelling soccer matches using bivariate discrete distributions with general dependence structure. Statistica Neerlandica 61(4): 432–445 . Michels et al. [2023] Michels, R., M. Ötting, and D. Karlis. 2023. Extending the Dixon and Coles model: an application to women’s football data. arXiv preprint arXiv:2307.02139 . Michels et al. [2023] Michels, R., M. Ötting, and R. Langrock. 2023. Bettors’ reaction to match dynamics: Evidence from in-game betting. European Journal of Operational Research 310(3): 1118–1127 . Ntzoufras et al. [2021] Ntzoufras, I., V. Palaskas, and S. Drikos. 2021. Bayesian models for prediction of the set-difference in volleyball. IMA Journal of Management Mathematics 32(4): 491–518 . Ötting et al. [2024] Ötting, M., R. Michels, R. Langrock, and C. Deutscher. 2024. Demand for live betting: An analysis using state-space models. Applied Stochastic Models in Business and Industry . Pelechrinis and Winston [2021] Pelechrinis, K. and W. Winston. 2021. A Skellam regression model for quantifying positional value in soccer. Journal of Quantitative Analysis in Sports 17(3): 187–201 . Prieto et al. [2016] Prieto, J., M.Á. Gómez, A. Volossovitch, and J. Sampaio. 2016. Effects of team timeouts on the teams’ scoring performance in elite handball close games. Kinesiology 48(1.): 115–123 . Singh et al. [2023] Singh, A., P. Scarf, and R. Baker. 2023. A unified theory for bivariate scores in possessive ball-sports: The case of handball. European Journal of Operational Research 304(3): 1099–1112 . Skellam [1946] Skellam, J. 1946. The frequency distribution of the difference between two Poisson variates belonging to different populations. Journal of the Royal Statistical Society. Series A 109(3): 296–296 . Smiatek and Heuer [2012] Smiatek, J. and A. Heuer. 2012. A statistical view on team handball results: home advantage, team fitness and prediction of match outcomes. arXiv preprint arXiv:1207.0700 . Tomy and Veena [2022] Tomy, L. and G. Veena. 2022. A retrospective study on Skellam and related distributions. Austrian Journal of Statistics 51(1): 102–111 . Van Eetvelde et al. [2023] Van Eetvelde, H., L.M. Hvattum, and C. Ley. 2023. The probabilistic final standing calculator: a fair stochastic tool to handle abruptly stopped football seasons. AStA Advances in Statistical Analysis 107(1-2): 251–269 . Volossovitch and Debanne [2021] Volossovitch, A. and T. Debanne. 2021. Home advantage in handball. Home Advantage in Sport: Causes and the Effect on Performance: 220–227 . Maher, M.J. 1982. Modelling association football scores. Statistica Neerlandica 36(3): 109–118 . McHale and Scarf [2007] McHale, I. and P. Scarf. 2007. Modelling soccer matches using bivariate discrete distributions with general dependence structure. Statistica Neerlandica 61(4): 432–445 . Michels et al. [2023] Michels, R., M. Ötting, and D. Karlis. 2023. Extending the Dixon and Coles model: an application to women’s football data. arXiv preprint arXiv:2307.02139 . Michels et al. [2023] Michels, R., M. Ötting, and R. Langrock. 2023. Bettors’ reaction to match dynamics: Evidence from in-game betting. European Journal of Operational Research 310(3): 1118–1127 . Ntzoufras et al. [2021] Ntzoufras, I., V. Palaskas, and S. Drikos. 2021. Bayesian models for prediction of the set-difference in volleyball. IMA Journal of Management Mathematics 32(4): 491–518 . Ötting et al. [2024] Ötting, M., R. Michels, R. Langrock, and C. Deutscher. 2024. Demand for live betting: An analysis using state-space models. Applied Stochastic Models in Business and Industry . Pelechrinis and Winston [2021] Pelechrinis, K. and W. Winston. 2021. A Skellam regression model for quantifying positional value in soccer. Journal of Quantitative Analysis in Sports 17(3): 187–201 . Prieto et al. [2016] Prieto, J., M.Á. Gómez, A. Volossovitch, and J. Sampaio. 2016. Effects of team timeouts on the teams’ scoring performance in elite handball close games. Kinesiology 48(1.): 115–123 . Singh et al. [2023] Singh, A., P. Scarf, and R. Baker. 2023. A unified theory for bivariate scores in possessive ball-sports: The case of handball. European Journal of Operational Research 304(3): 1099–1112 . Skellam [1946] Skellam, J. 1946. The frequency distribution of the difference between two Poisson variates belonging to different populations. Journal of the Royal Statistical Society. Series A 109(3): 296–296 . Smiatek and Heuer [2012] Smiatek, J. and A. Heuer. 2012. A statistical view on team handball results: home advantage, team fitness and prediction of match outcomes. arXiv preprint arXiv:1207.0700 . Tomy and Veena [2022] Tomy, L. and G. Veena. 2022. A retrospective study on Skellam and related distributions. Austrian Journal of Statistics 51(1): 102–111 . Van Eetvelde et al. [2023] Van Eetvelde, H., L.M. Hvattum, and C. Ley. 2023. The probabilistic final standing calculator: a fair stochastic tool to handle abruptly stopped football seasons. AStA Advances in Statistical Analysis 107(1-2): 251–269 . Volossovitch and Debanne [2021] Volossovitch, A. and T. Debanne. 2021. Home advantage in handball. Home Advantage in Sport: Causes and the Effect on Performance: 220–227 . McHale, I. and P. Scarf. 2007. Modelling soccer matches using bivariate discrete distributions with general dependence structure. Statistica Neerlandica 61(4): 432–445 . Michels et al. [2023] Michels, R., M. Ötting, and D. Karlis. 2023. Extending the Dixon and Coles model: an application to women’s football data. arXiv preprint arXiv:2307.02139 . Michels et al. [2023] Michels, R., M. Ötting, and R. Langrock. 2023. Bettors’ reaction to match dynamics: Evidence from in-game betting. European Journal of Operational Research 310(3): 1118–1127 . Ntzoufras et al. [2021] Ntzoufras, I., V. Palaskas, and S. Drikos. 2021. Bayesian models for prediction of the set-difference in volleyball. IMA Journal of Management Mathematics 32(4): 491–518 . Ötting et al. [2024] Ötting, M., R. Michels, R. Langrock, and C. Deutscher. 2024. Demand for live betting: An analysis using state-space models. Applied Stochastic Models in Business and Industry . Pelechrinis and Winston [2021] Pelechrinis, K. and W. Winston. 2021. A Skellam regression model for quantifying positional value in soccer. Journal of Quantitative Analysis in Sports 17(3): 187–201 . Prieto et al. [2016] Prieto, J., M.Á. Gómez, A. Volossovitch, and J. Sampaio. 2016. Effects of team timeouts on the teams’ scoring performance in elite handball close games. Kinesiology 48(1.): 115–123 . Singh et al. [2023] Singh, A., P. Scarf, and R. Baker. 2023. A unified theory for bivariate scores in possessive ball-sports: The case of handball. European Journal of Operational Research 304(3): 1099–1112 . Skellam [1946] Skellam, J. 1946. The frequency distribution of the difference between two Poisson variates belonging to different populations. Journal of the Royal Statistical Society. Series A 109(3): 296–296 . Smiatek and Heuer [2012] Smiatek, J. and A. Heuer. 2012. A statistical view on team handball results: home advantage, team fitness and prediction of match outcomes. arXiv preprint arXiv:1207.0700 . Tomy and Veena [2022] Tomy, L. and G. Veena. 2022. A retrospective study on Skellam and related distributions. Austrian Journal of Statistics 51(1): 102–111 . Van Eetvelde et al. [2023] Van Eetvelde, H., L.M. Hvattum, and C. Ley. 2023. The probabilistic final standing calculator: a fair stochastic tool to handle abruptly stopped football seasons. AStA Advances in Statistical Analysis 107(1-2): 251–269 . Volossovitch and Debanne [2021] Volossovitch, A. and T. Debanne. 2021. Home advantage in handball. Home Advantage in Sport: Causes and the Effect on Performance: 220–227 . Michels, R., M. Ötting, and D. Karlis. 2023. Extending the Dixon and Coles model: an application to women’s football data. arXiv preprint arXiv:2307.02139 . Michels et al. [2023] Michels, R., M. Ötting, and R. Langrock. 2023. Bettors’ reaction to match dynamics: Evidence from in-game betting. European Journal of Operational Research 310(3): 1118–1127 . Ntzoufras et al. [2021] Ntzoufras, I., V. Palaskas, and S. Drikos. 2021. Bayesian models for prediction of the set-difference in volleyball. IMA Journal of Management Mathematics 32(4): 491–518 . Ötting et al. [2024] Ötting, M., R. Michels, R. Langrock, and C. Deutscher. 2024. Demand for live betting: An analysis using state-space models. Applied Stochastic Models in Business and Industry . Pelechrinis and Winston [2021] Pelechrinis, K. and W. Winston. 2021. A Skellam regression model for quantifying positional value in soccer. Journal of Quantitative Analysis in Sports 17(3): 187–201 . Prieto et al. [2016] Prieto, J., M.Á. Gómez, A. Volossovitch, and J. Sampaio. 2016. Effects of team timeouts on the teams’ scoring performance in elite handball close games. Kinesiology 48(1.): 115–123 . Singh et al. [2023] Singh, A., P. Scarf, and R. Baker. 2023. A unified theory for bivariate scores in possessive ball-sports: The case of handball. European Journal of Operational Research 304(3): 1099–1112 . Skellam [1946] Skellam, J. 1946. The frequency distribution of the difference between two Poisson variates belonging to different populations. Journal of the Royal Statistical Society. Series A 109(3): 296–296 . Smiatek and Heuer [2012] Smiatek, J. and A. Heuer. 2012. A statistical view on team handball results: home advantage, team fitness and prediction of match outcomes. arXiv preprint arXiv:1207.0700 . Tomy and Veena [2022] Tomy, L. and G. Veena. 2022. A retrospective study on Skellam and related distributions. Austrian Journal of Statistics 51(1): 102–111 . Van Eetvelde et al. [2023] Van Eetvelde, H., L.M. Hvattum, and C. Ley. 2023. The probabilistic final standing calculator: a fair stochastic tool to handle abruptly stopped football seasons. AStA Advances in Statistical Analysis 107(1-2): 251–269 . Volossovitch and Debanne [2021] Volossovitch, A. and T. Debanne. 2021. Home advantage in handball. Home Advantage in Sport: Causes and the Effect on Performance: 220–227 . Michels, R., M. Ötting, and R. Langrock. 2023. Bettors’ reaction to match dynamics: Evidence from in-game betting. European Journal of Operational Research 310(3): 1118–1127 . Ntzoufras et al. [2021] Ntzoufras, I., V. Palaskas, and S. Drikos. 2021. Bayesian models for prediction of the set-difference in volleyball. IMA Journal of Management Mathematics 32(4): 491–518 . Ötting et al. [2024] Ötting, M., R. Michels, R. Langrock, and C. Deutscher. 2024. Demand for live betting: An analysis using state-space models. Applied Stochastic Models in Business and Industry . Pelechrinis and Winston [2021] Pelechrinis, K. and W. Winston. 2021. A Skellam regression model for quantifying positional value in soccer. Journal of Quantitative Analysis in Sports 17(3): 187–201 . Prieto et al. [2016] Prieto, J., M.Á. Gómez, A. Volossovitch, and J. Sampaio. 2016. Effects of team timeouts on the teams’ scoring performance in elite handball close games. Kinesiology 48(1.): 115–123 . Singh et al. [2023] Singh, A., P. Scarf, and R. Baker. 2023. A unified theory for bivariate scores in possessive ball-sports: The case of handball. European Journal of Operational Research 304(3): 1099–1112 . Skellam [1946] Skellam, J. 1946. The frequency distribution of the difference between two Poisson variates belonging to different populations. Journal of the Royal Statistical Society. Series A 109(3): 296–296 . Smiatek and Heuer [2012] Smiatek, J. and A. Heuer. 2012. A statistical view on team handball results: home advantage, team fitness and prediction of match outcomes. arXiv preprint arXiv:1207.0700 . Tomy and Veena [2022] Tomy, L. and G. Veena. 2022. A retrospective study on Skellam and related distributions. Austrian Journal of Statistics 51(1): 102–111 . Van Eetvelde et al. [2023] Van Eetvelde, H., L.M. Hvattum, and C. Ley. 2023. The probabilistic final standing calculator: a fair stochastic tool to handle abruptly stopped football seasons. AStA Advances in Statistical Analysis 107(1-2): 251–269 . Volossovitch and Debanne [2021] Volossovitch, A. and T. Debanne. 2021. Home advantage in handball. Home Advantage in Sport: Causes and the Effect on Performance: 220–227 . Ntzoufras, I., V. Palaskas, and S. Drikos. 2021. Bayesian models for prediction of the set-difference in volleyball. IMA Journal of Management Mathematics 32(4): 491–518 . Ötting et al. [2024] Ötting, M., R. Michels, R. Langrock, and C. Deutscher. 2024. Demand for live betting: An analysis using state-space models. Applied Stochastic Models in Business and Industry . Pelechrinis and Winston [2021] Pelechrinis, K. and W. Winston. 2021. A Skellam regression model for quantifying positional value in soccer. Journal of Quantitative Analysis in Sports 17(3): 187–201 . Prieto et al. [2016] Prieto, J., M.Á. Gómez, A. Volossovitch, and J. Sampaio. 2016. Effects of team timeouts on the teams’ scoring performance in elite handball close games. Kinesiology 48(1.): 115–123 . Singh et al. [2023] Singh, A., P. Scarf, and R. Baker. 2023. A unified theory for bivariate scores in possessive ball-sports: The case of handball. European Journal of Operational Research 304(3): 1099–1112 . Skellam [1946] Skellam, J. 1946. The frequency distribution of the difference between two Poisson variates belonging to different populations. Journal of the Royal Statistical Society. Series A 109(3): 296–296 . Smiatek and Heuer [2012] Smiatek, J. and A. Heuer. 2012. A statistical view on team handball results: home advantage, team fitness and prediction of match outcomes. arXiv preprint arXiv:1207.0700 . Tomy and Veena [2022] Tomy, L. and G. Veena. 2022. A retrospective study on Skellam and related distributions. Austrian Journal of Statistics 51(1): 102–111 . Van Eetvelde et al. [2023] Van Eetvelde, H., L.M. Hvattum, and C. Ley. 2023. The probabilistic final standing calculator: a fair stochastic tool to handle abruptly stopped football seasons. AStA Advances in Statistical Analysis 107(1-2): 251–269 . Volossovitch and Debanne [2021] Volossovitch, A. and T. Debanne. 2021. Home advantage in handball. Home Advantage in Sport: Causes and the Effect on Performance: 220–227 . Ötting, M., R. Michels, R. Langrock, and C. Deutscher. 2024. Demand for live betting: An analysis using state-space models. Applied Stochastic Models in Business and Industry . Pelechrinis and Winston [2021] Pelechrinis, K. and W. Winston. 2021. A Skellam regression model for quantifying positional value in soccer. Journal of Quantitative Analysis in Sports 17(3): 187–201 . Prieto et al. [2016] Prieto, J., M.Á. Gómez, A. Volossovitch, and J. Sampaio. 2016. Effects of team timeouts on the teams’ scoring performance in elite handball close games. Kinesiology 48(1.): 115–123 . Singh et al. [2023] Singh, A., P. Scarf, and R. Baker. 2023. A unified theory for bivariate scores in possessive ball-sports: The case of handball. European Journal of Operational Research 304(3): 1099–1112 . Skellam [1946] Skellam, J. 1946. The frequency distribution of the difference between two Poisson variates belonging to different populations. Journal of the Royal Statistical Society. Series A 109(3): 296–296 . Smiatek and Heuer [2012] Smiatek, J. and A. Heuer. 2012. A statistical view on team handball results: home advantage, team fitness and prediction of match outcomes. arXiv preprint arXiv:1207.0700 . Tomy and Veena [2022] Tomy, L. and G. Veena. 2022. A retrospective study on Skellam and related distributions. Austrian Journal of Statistics 51(1): 102–111 . Van Eetvelde et al. [2023] Van Eetvelde, H., L.M. Hvattum, and C. Ley. 2023. The probabilistic final standing calculator: a fair stochastic tool to handle abruptly stopped football seasons. AStA Advances in Statistical Analysis 107(1-2): 251–269 . Volossovitch and Debanne [2021] Volossovitch, A. and T. Debanne. 2021. Home advantage in handball. Home Advantage in Sport: Causes and the Effect on Performance: 220–227 . Pelechrinis, K. and W. Winston. 2021. A Skellam regression model for quantifying positional value in soccer. Journal of Quantitative Analysis in Sports 17(3): 187–201 . Prieto et al. [2016] Prieto, J., M.Á. Gómez, A. Volossovitch, and J. Sampaio. 2016. Effects of team timeouts on the teams’ scoring performance in elite handball close games. Kinesiology 48(1.): 115–123 . Singh et al. [2023] Singh, A., P. Scarf, and R. Baker. 2023. A unified theory for bivariate scores in possessive ball-sports: The case of handball. European Journal of Operational Research 304(3): 1099–1112 . Skellam [1946] Skellam, J. 1946. The frequency distribution of the difference between two Poisson variates belonging to different populations. Journal of the Royal Statistical Society. Series A 109(3): 296–296 . Smiatek and Heuer [2012] Smiatek, J. and A. Heuer. 2012. A statistical view on team handball results: home advantage, team fitness and prediction of match outcomes. arXiv preprint arXiv:1207.0700 . Tomy and Veena [2022] Tomy, L. and G. Veena. 2022. A retrospective study on Skellam and related distributions. Austrian Journal of Statistics 51(1): 102–111 . Van Eetvelde et al. [2023] Van Eetvelde, H., L.M. Hvattum, and C. Ley. 2023. The probabilistic final standing calculator: a fair stochastic tool to handle abruptly stopped football seasons. AStA Advances in Statistical Analysis 107(1-2): 251–269 . Volossovitch and Debanne [2021] Volossovitch, A. and T. Debanne. 2021. Home advantage in handball. Home Advantage in Sport: Causes and the Effect on Performance: 220–227 . Prieto, J., M.Á. Gómez, A. Volossovitch, and J. Sampaio. 2016. Effects of team timeouts on the teams’ scoring performance in elite handball close games. Kinesiology 48(1.): 115–123 . Singh et al. [2023] Singh, A., P. Scarf, and R. Baker. 2023. A unified theory for bivariate scores in possessive ball-sports: The case of handball. European Journal of Operational Research 304(3): 1099–1112 . Skellam [1946] Skellam, J. 1946. The frequency distribution of the difference between two Poisson variates belonging to different populations. Journal of the Royal Statistical Society. Series A 109(3): 296–296 . Smiatek and Heuer [2012] Smiatek, J. and A. Heuer. 2012. A statistical view on team handball results: home advantage, team fitness and prediction of match outcomes. arXiv preprint arXiv:1207.0700 . Tomy and Veena [2022] Tomy, L. and G. Veena. 2022. A retrospective study on Skellam and related distributions. Austrian Journal of Statistics 51(1): 102–111 . Van Eetvelde et al. [2023] Van Eetvelde, H., L.M. Hvattum, and C. Ley. 2023. The probabilistic final standing calculator: a fair stochastic tool to handle abruptly stopped football seasons. AStA Advances in Statistical Analysis 107(1-2): 251–269 . Volossovitch and Debanne [2021] Volossovitch, A. and T. Debanne. 2021. Home advantage in handball. Home Advantage in Sport: Causes and the Effect on Performance: 220–227 . Singh, A., P. Scarf, and R. Baker. 2023. A unified theory for bivariate scores in possessive ball-sports: The case of handball. European Journal of Operational Research 304(3): 1099–1112 . Skellam [1946] Skellam, J. 1946. The frequency distribution of the difference between two Poisson variates belonging to different populations. Journal of the Royal Statistical Society. Series A 109(3): 296–296 . Smiatek and Heuer [2012] Smiatek, J. and A. Heuer. 2012. A statistical view on team handball results: home advantage, team fitness and prediction of match outcomes. arXiv preprint arXiv:1207.0700 . Tomy and Veena [2022] Tomy, L. and G. Veena. 2022. A retrospective study on Skellam and related distributions. Austrian Journal of Statistics 51(1): 102–111 . Van Eetvelde et al. [2023] Van Eetvelde, H., L.M. Hvattum, and C. Ley. 2023. The probabilistic final standing calculator: a fair stochastic tool to handle abruptly stopped football seasons. AStA Advances in Statistical Analysis 107(1-2): 251–269 . Volossovitch and Debanne [2021] Volossovitch, A. and T. Debanne. 2021. Home advantage in handball. Home Advantage in Sport: Causes and the Effect on Performance: 220–227 . Skellam, J. 1946. The frequency distribution of the difference between two Poisson variates belonging to different populations. Journal of the Royal Statistical Society. Series A 109(3): 296–296 . Smiatek and Heuer [2012] Smiatek, J. and A. Heuer. 2012. A statistical view on team handball results: home advantage, team fitness and prediction of match outcomes. arXiv preprint arXiv:1207.0700 . Tomy and Veena [2022] Tomy, L. and G. Veena. 2022. A retrospective study on Skellam and related distributions. Austrian Journal of Statistics 51(1): 102–111 . Van Eetvelde et al. [2023] Van Eetvelde, H., L.M. Hvattum, and C. Ley. 2023. The probabilistic final standing calculator: a fair stochastic tool to handle abruptly stopped football seasons. AStA Advances in Statistical Analysis 107(1-2): 251–269 . Volossovitch and Debanne [2021] Volossovitch, A. and T. Debanne. 2021. Home advantage in handball. Home Advantage in Sport: Causes and the Effect on Performance: 220–227 . Smiatek, J. and A. Heuer. 2012. A statistical view on team handball results: home advantage, team fitness and prediction of match outcomes. arXiv preprint arXiv:1207.0700 . Tomy and Veena [2022] Tomy, L. and G. Veena. 2022. A retrospective study on Skellam and related distributions. Austrian Journal of Statistics 51(1): 102–111 . Van Eetvelde et al. [2023] Van Eetvelde, H., L.M. Hvattum, and C. Ley. 2023. The probabilistic final standing calculator: a fair stochastic tool to handle abruptly stopped football seasons. AStA Advances in Statistical Analysis 107(1-2): 251–269 . Volossovitch and Debanne [2021] Volossovitch, A. and T. Debanne. 2021. Home advantage in handball. Home Advantage in Sport: Causes and the Effect on Performance: 220–227 . Tomy, L. and G. Veena. 2022. A retrospective study on Skellam and related distributions. Austrian Journal of Statistics 51(1): 102–111 . Van Eetvelde et al. [2023] Van Eetvelde, H., L.M. Hvattum, and C. Ley. 2023. The probabilistic final standing calculator: a fair stochastic tool to handle abruptly stopped football seasons. AStA Advances in Statistical Analysis 107(1-2): 251–269 . Volossovitch and Debanne [2021] Volossovitch, A. and T. Debanne. 2021. Home advantage in handball. Home Advantage in Sport: Causes and the Effect on Performance: 220–227 . Van Eetvelde, H., L.M. Hvattum, and C. Ley. 2023. The probabilistic final standing calculator: a fair stochastic tool to handle abruptly stopped football seasons. AStA Advances in Statistical Analysis 107(1-2): 251–269 . Volossovitch and Debanne [2021] Volossovitch, A. and T. Debanne. 2021. Home advantage in handball. Home Advantage in Sport: Causes and the Effect on Performance: 220–227 . Volossovitch, A. and T. Debanne. 2021. Home advantage in handball. Home Advantage in Sport: Causes and the Effect on Performance: 220–227 .
- Barbiero, A. 2014. An alternative discrete skew Laplace distribution. Statistical Methodology 16: 47–67 . Bryson et al. [2021] Bryson, A., P. Dolton, J.J. Reade, D. Schreyer, and C. Singleton. 2021. Causal effects of an absent crowd on performances and refereeing decisions during Covid-19. Economics Letters 198: 109664 . Csató [2021] Csató, L. 2021. Coronavirus and sports leagues: obtaining a fair ranking when the season cannot resume. IMA Journal of Management Mathematics 32(4): 547–560 . Dixon and Coles [1997] Dixon, M.J. and S.G. Coles. 1997. Modelling association football scores and inefficiencies in the football betting market. Journal of the Royal Statistical Society: Series C (Applied Statistics) 46(2): 265–280 . Dumangane et al. [2009] Dumangane, M., N. Rosati, and A. Volossovitch. 2009. Departure from independence and stationarity in a handball match. Journal of Applied Statistics 36(7): 723–741 . Felice [2023] Felice, F. 2023. Ranking handball teams from statistical strength estimation. arXiv preprint arXiv:2307.06754 . Felice and Ley [2023] Felice, F. and C. Ley. 2023. Prediction of handball matches with statistically enhanced learning via estimated team strengths. arXiv preprint arXiv:2307.11777 . Groll et al. [2020] Groll, A., J. Heiner, G. Schauberger, and J. Uhrmeister. 2020. Prediction of the 2019 IHF World Men’s Handball Championship–a sparse Gaussian approximation model. Journal of Sports Analytics 6(3): 187–197 . Holmes and McHale [2024] Holmes, B. and I.G. McHale. 2024. Forecasting football match results using a player rating based model. International Journal of Forecasting 40(1): 302–312 . Irwin [1937] Irwin, J.O. 1937. The frequency distribution of the difference between two independent variates following the same Poisson distribution. Journal of the Royal Statistical Society 100(3): 415–416 . Jiang et al. [2014] Jiang, L., K. Mao, and R. Wu. 2014. A Skellam model to identify differential patterns of gene expression induced by environmental signals. BMC Genomics 15(1): 1–9 . Karlis and Mamode Khan [2023] Karlis, D. and N. Mamode Khan. 2023. Models for integer data. Annual Review of Statistics and its Application 10: 297–323 . Karlis and Ntzoufras [2006] Karlis, D. and I. Ntzoufras. 2006. Bayesian analysis of the differences of count data. Statistics in Medicine 25(11): 1885–1905 . Koopman et al. [2017] Koopman, S.J., R. Lit, and A. Lucas. 2017. Intraday stochastic volatility in discrete price changes: the dynamic Skellam model. Journal of the American Statistical Association 112(520): 1490–1503 . Lago-Peñas et al. [2013] Lago-Peñas, C., M.A. Gomez, J. Viaño, and I. González-García. 2013. Home advantage in elite handball: the impact of the quality of opposition on team performance. International Journal of Performance Analysis in Sport 13(3): 724–733 . Maher [1982] Maher, M.J. 1982. Modelling association football scores. Statistica Neerlandica 36(3): 109–118 . McHale and Scarf [2007] McHale, I. and P. Scarf. 2007. Modelling soccer matches using bivariate discrete distributions with general dependence structure. Statistica Neerlandica 61(4): 432–445 . Michels et al. [2023] Michels, R., M. Ötting, and D. Karlis. 2023. Extending the Dixon and Coles model: an application to women’s football data. arXiv preprint arXiv:2307.02139 . Michels et al. [2023] Michels, R., M. Ötting, and R. Langrock. 2023. Bettors’ reaction to match dynamics: Evidence from in-game betting. European Journal of Operational Research 310(3): 1118–1127 . Ntzoufras et al. [2021] Ntzoufras, I., V. Palaskas, and S. Drikos. 2021. Bayesian models for prediction of the set-difference in volleyball. IMA Journal of Management Mathematics 32(4): 491–518 . Ötting et al. [2024] Ötting, M., R. Michels, R. Langrock, and C. Deutscher. 2024. Demand for live betting: An analysis using state-space models. Applied Stochastic Models in Business and Industry . Pelechrinis and Winston [2021] Pelechrinis, K. and W. Winston. 2021. A Skellam regression model for quantifying positional value in soccer. Journal of Quantitative Analysis in Sports 17(3): 187–201 . Prieto et al. [2016] Prieto, J., M.Á. Gómez, A. Volossovitch, and J. Sampaio. 2016. Effects of team timeouts on the teams’ scoring performance in elite handball close games. Kinesiology 48(1.): 115–123 . Singh et al. [2023] Singh, A., P. Scarf, and R. Baker. 2023. A unified theory for bivariate scores in possessive ball-sports: The case of handball. European Journal of Operational Research 304(3): 1099–1112 . Skellam [1946] Skellam, J. 1946. The frequency distribution of the difference between two Poisson variates belonging to different populations. Journal of the Royal Statistical Society. Series A 109(3): 296–296 . Smiatek and Heuer [2012] Smiatek, J. and A. Heuer. 2012. A statistical view on team handball results: home advantage, team fitness and prediction of match outcomes. arXiv preprint arXiv:1207.0700 . Tomy and Veena [2022] Tomy, L. and G. Veena. 2022. A retrospective study on Skellam and related distributions. Austrian Journal of Statistics 51(1): 102–111 . Van Eetvelde et al. [2023] Van Eetvelde, H., L.M. Hvattum, and C. Ley. 2023. The probabilistic final standing calculator: a fair stochastic tool to handle abruptly stopped football seasons. AStA Advances in Statistical Analysis 107(1-2): 251–269 . Volossovitch and Debanne [2021] Volossovitch, A. and T. Debanne. 2021. Home advantage in handball. Home Advantage in Sport: Causes and the Effect on Performance: 220–227 . Bryson, A., P. Dolton, J.J. Reade, D. Schreyer, and C. Singleton. 2021. Causal effects of an absent crowd on performances and refereeing decisions during Covid-19. Economics Letters 198: 109664 . Csató [2021] Csató, L. 2021. Coronavirus and sports leagues: obtaining a fair ranking when the season cannot resume. IMA Journal of Management Mathematics 32(4): 547–560 . Dixon and Coles [1997] Dixon, M.J. and S.G. Coles. 1997. Modelling association football scores and inefficiencies in the football betting market. Journal of the Royal Statistical Society: Series C (Applied Statistics) 46(2): 265–280 . Dumangane et al. [2009] Dumangane, M., N. Rosati, and A. Volossovitch. 2009. Departure from independence and stationarity in a handball match. Journal of Applied Statistics 36(7): 723–741 . Felice [2023] Felice, F. 2023. Ranking handball teams from statistical strength estimation. arXiv preprint arXiv:2307.06754 . Felice and Ley [2023] Felice, F. and C. Ley. 2023. Prediction of handball matches with statistically enhanced learning via estimated team strengths. arXiv preprint arXiv:2307.11777 . Groll et al. [2020] Groll, A., J. Heiner, G. Schauberger, and J. Uhrmeister. 2020. Prediction of the 2019 IHF World Men’s Handball Championship–a sparse Gaussian approximation model. Journal of Sports Analytics 6(3): 187–197 . Holmes and McHale [2024] Holmes, B. and I.G. McHale. 2024. Forecasting football match results using a player rating based model. International Journal of Forecasting 40(1): 302–312 . Irwin [1937] Irwin, J.O. 1937. The frequency distribution of the difference between two independent variates following the same Poisson distribution. Journal of the Royal Statistical Society 100(3): 415–416 . Jiang et al. [2014] Jiang, L., K. Mao, and R. Wu. 2014. A Skellam model to identify differential patterns of gene expression induced by environmental signals. BMC Genomics 15(1): 1–9 . Karlis and Mamode Khan [2023] Karlis, D. and N. Mamode Khan. 2023. Models for integer data. Annual Review of Statistics and its Application 10: 297–323 . Karlis and Ntzoufras [2006] Karlis, D. and I. Ntzoufras. 2006. Bayesian analysis of the differences of count data. Statistics in Medicine 25(11): 1885–1905 . Koopman et al. [2017] Koopman, S.J., R. Lit, and A. Lucas. 2017. Intraday stochastic volatility in discrete price changes: the dynamic Skellam model. Journal of the American Statistical Association 112(520): 1490–1503 . Lago-Peñas et al. [2013] Lago-Peñas, C., M.A. Gomez, J. Viaño, and I. González-García. 2013. Home advantage in elite handball: the impact of the quality of opposition on team performance. International Journal of Performance Analysis in Sport 13(3): 724–733 . Maher [1982] Maher, M.J. 1982. Modelling association football scores. Statistica Neerlandica 36(3): 109–118 . McHale and Scarf [2007] McHale, I. and P. Scarf. 2007. Modelling soccer matches using bivariate discrete distributions with general dependence structure. Statistica Neerlandica 61(4): 432–445 . Michels et al. [2023] Michels, R., M. Ötting, and D. Karlis. 2023. Extending the Dixon and Coles model: an application to women’s football data. arXiv preprint arXiv:2307.02139 . Michels et al. [2023] Michels, R., M. Ötting, and R. Langrock. 2023. Bettors’ reaction to match dynamics: Evidence from in-game betting. European Journal of Operational Research 310(3): 1118–1127 . Ntzoufras et al. [2021] Ntzoufras, I., V. Palaskas, and S. Drikos. 2021. Bayesian models for prediction of the set-difference in volleyball. IMA Journal of Management Mathematics 32(4): 491–518 . Ötting et al. [2024] Ötting, M., R. Michels, R. Langrock, and C. Deutscher. 2024. Demand for live betting: An analysis using state-space models. Applied Stochastic Models in Business and Industry . Pelechrinis and Winston [2021] Pelechrinis, K. and W. Winston. 2021. A Skellam regression model for quantifying positional value in soccer. Journal of Quantitative Analysis in Sports 17(3): 187–201 . Prieto et al. [2016] Prieto, J., M.Á. Gómez, A. Volossovitch, and J. Sampaio. 2016. Effects of team timeouts on the teams’ scoring performance in elite handball close games. Kinesiology 48(1.): 115–123 . Singh et al. [2023] Singh, A., P. Scarf, and R. Baker. 2023. A unified theory for bivariate scores in possessive ball-sports: The case of handball. European Journal of Operational Research 304(3): 1099–1112 . Skellam [1946] Skellam, J. 1946. The frequency distribution of the difference between two Poisson variates belonging to different populations. Journal of the Royal Statistical Society. Series A 109(3): 296–296 . Smiatek and Heuer [2012] Smiatek, J. and A. Heuer. 2012. A statistical view on team handball results: home advantage, team fitness and prediction of match outcomes. arXiv preprint arXiv:1207.0700 . Tomy and Veena [2022] Tomy, L. and G. Veena. 2022. A retrospective study on Skellam and related distributions. Austrian Journal of Statistics 51(1): 102–111 . Van Eetvelde et al. [2023] Van Eetvelde, H., L.M. Hvattum, and C. Ley. 2023. The probabilistic final standing calculator: a fair stochastic tool to handle abruptly stopped football seasons. AStA Advances in Statistical Analysis 107(1-2): 251–269 . Volossovitch and Debanne [2021] Volossovitch, A. and T. Debanne. 2021. Home advantage in handball. Home Advantage in Sport: Causes and the Effect on Performance: 220–227 . Csató, L. 2021. Coronavirus and sports leagues: obtaining a fair ranking when the season cannot resume. IMA Journal of Management Mathematics 32(4): 547–560 . Dixon and Coles [1997] Dixon, M.J. and S.G. Coles. 1997. Modelling association football scores and inefficiencies in the football betting market. Journal of the Royal Statistical Society: Series C (Applied Statistics) 46(2): 265–280 . Dumangane et al. [2009] Dumangane, M., N. Rosati, and A. Volossovitch. 2009. Departure from independence and stationarity in a handball match. Journal of Applied Statistics 36(7): 723–741 . Felice [2023] Felice, F. 2023. Ranking handball teams from statistical strength estimation. arXiv preprint arXiv:2307.06754 . Felice and Ley [2023] Felice, F. and C. Ley. 2023. Prediction of handball matches with statistically enhanced learning via estimated team strengths. arXiv preprint arXiv:2307.11777 . Groll et al. [2020] Groll, A., J. Heiner, G. Schauberger, and J. Uhrmeister. 2020. Prediction of the 2019 IHF World Men’s Handball Championship–a sparse Gaussian approximation model. Journal of Sports Analytics 6(3): 187–197 . Holmes and McHale [2024] Holmes, B. and I.G. McHale. 2024. Forecasting football match results using a player rating based model. International Journal of Forecasting 40(1): 302–312 . Irwin [1937] Irwin, J.O. 1937. The frequency distribution of the difference between two independent variates following the same Poisson distribution. Journal of the Royal Statistical Society 100(3): 415–416 . Jiang et al. [2014] Jiang, L., K. Mao, and R. Wu. 2014. A Skellam model to identify differential patterns of gene expression induced by environmental signals. BMC Genomics 15(1): 1–9 . Karlis and Mamode Khan [2023] Karlis, D. and N. Mamode Khan. 2023. Models for integer data. Annual Review of Statistics and its Application 10: 297–323 . Karlis and Ntzoufras [2006] Karlis, D. and I. Ntzoufras. 2006. Bayesian analysis of the differences of count data. Statistics in Medicine 25(11): 1885–1905 . Koopman et al. [2017] Koopman, S.J., R. Lit, and A. Lucas. 2017. Intraday stochastic volatility in discrete price changes: the dynamic Skellam model. Journal of the American Statistical Association 112(520): 1490–1503 . Lago-Peñas et al. [2013] Lago-Peñas, C., M.A. Gomez, J. Viaño, and I. González-García. 2013. Home advantage in elite handball: the impact of the quality of opposition on team performance. International Journal of Performance Analysis in Sport 13(3): 724–733 . Maher [1982] Maher, M.J. 1982. Modelling association football scores. Statistica Neerlandica 36(3): 109–118 . McHale and Scarf [2007] McHale, I. and P. Scarf. 2007. Modelling soccer matches using bivariate discrete distributions with general dependence structure. Statistica Neerlandica 61(4): 432–445 . Michels et al. [2023] Michels, R., M. Ötting, and D. Karlis. 2023. Extending the Dixon and Coles model: an application to women’s football data. arXiv preprint arXiv:2307.02139 . Michels et al. [2023] Michels, R., M. Ötting, and R. Langrock. 2023. Bettors’ reaction to match dynamics: Evidence from in-game betting. European Journal of Operational Research 310(3): 1118–1127 . Ntzoufras et al. [2021] Ntzoufras, I., V. Palaskas, and S. Drikos. 2021. Bayesian models for prediction of the set-difference in volleyball. IMA Journal of Management Mathematics 32(4): 491–518 . Ötting et al. [2024] Ötting, M., R. Michels, R. Langrock, and C. Deutscher. 2024. Demand for live betting: An analysis using state-space models. Applied Stochastic Models in Business and Industry . Pelechrinis and Winston [2021] Pelechrinis, K. and W. Winston. 2021. A Skellam regression model for quantifying positional value in soccer. Journal of Quantitative Analysis in Sports 17(3): 187–201 . Prieto et al. [2016] Prieto, J., M.Á. Gómez, A. Volossovitch, and J. Sampaio. 2016. Effects of team timeouts on the teams’ scoring performance in elite handball close games. Kinesiology 48(1.): 115–123 . Singh et al. [2023] Singh, A., P. Scarf, and R. Baker. 2023. A unified theory for bivariate scores in possessive ball-sports: The case of handball. European Journal of Operational Research 304(3): 1099–1112 . Skellam [1946] Skellam, J. 1946. The frequency distribution of the difference between two Poisson variates belonging to different populations. Journal of the Royal Statistical Society. Series A 109(3): 296–296 . Smiatek and Heuer [2012] Smiatek, J. and A. Heuer. 2012. A statistical view on team handball results: home advantage, team fitness and prediction of match outcomes. arXiv preprint arXiv:1207.0700 . Tomy and Veena [2022] Tomy, L. and G. Veena. 2022. A retrospective study on Skellam and related distributions. Austrian Journal of Statistics 51(1): 102–111 . Van Eetvelde et al. [2023] Van Eetvelde, H., L.M. Hvattum, and C. Ley. 2023. The probabilistic final standing calculator: a fair stochastic tool to handle abruptly stopped football seasons. AStA Advances in Statistical Analysis 107(1-2): 251–269 . Volossovitch and Debanne [2021] Volossovitch, A. and T. Debanne. 2021. Home advantage in handball. Home Advantage in Sport: Causes and the Effect on Performance: 220–227 . Dixon, M.J. and S.G. Coles. 1997. Modelling association football scores and inefficiencies in the football betting market. Journal of the Royal Statistical Society: Series C (Applied Statistics) 46(2): 265–280 . Dumangane et al. [2009] Dumangane, M., N. Rosati, and A. Volossovitch. 2009. Departure from independence and stationarity in a handball match. Journal of Applied Statistics 36(7): 723–741 . Felice [2023] Felice, F. 2023. Ranking handball teams from statistical strength estimation. arXiv preprint arXiv:2307.06754 . Felice and Ley [2023] Felice, F. and C. Ley. 2023. Prediction of handball matches with statistically enhanced learning via estimated team strengths. arXiv preprint arXiv:2307.11777 . Groll et al. [2020] Groll, A., J. Heiner, G. Schauberger, and J. Uhrmeister. 2020. Prediction of the 2019 IHF World Men’s Handball Championship–a sparse Gaussian approximation model. Journal of Sports Analytics 6(3): 187–197 . Holmes and McHale [2024] Holmes, B. and I.G. McHale. 2024. Forecasting football match results using a player rating based model. International Journal of Forecasting 40(1): 302–312 . Irwin [1937] Irwin, J.O. 1937. The frequency distribution of the difference between two independent variates following the same Poisson distribution. Journal of the Royal Statistical Society 100(3): 415–416 . Jiang et al. [2014] Jiang, L., K. Mao, and R. Wu. 2014. A Skellam model to identify differential patterns of gene expression induced by environmental signals. BMC Genomics 15(1): 1–9 . Karlis and Mamode Khan [2023] Karlis, D. and N. Mamode Khan. 2023. Models for integer data. Annual Review of Statistics and its Application 10: 297–323 . Karlis and Ntzoufras [2006] Karlis, D. and I. Ntzoufras. 2006. Bayesian analysis of the differences of count data. Statistics in Medicine 25(11): 1885–1905 . Koopman et al. [2017] Koopman, S.J., R. Lit, and A. Lucas. 2017. Intraday stochastic volatility in discrete price changes: the dynamic Skellam model. Journal of the American Statistical Association 112(520): 1490–1503 . Lago-Peñas et al. [2013] Lago-Peñas, C., M.A. Gomez, J. Viaño, and I. González-García. 2013. Home advantage in elite handball: the impact of the quality of opposition on team performance. International Journal of Performance Analysis in Sport 13(3): 724–733 . Maher [1982] Maher, M.J. 1982. Modelling association football scores. Statistica Neerlandica 36(3): 109–118 . McHale and Scarf [2007] McHale, I. and P. Scarf. 2007. Modelling soccer matches using bivariate discrete distributions with general dependence structure. Statistica Neerlandica 61(4): 432–445 . Michels et al. [2023] Michels, R., M. Ötting, and D. Karlis. 2023. Extending the Dixon and Coles model: an application to women’s football data. arXiv preprint arXiv:2307.02139 . Michels et al. [2023] Michels, R., M. Ötting, and R. Langrock. 2023. Bettors’ reaction to match dynamics: Evidence from in-game betting. European Journal of Operational Research 310(3): 1118–1127 . Ntzoufras et al. [2021] Ntzoufras, I., V. Palaskas, and S. Drikos. 2021. Bayesian models for prediction of the set-difference in volleyball. IMA Journal of Management Mathematics 32(4): 491–518 . Ötting et al. [2024] Ötting, M., R. Michels, R. Langrock, and C. Deutscher. 2024. Demand for live betting: An analysis using state-space models. Applied Stochastic Models in Business and Industry . Pelechrinis and Winston [2021] Pelechrinis, K. and W. Winston. 2021. A Skellam regression model for quantifying positional value in soccer. Journal of Quantitative Analysis in Sports 17(3): 187–201 . Prieto et al. [2016] Prieto, J., M.Á. Gómez, A. Volossovitch, and J. Sampaio. 2016. Effects of team timeouts on the teams’ scoring performance in elite handball close games. Kinesiology 48(1.): 115–123 . Singh et al. [2023] Singh, A., P. Scarf, and R. Baker. 2023. A unified theory for bivariate scores in possessive ball-sports: The case of handball. European Journal of Operational Research 304(3): 1099–1112 . Skellam [1946] Skellam, J. 1946. The frequency distribution of the difference between two Poisson variates belonging to different populations. Journal of the Royal Statistical Society. Series A 109(3): 296–296 . Smiatek and Heuer [2012] Smiatek, J. and A. Heuer. 2012. A statistical view on team handball results: home advantage, team fitness and prediction of match outcomes. arXiv preprint arXiv:1207.0700 . Tomy and Veena [2022] Tomy, L. and G. Veena. 2022. A retrospective study on Skellam and related distributions. Austrian Journal of Statistics 51(1): 102–111 . Van Eetvelde et al. [2023] Van Eetvelde, H., L.M. Hvattum, and C. Ley. 2023. The probabilistic final standing calculator: a fair stochastic tool to handle abruptly stopped football seasons. AStA Advances in Statistical Analysis 107(1-2): 251–269 . Volossovitch and Debanne [2021] Volossovitch, A. and T. Debanne. 2021. Home advantage in handball. Home Advantage in Sport: Causes and the Effect on Performance: 220–227 . Dumangane, M., N. Rosati, and A. Volossovitch. 2009. Departure from independence and stationarity in a handball match. Journal of Applied Statistics 36(7): 723–741 . Felice [2023] Felice, F. 2023. Ranking handball teams from statistical strength estimation. arXiv preprint arXiv:2307.06754 . Felice and Ley [2023] Felice, F. and C. Ley. 2023. Prediction of handball matches with statistically enhanced learning via estimated team strengths. arXiv preprint arXiv:2307.11777 . Groll et al. [2020] Groll, A., J. Heiner, G. Schauberger, and J. Uhrmeister. 2020. Prediction of the 2019 IHF World Men’s Handball Championship–a sparse Gaussian approximation model. Journal of Sports Analytics 6(3): 187–197 . Holmes and McHale [2024] Holmes, B. and I.G. McHale. 2024. Forecasting football match results using a player rating based model. International Journal of Forecasting 40(1): 302–312 . Irwin [1937] Irwin, J.O. 1937. The frequency distribution of the difference between two independent variates following the same Poisson distribution. Journal of the Royal Statistical Society 100(3): 415–416 . Jiang et al. [2014] Jiang, L., K. Mao, and R. Wu. 2014. A Skellam model to identify differential patterns of gene expression induced by environmental signals. BMC Genomics 15(1): 1–9 . Karlis and Mamode Khan [2023] Karlis, D. and N. Mamode Khan. 2023. Models for integer data. Annual Review of Statistics and its Application 10: 297–323 . Karlis and Ntzoufras [2006] Karlis, D. and I. Ntzoufras. 2006. Bayesian analysis of the differences of count data. Statistics in Medicine 25(11): 1885–1905 . Koopman et al. [2017] Koopman, S.J., R. Lit, and A. Lucas. 2017. Intraday stochastic volatility in discrete price changes: the dynamic Skellam model. Journal of the American Statistical Association 112(520): 1490–1503 . Lago-Peñas et al. [2013] Lago-Peñas, C., M.A. Gomez, J. Viaño, and I. González-García. 2013. Home advantage in elite handball: the impact of the quality of opposition on team performance. International Journal of Performance Analysis in Sport 13(3): 724–733 . Maher [1982] Maher, M.J. 1982. Modelling association football scores. Statistica Neerlandica 36(3): 109–118 . McHale and Scarf [2007] McHale, I. and P. Scarf. 2007. Modelling soccer matches using bivariate discrete distributions with general dependence structure. Statistica Neerlandica 61(4): 432–445 . Michels et al. [2023] Michels, R., M. Ötting, and D. Karlis. 2023. Extending the Dixon and Coles model: an application to women’s football data. arXiv preprint arXiv:2307.02139 . Michels et al. [2023] Michels, R., M. Ötting, and R. Langrock. 2023. Bettors’ reaction to match dynamics: Evidence from in-game betting. European Journal of Operational Research 310(3): 1118–1127 . Ntzoufras et al. [2021] Ntzoufras, I., V. Palaskas, and S. Drikos. 2021. Bayesian models for prediction of the set-difference in volleyball. IMA Journal of Management Mathematics 32(4): 491–518 . Ötting et al. [2024] Ötting, M., R. Michels, R. Langrock, and C. Deutscher. 2024. Demand for live betting: An analysis using state-space models. Applied Stochastic Models in Business and Industry . Pelechrinis and Winston [2021] Pelechrinis, K. and W. Winston. 2021. A Skellam regression model for quantifying positional value in soccer. Journal of Quantitative Analysis in Sports 17(3): 187–201 . Prieto et al. [2016] Prieto, J., M.Á. Gómez, A. Volossovitch, and J. Sampaio. 2016. Effects of team timeouts on the teams’ scoring performance in elite handball close games. Kinesiology 48(1.): 115–123 . Singh et al. [2023] Singh, A., P. Scarf, and R. Baker. 2023. A unified theory for bivariate scores in possessive ball-sports: The case of handball. European Journal of Operational Research 304(3): 1099–1112 . Skellam [1946] Skellam, J. 1946. The frequency distribution of the difference between two Poisson variates belonging to different populations. Journal of the Royal Statistical Society. Series A 109(3): 296–296 . Smiatek and Heuer [2012] Smiatek, J. and A. Heuer. 2012. A statistical view on team handball results: home advantage, team fitness and prediction of match outcomes. arXiv preprint arXiv:1207.0700 . Tomy and Veena [2022] Tomy, L. and G. Veena. 2022. A retrospective study on Skellam and related distributions. Austrian Journal of Statistics 51(1): 102–111 . Van Eetvelde et al. [2023] Van Eetvelde, H., L.M. Hvattum, and C. Ley. 2023. The probabilistic final standing calculator: a fair stochastic tool to handle abruptly stopped football seasons. AStA Advances in Statistical Analysis 107(1-2): 251–269 . Volossovitch and Debanne [2021] Volossovitch, A. and T. Debanne. 2021. Home advantage in handball. Home Advantage in Sport: Causes and the Effect on Performance: 220–227 . Felice, F. 2023. Ranking handball teams from statistical strength estimation. arXiv preprint arXiv:2307.06754 . Felice and Ley [2023] Felice, F. and C. Ley. 2023. Prediction of handball matches with statistically enhanced learning via estimated team strengths. arXiv preprint arXiv:2307.11777 . Groll et al. [2020] Groll, A., J. Heiner, G. Schauberger, and J. Uhrmeister. 2020. Prediction of the 2019 IHF World Men’s Handball Championship–a sparse Gaussian approximation model. Journal of Sports Analytics 6(3): 187–197 . Holmes and McHale [2024] Holmes, B. and I.G. McHale. 2024. Forecasting football match results using a player rating based model. International Journal of Forecasting 40(1): 302–312 . Irwin [1937] Irwin, J.O. 1937. The frequency distribution of the difference between two independent variates following the same Poisson distribution. Journal of the Royal Statistical Society 100(3): 415–416 . Jiang et al. [2014] Jiang, L., K. Mao, and R. Wu. 2014. A Skellam model to identify differential patterns of gene expression induced by environmental signals. BMC Genomics 15(1): 1–9 . Karlis and Mamode Khan [2023] Karlis, D. and N. Mamode Khan. 2023. Models for integer data. Annual Review of Statistics and its Application 10: 297–323 . Karlis and Ntzoufras [2006] Karlis, D. and I. Ntzoufras. 2006. Bayesian analysis of the differences of count data. Statistics in Medicine 25(11): 1885–1905 . Koopman et al. [2017] Koopman, S.J., R. Lit, and A. Lucas. 2017. Intraday stochastic volatility in discrete price changes: the dynamic Skellam model. Journal of the American Statistical Association 112(520): 1490–1503 . Lago-Peñas et al. [2013] Lago-Peñas, C., M.A. Gomez, J. Viaño, and I. González-García. 2013. Home advantage in elite handball: the impact of the quality of opposition on team performance. International Journal of Performance Analysis in Sport 13(3): 724–733 . Maher [1982] Maher, M.J. 1982. Modelling association football scores. Statistica Neerlandica 36(3): 109–118 . McHale and Scarf [2007] McHale, I. and P. Scarf. 2007. Modelling soccer matches using bivariate discrete distributions with general dependence structure. Statistica Neerlandica 61(4): 432–445 . Michels et al. [2023] Michels, R., M. Ötting, and D. Karlis. 2023. Extending the Dixon and Coles model: an application to women’s football data. arXiv preprint arXiv:2307.02139 . Michels et al. [2023] Michels, R., M. Ötting, and R. Langrock. 2023. Bettors’ reaction to match dynamics: Evidence from in-game betting. European Journal of Operational Research 310(3): 1118–1127 . Ntzoufras et al. [2021] Ntzoufras, I., V. Palaskas, and S. Drikos. 2021. Bayesian models for prediction of the set-difference in volleyball. IMA Journal of Management Mathematics 32(4): 491–518 . Ötting et al. [2024] Ötting, M., R. Michels, R. Langrock, and C. Deutscher. 2024. Demand for live betting: An analysis using state-space models. Applied Stochastic Models in Business and Industry . Pelechrinis and Winston [2021] Pelechrinis, K. and W. Winston. 2021. A Skellam regression model for quantifying positional value in soccer. Journal of Quantitative Analysis in Sports 17(3): 187–201 . Prieto et al. [2016] Prieto, J., M.Á. Gómez, A. Volossovitch, and J. Sampaio. 2016. Effects of team timeouts on the teams’ scoring performance in elite handball close games. Kinesiology 48(1.): 115–123 . Singh et al. [2023] Singh, A., P. Scarf, and R. Baker. 2023. A unified theory for bivariate scores in possessive ball-sports: The case of handball. European Journal of Operational Research 304(3): 1099–1112 . Skellam [1946] Skellam, J. 1946. The frequency distribution of the difference between two Poisson variates belonging to different populations. Journal of the Royal Statistical Society. Series A 109(3): 296–296 . Smiatek and Heuer [2012] Smiatek, J. and A. Heuer. 2012. A statistical view on team handball results: home advantage, team fitness and prediction of match outcomes. arXiv preprint arXiv:1207.0700 . Tomy and Veena [2022] Tomy, L. and G. Veena. 2022. A retrospective study on Skellam and related distributions. Austrian Journal of Statistics 51(1): 102–111 . Van Eetvelde et al. [2023] Van Eetvelde, H., L.M. Hvattum, and C. Ley. 2023. The probabilistic final standing calculator: a fair stochastic tool to handle abruptly stopped football seasons. AStA Advances in Statistical Analysis 107(1-2): 251–269 . Volossovitch and Debanne [2021] Volossovitch, A. and T. Debanne. 2021. Home advantage in handball. Home Advantage in Sport: Causes and the Effect on Performance: 220–227 . Felice, F. and C. Ley. 2023. Prediction of handball matches with statistically enhanced learning via estimated team strengths. arXiv preprint arXiv:2307.11777 . Groll et al. [2020] Groll, A., J. Heiner, G. Schauberger, and J. Uhrmeister. 2020. Prediction of the 2019 IHF World Men’s Handball Championship–a sparse Gaussian approximation model. Journal of Sports Analytics 6(3): 187–197 . Holmes and McHale [2024] Holmes, B. and I.G. McHale. 2024. Forecasting football match results using a player rating based model. International Journal of Forecasting 40(1): 302–312 . Irwin [1937] Irwin, J.O. 1937. The frequency distribution of the difference between two independent variates following the same Poisson distribution. Journal of the Royal Statistical Society 100(3): 415–416 . Jiang et al. [2014] Jiang, L., K. Mao, and R. Wu. 2014. A Skellam model to identify differential patterns of gene expression induced by environmental signals. BMC Genomics 15(1): 1–9 . Karlis and Mamode Khan [2023] Karlis, D. and N. Mamode Khan. 2023. Models for integer data. Annual Review of Statistics and its Application 10: 297–323 . Karlis and Ntzoufras [2006] Karlis, D. and I. Ntzoufras. 2006. Bayesian analysis of the differences of count data. Statistics in Medicine 25(11): 1885–1905 . Koopman et al. [2017] Koopman, S.J., R. Lit, and A. Lucas. 2017. Intraday stochastic volatility in discrete price changes: the dynamic Skellam model. Journal of the American Statistical Association 112(520): 1490–1503 . Lago-Peñas et al. [2013] Lago-Peñas, C., M.A. Gomez, J. Viaño, and I. González-García. 2013. Home advantage in elite handball: the impact of the quality of opposition on team performance. International Journal of Performance Analysis in Sport 13(3): 724–733 . Maher [1982] Maher, M.J. 1982. Modelling association football scores. Statistica Neerlandica 36(3): 109–118 . McHale and Scarf [2007] McHale, I. and P. Scarf. 2007. Modelling soccer matches using bivariate discrete distributions with general dependence structure. Statistica Neerlandica 61(4): 432–445 . Michels et al. [2023] Michels, R., M. Ötting, and D. Karlis. 2023. Extending the Dixon and Coles model: an application to women’s football data. arXiv preprint arXiv:2307.02139 . Michels et al. [2023] Michels, R., M. Ötting, and R. Langrock. 2023. Bettors’ reaction to match dynamics: Evidence from in-game betting. European Journal of Operational Research 310(3): 1118–1127 . Ntzoufras et al. [2021] Ntzoufras, I., V. Palaskas, and S. Drikos. 2021. Bayesian models for prediction of the set-difference in volleyball. IMA Journal of Management Mathematics 32(4): 491–518 . Ötting et al. [2024] Ötting, M., R. Michels, R. Langrock, and C. Deutscher. 2024. Demand for live betting: An analysis using state-space models. Applied Stochastic Models in Business and Industry . Pelechrinis and Winston [2021] Pelechrinis, K. and W. Winston. 2021. A Skellam regression model for quantifying positional value in soccer. Journal of Quantitative Analysis in Sports 17(3): 187–201 . Prieto et al. [2016] Prieto, J., M.Á. Gómez, A. Volossovitch, and J. Sampaio. 2016. Effects of team timeouts on the teams’ scoring performance in elite handball close games. Kinesiology 48(1.): 115–123 . Singh et al. [2023] Singh, A., P. Scarf, and R. Baker. 2023. A unified theory for bivariate scores in possessive ball-sports: The case of handball. European Journal of Operational Research 304(3): 1099–1112 . Skellam [1946] Skellam, J. 1946. The frequency distribution of the difference between two Poisson variates belonging to different populations. Journal of the Royal Statistical Society. Series A 109(3): 296–296 . Smiatek and Heuer [2012] Smiatek, J. and A. Heuer. 2012. A statistical view on team handball results: home advantage, team fitness and prediction of match outcomes. arXiv preprint arXiv:1207.0700 . Tomy and Veena [2022] Tomy, L. and G. Veena. 2022. A retrospective study on Skellam and related distributions. Austrian Journal of Statistics 51(1): 102–111 . Van Eetvelde et al. [2023] Van Eetvelde, H., L.M. Hvattum, and C. Ley. 2023. The probabilistic final standing calculator: a fair stochastic tool to handle abruptly stopped football seasons. AStA Advances in Statistical Analysis 107(1-2): 251–269 . Volossovitch and Debanne [2021] Volossovitch, A. and T. Debanne. 2021. Home advantage in handball. Home Advantage in Sport: Causes and the Effect on Performance: 220–227 . Groll, A., J. Heiner, G. Schauberger, and J. Uhrmeister. 2020. Prediction of the 2019 IHF World Men’s Handball Championship–a sparse Gaussian approximation model. Journal of Sports Analytics 6(3): 187–197 . Holmes and McHale [2024] Holmes, B. and I.G. McHale. 2024. Forecasting football match results using a player rating based model. International Journal of Forecasting 40(1): 302–312 . Irwin [1937] Irwin, J.O. 1937. The frequency distribution of the difference between two independent variates following the same Poisson distribution. Journal of the Royal Statistical Society 100(3): 415–416 . Jiang et al. [2014] Jiang, L., K. Mao, and R. Wu. 2014. A Skellam model to identify differential patterns of gene expression induced by environmental signals. BMC Genomics 15(1): 1–9 . Karlis and Mamode Khan [2023] Karlis, D. and N. Mamode Khan. 2023. Models for integer data. Annual Review of Statistics and its Application 10: 297–323 . Karlis and Ntzoufras [2006] Karlis, D. and I. Ntzoufras. 2006. Bayesian analysis of the differences of count data. Statistics in Medicine 25(11): 1885–1905 . Koopman et al. [2017] Koopman, S.J., R. Lit, and A. Lucas. 2017. Intraday stochastic volatility in discrete price changes: the dynamic Skellam model. Journal of the American Statistical Association 112(520): 1490–1503 . Lago-Peñas et al. [2013] Lago-Peñas, C., M.A. Gomez, J. Viaño, and I. González-García. 2013. Home advantage in elite handball: the impact of the quality of opposition on team performance. International Journal of Performance Analysis in Sport 13(3): 724–733 . Maher [1982] Maher, M.J. 1982. Modelling association football scores. Statistica Neerlandica 36(3): 109–118 . McHale and Scarf [2007] McHale, I. and P. Scarf. 2007. Modelling soccer matches using bivariate discrete distributions with general dependence structure. Statistica Neerlandica 61(4): 432–445 . Michels et al. [2023] Michels, R., M. Ötting, and D. Karlis. 2023. Extending the Dixon and Coles model: an application to women’s football data. arXiv preprint arXiv:2307.02139 . Michels et al. [2023] Michels, R., M. Ötting, and R. Langrock. 2023. Bettors’ reaction to match dynamics: Evidence from in-game betting. European Journal of Operational Research 310(3): 1118–1127 . Ntzoufras et al. [2021] Ntzoufras, I., V. Palaskas, and S. Drikos. 2021. Bayesian models for prediction of the set-difference in volleyball. IMA Journal of Management Mathematics 32(4): 491–518 . Ötting et al. [2024] Ötting, M., R. Michels, R. Langrock, and C. Deutscher. 2024. Demand for live betting: An analysis using state-space models. Applied Stochastic Models in Business and Industry . Pelechrinis and Winston [2021] Pelechrinis, K. and W. Winston. 2021. A Skellam regression model for quantifying positional value in soccer. Journal of Quantitative Analysis in Sports 17(3): 187–201 . Prieto et al. [2016] Prieto, J., M.Á. Gómez, A. Volossovitch, and J. Sampaio. 2016. Effects of team timeouts on the teams’ scoring performance in elite handball close games. Kinesiology 48(1.): 115–123 . Singh et al. [2023] Singh, A., P. Scarf, and R. Baker. 2023. A unified theory for bivariate scores in possessive ball-sports: The case of handball. European Journal of Operational Research 304(3): 1099–1112 . Skellam [1946] Skellam, J. 1946. The frequency distribution of the difference between two Poisson variates belonging to different populations. Journal of the Royal Statistical Society. Series A 109(3): 296–296 . Smiatek and Heuer [2012] Smiatek, J. and A. Heuer. 2012. A statistical view on team handball results: home advantage, team fitness and prediction of match outcomes. arXiv preprint arXiv:1207.0700 . Tomy and Veena [2022] Tomy, L. and G. Veena. 2022. A retrospective study on Skellam and related distributions. Austrian Journal of Statistics 51(1): 102–111 . Van Eetvelde et al. [2023] Van Eetvelde, H., L.M. Hvattum, and C. Ley. 2023. The probabilistic final standing calculator: a fair stochastic tool to handle abruptly stopped football seasons. AStA Advances in Statistical Analysis 107(1-2): 251–269 . Volossovitch and Debanne [2021] Volossovitch, A. and T. Debanne. 2021. Home advantage in handball. Home Advantage in Sport: Causes and the Effect on Performance: 220–227 . Holmes, B. and I.G. McHale. 2024. Forecasting football match results using a player rating based model. International Journal of Forecasting 40(1): 302–312 . Irwin [1937] Irwin, J.O. 1937. The frequency distribution of the difference between two independent variates following the same Poisson distribution. Journal of the Royal Statistical Society 100(3): 415–416 . Jiang et al. [2014] Jiang, L., K. Mao, and R. Wu. 2014. A Skellam model to identify differential patterns of gene expression induced by environmental signals. BMC Genomics 15(1): 1–9 . Karlis and Mamode Khan [2023] Karlis, D. and N. Mamode Khan. 2023. Models for integer data. Annual Review of Statistics and its Application 10: 297–323 . Karlis and Ntzoufras [2006] Karlis, D. and I. Ntzoufras. 2006. Bayesian analysis of the differences of count data. Statistics in Medicine 25(11): 1885–1905 . Koopman et al. [2017] Koopman, S.J., R. Lit, and A. Lucas. 2017. Intraday stochastic volatility in discrete price changes: the dynamic Skellam model. Journal of the American Statistical Association 112(520): 1490–1503 . Lago-Peñas et al. [2013] Lago-Peñas, C., M.A. Gomez, J. Viaño, and I. González-García. 2013. Home advantage in elite handball: the impact of the quality of opposition on team performance. International Journal of Performance Analysis in Sport 13(3): 724–733 . Maher [1982] Maher, M.J. 1982. Modelling association football scores. Statistica Neerlandica 36(3): 109–118 . McHale and Scarf [2007] McHale, I. and P. Scarf. 2007. Modelling soccer matches using bivariate discrete distributions with general dependence structure. Statistica Neerlandica 61(4): 432–445 . Michels et al. [2023] Michels, R., M. Ötting, and D. Karlis. 2023. Extending the Dixon and Coles model: an application to women’s football data. arXiv preprint arXiv:2307.02139 . Michels et al. [2023] Michels, R., M. Ötting, and R. Langrock. 2023. Bettors’ reaction to match dynamics: Evidence from in-game betting. European Journal of Operational Research 310(3): 1118–1127 . Ntzoufras et al. [2021] Ntzoufras, I., V. Palaskas, and S. Drikos. 2021. Bayesian models for prediction of the set-difference in volleyball. IMA Journal of Management Mathematics 32(4): 491–518 . Ötting et al. [2024] Ötting, M., R. Michels, R. Langrock, and C. Deutscher. 2024. Demand for live betting: An analysis using state-space models. Applied Stochastic Models in Business and Industry . Pelechrinis and Winston [2021] Pelechrinis, K. and W. Winston. 2021. A Skellam regression model for quantifying positional value in soccer. Journal of Quantitative Analysis in Sports 17(3): 187–201 . Prieto et al. [2016] Prieto, J., M.Á. Gómez, A. Volossovitch, and J. Sampaio. 2016. Effects of team timeouts on the teams’ scoring performance in elite handball close games. Kinesiology 48(1.): 115–123 . Singh et al. [2023] Singh, A., P. Scarf, and R. Baker. 2023. A unified theory for bivariate scores in possessive ball-sports: The case of handball. European Journal of Operational Research 304(3): 1099–1112 . Skellam [1946] Skellam, J. 1946. The frequency distribution of the difference between two Poisson variates belonging to different populations. Journal of the Royal Statistical Society. Series A 109(3): 296–296 . Smiatek and Heuer [2012] Smiatek, J. and A. Heuer. 2012. A statistical view on team handball results: home advantage, team fitness and prediction of match outcomes. arXiv preprint arXiv:1207.0700 . Tomy and Veena [2022] Tomy, L. and G. Veena. 2022. A retrospective study on Skellam and related distributions. Austrian Journal of Statistics 51(1): 102–111 . Van Eetvelde et al. [2023] Van Eetvelde, H., L.M. Hvattum, and C. Ley. 2023. The probabilistic final standing calculator: a fair stochastic tool to handle abruptly stopped football seasons. AStA Advances in Statistical Analysis 107(1-2): 251–269 . Volossovitch and Debanne [2021] Volossovitch, A. and T. Debanne. 2021. Home advantage in handball. Home Advantage in Sport: Causes and the Effect on Performance: 220–227 . Irwin, J.O. 1937. The frequency distribution of the difference between two independent variates following the same Poisson distribution. Journal of the Royal Statistical Society 100(3): 415–416 . Jiang et al. [2014] Jiang, L., K. Mao, and R. Wu. 2014. A Skellam model to identify differential patterns of gene expression induced by environmental signals. BMC Genomics 15(1): 1–9 . Karlis and Mamode Khan [2023] Karlis, D. and N. Mamode Khan. 2023. Models for integer data. Annual Review of Statistics and its Application 10: 297–323 . Karlis and Ntzoufras [2006] Karlis, D. and I. Ntzoufras. 2006. Bayesian analysis of the differences of count data. Statistics in Medicine 25(11): 1885–1905 . Koopman et al. [2017] Koopman, S.J., R. Lit, and A. Lucas. 2017. Intraday stochastic volatility in discrete price changes: the dynamic Skellam model. Journal of the American Statistical Association 112(520): 1490–1503 . Lago-Peñas et al. [2013] Lago-Peñas, C., M.A. Gomez, J. Viaño, and I. González-García. 2013. Home advantage in elite handball: the impact of the quality of opposition on team performance. International Journal of Performance Analysis in Sport 13(3): 724–733 . Maher [1982] Maher, M.J. 1982. Modelling association football scores. Statistica Neerlandica 36(3): 109–118 . McHale and Scarf [2007] McHale, I. and P. Scarf. 2007. Modelling soccer matches using bivariate discrete distributions with general dependence structure. Statistica Neerlandica 61(4): 432–445 . Michels et al. [2023] Michels, R., M. Ötting, and D. Karlis. 2023. Extending the Dixon and Coles model: an application to women’s football data. arXiv preprint arXiv:2307.02139 . Michels et al. [2023] Michels, R., M. Ötting, and R. Langrock. 2023. Bettors’ reaction to match dynamics: Evidence from in-game betting. European Journal of Operational Research 310(3): 1118–1127 . Ntzoufras et al. [2021] Ntzoufras, I., V. Palaskas, and S. Drikos. 2021. Bayesian models for prediction of the set-difference in volleyball. IMA Journal of Management Mathematics 32(4): 491–518 . Ötting et al. [2024] Ötting, M., R. Michels, R. Langrock, and C. Deutscher. 2024. Demand for live betting: An analysis using state-space models. Applied Stochastic Models in Business and Industry . Pelechrinis and Winston [2021] Pelechrinis, K. and W. Winston. 2021. A Skellam regression model for quantifying positional value in soccer. Journal of Quantitative Analysis in Sports 17(3): 187–201 . Prieto et al. [2016] Prieto, J., M.Á. Gómez, A. Volossovitch, and J. Sampaio. 2016. Effects of team timeouts on the teams’ scoring performance in elite handball close games. Kinesiology 48(1.): 115–123 . Singh et al. [2023] Singh, A., P. Scarf, and R. Baker. 2023. A unified theory for bivariate scores in possessive ball-sports: The case of handball. European Journal of Operational Research 304(3): 1099–1112 . Skellam [1946] Skellam, J. 1946. The frequency distribution of the difference between two Poisson variates belonging to different populations. Journal of the Royal Statistical Society. Series A 109(3): 296–296 . Smiatek and Heuer [2012] Smiatek, J. and A. Heuer. 2012. A statistical view on team handball results: home advantage, team fitness and prediction of match outcomes. arXiv preprint arXiv:1207.0700 . Tomy and Veena [2022] Tomy, L. and G. Veena. 2022. A retrospective study on Skellam and related distributions. Austrian Journal of Statistics 51(1): 102–111 . Van Eetvelde et al. [2023] Van Eetvelde, H., L.M. Hvattum, and C. Ley. 2023. The probabilistic final standing calculator: a fair stochastic tool to handle abruptly stopped football seasons. AStA Advances in Statistical Analysis 107(1-2): 251–269 . Volossovitch and Debanne [2021] Volossovitch, A. and T. Debanne. 2021. Home advantage in handball. Home Advantage in Sport: Causes and the Effect on Performance: 220–227 . Jiang, L., K. Mao, and R. Wu. 2014. A Skellam model to identify differential patterns of gene expression induced by environmental signals. BMC Genomics 15(1): 1–9 . Karlis and Mamode Khan [2023] Karlis, D. and N. Mamode Khan. 2023. Models for integer data. Annual Review of Statistics and its Application 10: 297–323 . Karlis and Ntzoufras [2006] Karlis, D. and I. Ntzoufras. 2006. Bayesian analysis of the differences of count data. Statistics in Medicine 25(11): 1885–1905 . Koopman et al. [2017] Koopman, S.J., R. Lit, and A. Lucas. 2017. Intraday stochastic volatility in discrete price changes: the dynamic Skellam model. Journal of the American Statistical Association 112(520): 1490–1503 . Lago-Peñas et al. [2013] Lago-Peñas, C., M.A. Gomez, J. Viaño, and I. González-García. 2013. Home advantage in elite handball: the impact of the quality of opposition on team performance. International Journal of Performance Analysis in Sport 13(3): 724–733 . Maher [1982] Maher, M.J. 1982. Modelling association football scores. Statistica Neerlandica 36(3): 109–118 . McHale and Scarf [2007] McHale, I. and P. Scarf. 2007. Modelling soccer matches using bivariate discrete distributions with general dependence structure. Statistica Neerlandica 61(4): 432–445 . Michels et al. [2023] Michels, R., M. Ötting, and D. Karlis. 2023. Extending the Dixon and Coles model: an application to women’s football data. arXiv preprint arXiv:2307.02139 . Michels et al. [2023] Michels, R., M. Ötting, and R. Langrock. 2023. Bettors’ reaction to match dynamics: Evidence from in-game betting. European Journal of Operational Research 310(3): 1118–1127 . Ntzoufras et al. [2021] Ntzoufras, I., V. Palaskas, and S. Drikos. 2021. Bayesian models for prediction of the set-difference in volleyball. IMA Journal of Management Mathematics 32(4): 491–518 . Ötting et al. [2024] Ötting, M., R. Michels, R. Langrock, and C. Deutscher. 2024. Demand for live betting: An analysis using state-space models. Applied Stochastic Models in Business and Industry . Pelechrinis and Winston [2021] Pelechrinis, K. and W. Winston. 2021. A Skellam regression model for quantifying positional value in soccer. Journal of Quantitative Analysis in Sports 17(3): 187–201 . Prieto et al. [2016] Prieto, J., M.Á. Gómez, A. Volossovitch, and J. Sampaio. 2016. Effects of team timeouts on the teams’ scoring performance in elite handball close games. Kinesiology 48(1.): 115–123 . Singh et al. [2023] Singh, A., P. Scarf, and R. Baker. 2023. A unified theory for bivariate scores in possessive ball-sports: The case of handball. European Journal of Operational Research 304(3): 1099–1112 . Skellam [1946] Skellam, J. 1946. The frequency distribution of the difference between two Poisson variates belonging to different populations. Journal of the Royal Statistical Society. Series A 109(3): 296–296 . Smiatek and Heuer [2012] Smiatek, J. and A. Heuer. 2012. A statistical view on team handball results: home advantage, team fitness and prediction of match outcomes. arXiv preprint arXiv:1207.0700 . Tomy and Veena [2022] Tomy, L. and G. Veena. 2022. A retrospective study on Skellam and related distributions. Austrian Journal of Statistics 51(1): 102–111 . Van Eetvelde et al. [2023] Van Eetvelde, H., L.M. Hvattum, and C. Ley. 2023. The probabilistic final standing calculator: a fair stochastic tool to handle abruptly stopped football seasons. AStA Advances in Statistical Analysis 107(1-2): 251–269 . Volossovitch and Debanne [2021] Volossovitch, A. and T. Debanne. 2021. Home advantage in handball. Home Advantage in Sport: Causes and the Effect on Performance: 220–227 . Karlis, D. and N. Mamode Khan. 2023. Models for integer data. Annual Review of Statistics and its Application 10: 297–323 . Karlis and Ntzoufras [2006] Karlis, D. and I. Ntzoufras. 2006. Bayesian analysis of the differences of count data. Statistics in Medicine 25(11): 1885–1905 . Koopman et al. [2017] Koopman, S.J., R. Lit, and A. Lucas. 2017. Intraday stochastic volatility in discrete price changes: the dynamic Skellam model. Journal of the American Statistical Association 112(520): 1490–1503 . Lago-Peñas et al. [2013] Lago-Peñas, C., M.A. Gomez, J. Viaño, and I. González-García. 2013. Home advantage in elite handball: the impact of the quality of opposition on team performance. International Journal of Performance Analysis in Sport 13(3): 724–733 . Maher [1982] Maher, M.J. 1982. Modelling association football scores. Statistica Neerlandica 36(3): 109–118 . McHale and Scarf [2007] McHale, I. and P. Scarf. 2007. Modelling soccer matches using bivariate discrete distributions with general dependence structure. Statistica Neerlandica 61(4): 432–445 . Michels et al. [2023] Michels, R., M. Ötting, and D. Karlis. 2023. Extending the Dixon and Coles model: an application to women’s football data. arXiv preprint arXiv:2307.02139 . Michels et al. [2023] Michels, R., M. Ötting, and R. Langrock. 2023. Bettors’ reaction to match dynamics: Evidence from in-game betting. European Journal of Operational Research 310(3): 1118–1127 . Ntzoufras et al. [2021] Ntzoufras, I., V. Palaskas, and S. Drikos. 2021. Bayesian models for prediction of the set-difference in volleyball. IMA Journal of Management Mathematics 32(4): 491–518 . Ötting et al. [2024] Ötting, M., R. Michels, R. Langrock, and C. Deutscher. 2024. Demand for live betting: An analysis using state-space models. Applied Stochastic Models in Business and Industry . Pelechrinis and Winston [2021] Pelechrinis, K. and W. Winston. 2021. A Skellam regression model for quantifying positional value in soccer. Journal of Quantitative Analysis in Sports 17(3): 187–201 . Prieto et al. [2016] Prieto, J., M.Á. Gómez, A. Volossovitch, and J. Sampaio. 2016. Effects of team timeouts on the teams’ scoring performance in elite handball close games. Kinesiology 48(1.): 115–123 . Singh et al. [2023] Singh, A., P. Scarf, and R. Baker. 2023. A unified theory for bivariate scores in possessive ball-sports: The case of handball. European Journal of Operational Research 304(3): 1099–1112 . Skellam [1946] Skellam, J. 1946. The frequency distribution of the difference between two Poisson variates belonging to different populations. Journal of the Royal Statistical Society. Series A 109(3): 296–296 . Smiatek and Heuer [2012] Smiatek, J. and A. Heuer. 2012. A statistical view on team handball results: home advantage, team fitness and prediction of match outcomes. arXiv preprint arXiv:1207.0700 . Tomy and Veena [2022] Tomy, L. and G. Veena. 2022. A retrospective study on Skellam and related distributions. Austrian Journal of Statistics 51(1): 102–111 . Van Eetvelde et al. [2023] Van Eetvelde, H., L.M. Hvattum, and C. Ley. 2023. The probabilistic final standing calculator: a fair stochastic tool to handle abruptly stopped football seasons. AStA Advances in Statistical Analysis 107(1-2): 251–269 . Volossovitch and Debanne [2021] Volossovitch, A. and T. Debanne. 2021. Home advantage in handball. Home Advantage in Sport: Causes and the Effect on Performance: 220–227 . Karlis, D. and I. Ntzoufras. 2006. Bayesian analysis of the differences of count data. Statistics in Medicine 25(11): 1885–1905 . Koopman et al. [2017] Koopman, S.J., R. Lit, and A. Lucas. 2017. Intraday stochastic volatility in discrete price changes: the dynamic Skellam model. Journal of the American Statistical Association 112(520): 1490–1503 . Lago-Peñas et al. [2013] Lago-Peñas, C., M.A. Gomez, J. Viaño, and I. González-García. 2013. Home advantage in elite handball: the impact of the quality of opposition on team performance. International Journal of Performance Analysis in Sport 13(3): 724–733 . Maher [1982] Maher, M.J. 1982. Modelling association football scores. Statistica Neerlandica 36(3): 109–118 . McHale and Scarf [2007] McHale, I. and P. Scarf. 2007. Modelling soccer matches using bivariate discrete distributions with general dependence structure. Statistica Neerlandica 61(4): 432–445 . Michels et al. [2023] Michels, R., M. Ötting, and D. Karlis. 2023. Extending the Dixon and Coles model: an application to women’s football data. arXiv preprint arXiv:2307.02139 . Michels et al. [2023] Michels, R., M. Ötting, and R. Langrock. 2023. Bettors’ reaction to match dynamics: Evidence from in-game betting. European Journal of Operational Research 310(3): 1118–1127 . Ntzoufras et al. [2021] Ntzoufras, I., V. Palaskas, and S. Drikos. 2021. Bayesian models for prediction of the set-difference in volleyball. IMA Journal of Management Mathematics 32(4): 491–518 . Ötting et al. [2024] Ötting, M., R. Michels, R. Langrock, and C. Deutscher. 2024. Demand for live betting: An analysis using state-space models. Applied Stochastic Models in Business and Industry . Pelechrinis and Winston [2021] Pelechrinis, K. and W. Winston. 2021. A Skellam regression model for quantifying positional value in soccer. Journal of Quantitative Analysis in Sports 17(3): 187–201 . Prieto et al. [2016] Prieto, J., M.Á. Gómez, A. Volossovitch, and J. Sampaio. 2016. Effects of team timeouts on the teams’ scoring performance in elite handball close games. Kinesiology 48(1.): 115–123 . Singh et al. [2023] Singh, A., P. Scarf, and R. Baker. 2023. A unified theory for bivariate scores in possessive ball-sports: The case of handball. European Journal of Operational Research 304(3): 1099–1112 . Skellam [1946] Skellam, J. 1946. The frequency distribution of the difference between two Poisson variates belonging to different populations. Journal of the Royal Statistical Society. Series A 109(3): 296–296 . Smiatek and Heuer [2012] Smiatek, J. and A. Heuer. 2012. A statistical view on team handball results: home advantage, team fitness and prediction of match outcomes. arXiv preprint arXiv:1207.0700 . Tomy and Veena [2022] Tomy, L. and G. Veena. 2022. A retrospective study on Skellam and related distributions. Austrian Journal of Statistics 51(1): 102–111 . Van Eetvelde et al. [2023] Van Eetvelde, H., L.M. Hvattum, and C. Ley. 2023. The probabilistic final standing calculator: a fair stochastic tool to handle abruptly stopped football seasons. AStA Advances in Statistical Analysis 107(1-2): 251–269 . Volossovitch and Debanne [2021] Volossovitch, A. and T. Debanne. 2021. Home advantage in handball. Home Advantage in Sport: Causes and the Effect on Performance: 220–227 . Koopman, S.J., R. Lit, and A. Lucas. 2017. Intraday stochastic volatility in discrete price changes: the dynamic Skellam model. Journal of the American Statistical Association 112(520): 1490–1503 . Lago-Peñas et al. [2013] Lago-Peñas, C., M.A. Gomez, J. Viaño, and I. González-García. 2013. Home advantage in elite handball: the impact of the quality of opposition on team performance. International Journal of Performance Analysis in Sport 13(3): 724–733 . Maher [1982] Maher, M.J. 1982. Modelling association football scores. Statistica Neerlandica 36(3): 109–118 . McHale and Scarf [2007] McHale, I. and P. Scarf. 2007. Modelling soccer matches using bivariate discrete distributions with general dependence structure. Statistica Neerlandica 61(4): 432–445 . Michels et al. [2023] Michels, R., M. Ötting, and D. Karlis. 2023. Extending the Dixon and Coles model: an application to women’s football data. arXiv preprint arXiv:2307.02139 . Michels et al. [2023] Michels, R., M. Ötting, and R. Langrock. 2023. Bettors’ reaction to match dynamics: Evidence from in-game betting. European Journal of Operational Research 310(3): 1118–1127 . Ntzoufras et al. [2021] Ntzoufras, I., V. Palaskas, and S. Drikos. 2021. Bayesian models for prediction of the set-difference in volleyball. IMA Journal of Management Mathematics 32(4): 491–518 . Ötting et al. [2024] Ötting, M., R. Michels, R. Langrock, and C. Deutscher. 2024. Demand for live betting: An analysis using state-space models. Applied Stochastic Models in Business and Industry . Pelechrinis and Winston [2021] Pelechrinis, K. and W. Winston. 2021. A Skellam regression model for quantifying positional value in soccer. Journal of Quantitative Analysis in Sports 17(3): 187–201 . Prieto et al. [2016] Prieto, J., M.Á. Gómez, A. Volossovitch, and J. Sampaio. 2016. Effects of team timeouts on the teams’ scoring performance in elite handball close games. Kinesiology 48(1.): 115–123 . Singh et al. [2023] Singh, A., P. Scarf, and R. Baker. 2023. A unified theory for bivariate scores in possessive ball-sports: The case of handball. European Journal of Operational Research 304(3): 1099–1112 . Skellam [1946] Skellam, J. 1946. The frequency distribution of the difference between two Poisson variates belonging to different populations. Journal of the Royal Statistical Society. Series A 109(3): 296–296 . Smiatek and Heuer [2012] Smiatek, J. and A. Heuer. 2012. A statistical view on team handball results: home advantage, team fitness and prediction of match outcomes. arXiv preprint arXiv:1207.0700 . Tomy and Veena [2022] Tomy, L. and G. Veena. 2022. A retrospective study on Skellam and related distributions. Austrian Journal of Statistics 51(1): 102–111 . Van Eetvelde et al. [2023] Van Eetvelde, H., L.M. Hvattum, and C. Ley. 2023. The probabilistic final standing calculator: a fair stochastic tool to handle abruptly stopped football seasons. AStA Advances in Statistical Analysis 107(1-2): 251–269 . Volossovitch and Debanne [2021] Volossovitch, A. and T. Debanne. 2021. Home advantage in handball. Home Advantage in Sport: Causes and the Effect on Performance: 220–227 . Lago-Peñas, C., M.A. Gomez, J. Viaño, and I. González-García. 2013. Home advantage in elite handball: the impact of the quality of opposition on team performance. International Journal of Performance Analysis in Sport 13(3): 724–733 . Maher [1982] Maher, M.J. 1982. Modelling association football scores. Statistica Neerlandica 36(3): 109–118 . McHale and Scarf [2007] McHale, I. and P. Scarf. 2007. Modelling soccer matches using bivariate discrete distributions with general dependence structure. Statistica Neerlandica 61(4): 432–445 . Michels et al. [2023] Michels, R., M. Ötting, and D. Karlis. 2023. Extending the Dixon and Coles model: an application to women’s football data. arXiv preprint arXiv:2307.02139 . Michels et al. [2023] Michels, R., M. Ötting, and R. Langrock. 2023. Bettors’ reaction to match dynamics: Evidence from in-game betting. European Journal of Operational Research 310(3): 1118–1127 . Ntzoufras et al. [2021] Ntzoufras, I., V. Palaskas, and S. Drikos. 2021. Bayesian models for prediction of the set-difference in volleyball. IMA Journal of Management Mathematics 32(4): 491–518 . Ötting et al. [2024] Ötting, M., R. Michels, R. Langrock, and C. Deutscher. 2024. Demand for live betting: An analysis using state-space models. Applied Stochastic Models in Business and Industry . Pelechrinis and Winston [2021] Pelechrinis, K. and W. Winston. 2021. A Skellam regression model for quantifying positional value in soccer. Journal of Quantitative Analysis in Sports 17(3): 187–201 . Prieto et al. [2016] Prieto, J., M.Á. Gómez, A. Volossovitch, and J. Sampaio. 2016. Effects of team timeouts on the teams’ scoring performance in elite handball close games. Kinesiology 48(1.): 115–123 . Singh et al. [2023] Singh, A., P. Scarf, and R. Baker. 2023. A unified theory for bivariate scores in possessive ball-sports: The case of handball. European Journal of Operational Research 304(3): 1099–1112 . Skellam [1946] Skellam, J. 1946. The frequency distribution of the difference between two Poisson variates belonging to different populations. Journal of the Royal Statistical Society. Series A 109(3): 296–296 . Smiatek and Heuer [2012] Smiatek, J. and A. Heuer. 2012. A statistical view on team handball results: home advantage, team fitness and prediction of match outcomes. arXiv preprint arXiv:1207.0700 . Tomy and Veena [2022] Tomy, L. and G. Veena. 2022. A retrospective study on Skellam and related distributions. Austrian Journal of Statistics 51(1): 102–111 . Van Eetvelde et al. [2023] Van Eetvelde, H., L.M. Hvattum, and C. Ley. 2023. The probabilistic final standing calculator: a fair stochastic tool to handle abruptly stopped football seasons. AStA Advances in Statistical Analysis 107(1-2): 251–269 . Volossovitch and Debanne [2021] Volossovitch, A. and T. Debanne. 2021. Home advantage in handball. Home Advantage in Sport: Causes and the Effect on Performance: 220–227 . Maher, M.J. 1982. Modelling association football scores. Statistica Neerlandica 36(3): 109–118 . McHale and Scarf [2007] McHale, I. and P. Scarf. 2007. Modelling soccer matches using bivariate discrete distributions with general dependence structure. Statistica Neerlandica 61(4): 432–445 . Michels et al. [2023] Michels, R., M. Ötting, and D. Karlis. 2023. Extending the Dixon and Coles model: an application to women’s football data. arXiv preprint arXiv:2307.02139 . Michels et al. [2023] Michels, R., M. Ötting, and R. Langrock. 2023. Bettors’ reaction to match dynamics: Evidence from in-game betting. European Journal of Operational Research 310(3): 1118–1127 . Ntzoufras et al. [2021] Ntzoufras, I., V. Palaskas, and S. Drikos. 2021. Bayesian models for prediction of the set-difference in volleyball. IMA Journal of Management Mathematics 32(4): 491–518 . Ötting et al. [2024] Ötting, M., R. Michels, R. Langrock, and C. Deutscher. 2024. Demand for live betting: An analysis using state-space models. Applied Stochastic Models in Business and Industry . Pelechrinis and Winston [2021] Pelechrinis, K. and W. Winston. 2021. A Skellam regression model for quantifying positional value in soccer. Journal of Quantitative Analysis in Sports 17(3): 187–201 . Prieto et al. [2016] Prieto, J., M.Á. Gómez, A. Volossovitch, and J. Sampaio. 2016. Effects of team timeouts on the teams’ scoring performance in elite handball close games. Kinesiology 48(1.): 115–123 . Singh et al. [2023] Singh, A., P. Scarf, and R. Baker. 2023. A unified theory for bivariate scores in possessive ball-sports: The case of handball. European Journal of Operational Research 304(3): 1099–1112 . Skellam [1946] Skellam, J. 1946. The frequency distribution of the difference between two Poisson variates belonging to different populations. Journal of the Royal Statistical Society. Series A 109(3): 296–296 . Smiatek and Heuer [2012] Smiatek, J. and A. Heuer. 2012. A statistical view on team handball results: home advantage, team fitness and prediction of match outcomes. arXiv preprint arXiv:1207.0700 . Tomy and Veena [2022] Tomy, L. and G. Veena. 2022. A retrospective study on Skellam and related distributions. Austrian Journal of Statistics 51(1): 102–111 . Van Eetvelde et al. [2023] Van Eetvelde, H., L.M. Hvattum, and C. Ley. 2023. The probabilistic final standing calculator: a fair stochastic tool to handle abruptly stopped football seasons. AStA Advances in Statistical Analysis 107(1-2): 251–269 . Volossovitch and Debanne [2021] Volossovitch, A. and T. Debanne. 2021. Home advantage in handball. Home Advantage in Sport: Causes and the Effect on Performance: 220–227 . McHale, I. and P. Scarf. 2007. Modelling soccer matches using bivariate discrete distributions with general dependence structure. Statistica Neerlandica 61(4): 432–445 . Michels et al. [2023] Michels, R., M. Ötting, and D. Karlis. 2023. Extending the Dixon and Coles model: an application to women’s football data. arXiv preprint arXiv:2307.02139 . Michels et al. [2023] Michels, R., M. Ötting, and R. Langrock. 2023. Bettors’ reaction to match dynamics: Evidence from in-game betting. European Journal of Operational Research 310(3): 1118–1127 . Ntzoufras et al. [2021] Ntzoufras, I., V. Palaskas, and S. Drikos. 2021. Bayesian models for prediction of the set-difference in volleyball. IMA Journal of Management Mathematics 32(4): 491–518 . Ötting et al. [2024] Ötting, M., R. Michels, R. Langrock, and C. Deutscher. 2024. Demand for live betting: An analysis using state-space models. Applied Stochastic Models in Business and Industry . Pelechrinis and Winston [2021] Pelechrinis, K. and W. Winston. 2021. A Skellam regression model for quantifying positional value in soccer. Journal of Quantitative Analysis in Sports 17(3): 187–201 . Prieto et al. [2016] Prieto, J., M.Á. Gómez, A. Volossovitch, and J. Sampaio. 2016. Effects of team timeouts on the teams’ scoring performance in elite handball close games. Kinesiology 48(1.): 115–123 . Singh et al. [2023] Singh, A., P. Scarf, and R. Baker. 2023. A unified theory for bivariate scores in possessive ball-sports: The case of handball. European Journal of Operational Research 304(3): 1099–1112 . Skellam [1946] Skellam, J. 1946. The frequency distribution of the difference between two Poisson variates belonging to different populations. Journal of the Royal Statistical Society. Series A 109(3): 296–296 . Smiatek and Heuer [2012] Smiatek, J. and A. Heuer. 2012. A statistical view on team handball results: home advantage, team fitness and prediction of match outcomes. arXiv preprint arXiv:1207.0700 . Tomy and Veena [2022] Tomy, L. and G. Veena. 2022. A retrospective study on Skellam and related distributions. Austrian Journal of Statistics 51(1): 102–111 . Van Eetvelde et al. [2023] Van Eetvelde, H., L.M. Hvattum, and C. Ley. 2023. The probabilistic final standing calculator: a fair stochastic tool to handle abruptly stopped football seasons. AStA Advances in Statistical Analysis 107(1-2): 251–269 . Volossovitch and Debanne [2021] Volossovitch, A. and T. Debanne. 2021. Home advantage in handball. Home Advantage in Sport: Causes and the Effect on Performance: 220–227 . Michels, R., M. Ötting, and D. Karlis. 2023. Extending the Dixon and Coles model: an application to women’s football data. arXiv preprint arXiv:2307.02139 . Michels et al. [2023] Michels, R., M. Ötting, and R. Langrock. 2023. Bettors’ reaction to match dynamics: Evidence from in-game betting. European Journal of Operational Research 310(3): 1118–1127 . Ntzoufras et al. [2021] Ntzoufras, I., V. Palaskas, and S. Drikos. 2021. Bayesian models for prediction of the set-difference in volleyball. IMA Journal of Management Mathematics 32(4): 491–518 . Ötting et al. [2024] Ötting, M., R. Michels, R. Langrock, and C. Deutscher. 2024. Demand for live betting: An analysis using state-space models. Applied Stochastic Models in Business and Industry . Pelechrinis and Winston [2021] Pelechrinis, K. and W. Winston. 2021. A Skellam regression model for quantifying positional value in soccer. Journal of Quantitative Analysis in Sports 17(3): 187–201 . Prieto et al. [2016] Prieto, J., M.Á. Gómez, A. Volossovitch, and J. Sampaio. 2016. Effects of team timeouts on the teams’ scoring performance in elite handball close games. Kinesiology 48(1.): 115–123 . Singh et al. [2023] Singh, A., P. Scarf, and R. Baker. 2023. A unified theory for bivariate scores in possessive ball-sports: The case of handball. European Journal of Operational Research 304(3): 1099–1112 . Skellam [1946] Skellam, J. 1946. The frequency distribution of the difference between two Poisson variates belonging to different populations. Journal of the Royal Statistical Society. Series A 109(3): 296–296 . Smiatek and Heuer [2012] Smiatek, J. and A. Heuer. 2012. A statistical view on team handball results: home advantage, team fitness and prediction of match outcomes. arXiv preprint arXiv:1207.0700 . Tomy and Veena [2022] Tomy, L. and G. Veena. 2022. A retrospective study on Skellam and related distributions. Austrian Journal of Statistics 51(1): 102–111 . Van Eetvelde et al. [2023] Van Eetvelde, H., L.M. Hvattum, and C. Ley. 2023. The probabilistic final standing calculator: a fair stochastic tool to handle abruptly stopped football seasons. AStA Advances in Statistical Analysis 107(1-2): 251–269 . Volossovitch and Debanne [2021] Volossovitch, A. and T. Debanne. 2021. Home advantage in handball. Home Advantage in Sport: Causes and the Effect on Performance: 220–227 . Michels, R., M. Ötting, and R. Langrock. 2023. Bettors’ reaction to match dynamics: Evidence from in-game betting. European Journal of Operational Research 310(3): 1118–1127 . Ntzoufras et al. [2021] Ntzoufras, I., V. Palaskas, and S. Drikos. 2021. Bayesian models for prediction of the set-difference in volleyball. IMA Journal of Management Mathematics 32(4): 491–518 . Ötting et al. [2024] Ötting, M., R. Michels, R. Langrock, and C. Deutscher. 2024. Demand for live betting: An analysis using state-space models. Applied Stochastic Models in Business and Industry . Pelechrinis and Winston [2021] Pelechrinis, K. and W. Winston. 2021. A Skellam regression model for quantifying positional value in soccer. Journal of Quantitative Analysis in Sports 17(3): 187–201 . Prieto et al. [2016] Prieto, J., M.Á. Gómez, A. Volossovitch, and J. Sampaio. 2016. Effects of team timeouts on the teams’ scoring performance in elite handball close games. Kinesiology 48(1.): 115–123 . Singh et al. [2023] Singh, A., P. Scarf, and R. Baker. 2023. A unified theory for bivariate scores in possessive ball-sports: The case of handball. European Journal of Operational Research 304(3): 1099–1112 . Skellam [1946] Skellam, J. 1946. The frequency distribution of the difference between two Poisson variates belonging to different populations. Journal of the Royal Statistical Society. Series A 109(3): 296–296 . Smiatek and Heuer [2012] Smiatek, J. and A. Heuer. 2012. A statistical view on team handball results: home advantage, team fitness and prediction of match outcomes. arXiv preprint arXiv:1207.0700 . Tomy and Veena [2022] Tomy, L. and G. Veena. 2022. A retrospective study on Skellam and related distributions. Austrian Journal of Statistics 51(1): 102–111 . Van Eetvelde et al. [2023] Van Eetvelde, H., L.M. Hvattum, and C. Ley. 2023. The probabilistic final standing calculator: a fair stochastic tool to handle abruptly stopped football seasons. AStA Advances in Statistical Analysis 107(1-2): 251–269 . Volossovitch and Debanne [2021] Volossovitch, A. and T. Debanne. 2021. Home advantage in handball. Home Advantage in Sport: Causes and the Effect on Performance: 220–227 . Ntzoufras, I., V. Palaskas, and S. Drikos. 2021. Bayesian models for prediction of the set-difference in volleyball. IMA Journal of Management Mathematics 32(4): 491–518 . Ötting et al. [2024] Ötting, M., R. Michels, R. Langrock, and C. Deutscher. 2024. Demand for live betting: An analysis using state-space models. Applied Stochastic Models in Business and Industry . Pelechrinis and Winston [2021] Pelechrinis, K. and W. Winston. 2021. A Skellam regression model for quantifying positional value in soccer. Journal of Quantitative Analysis in Sports 17(3): 187–201 . Prieto et al. [2016] Prieto, J., M.Á. Gómez, A. Volossovitch, and J. Sampaio. 2016. Effects of team timeouts on the teams’ scoring performance in elite handball close games. Kinesiology 48(1.): 115–123 . Singh et al. [2023] Singh, A., P. Scarf, and R. Baker. 2023. A unified theory for bivariate scores in possessive ball-sports: The case of handball. European Journal of Operational Research 304(3): 1099–1112 . Skellam [1946] Skellam, J. 1946. The frequency distribution of the difference between two Poisson variates belonging to different populations. Journal of the Royal Statistical Society. Series A 109(3): 296–296 . Smiatek and Heuer [2012] Smiatek, J. and A. Heuer. 2012. A statistical view on team handball results: home advantage, team fitness and prediction of match outcomes. arXiv preprint arXiv:1207.0700 . Tomy and Veena [2022] Tomy, L. and G. Veena. 2022. A retrospective study on Skellam and related distributions. Austrian Journal of Statistics 51(1): 102–111 . Van Eetvelde et al. [2023] Van Eetvelde, H., L.M. Hvattum, and C. Ley. 2023. The probabilistic final standing calculator: a fair stochastic tool to handle abruptly stopped football seasons. AStA Advances in Statistical Analysis 107(1-2): 251–269 . Volossovitch and Debanne [2021] Volossovitch, A. and T. Debanne. 2021. Home advantage in handball. Home Advantage in Sport: Causes and the Effect on Performance: 220–227 . Ötting, M., R. Michels, R. Langrock, and C. Deutscher. 2024. Demand for live betting: An analysis using state-space models. Applied Stochastic Models in Business and Industry . Pelechrinis and Winston [2021] Pelechrinis, K. and W. Winston. 2021. A Skellam regression model for quantifying positional value in soccer. Journal of Quantitative Analysis in Sports 17(3): 187–201 . Prieto et al. [2016] Prieto, J., M.Á. Gómez, A. Volossovitch, and J. Sampaio. 2016. Effects of team timeouts on the teams’ scoring performance in elite handball close games. Kinesiology 48(1.): 115–123 . Singh et al. [2023] Singh, A., P. Scarf, and R. Baker. 2023. A unified theory for bivariate scores in possessive ball-sports: The case of handball. European Journal of Operational Research 304(3): 1099–1112 . Skellam [1946] Skellam, J. 1946. The frequency distribution of the difference between two Poisson variates belonging to different populations. Journal of the Royal Statistical Society. Series A 109(3): 296–296 . Smiatek and Heuer [2012] Smiatek, J. and A. Heuer. 2012. A statistical view on team handball results: home advantage, team fitness and prediction of match outcomes. arXiv preprint arXiv:1207.0700 . Tomy and Veena [2022] Tomy, L. and G. Veena. 2022. A retrospective study on Skellam and related distributions. Austrian Journal of Statistics 51(1): 102–111 . Van Eetvelde et al. [2023] Van Eetvelde, H., L.M. Hvattum, and C. Ley. 2023. The probabilistic final standing calculator: a fair stochastic tool to handle abruptly stopped football seasons. AStA Advances in Statistical Analysis 107(1-2): 251–269 . Volossovitch and Debanne [2021] Volossovitch, A. and T. Debanne. 2021. Home advantage in handball. Home Advantage in Sport: Causes and the Effect on Performance: 220–227 . Pelechrinis, K. and W. Winston. 2021. A Skellam regression model for quantifying positional value in soccer. Journal of Quantitative Analysis in Sports 17(3): 187–201 . Prieto et al. [2016] Prieto, J., M.Á. Gómez, A. Volossovitch, and J. Sampaio. 2016. Effects of team timeouts on the teams’ scoring performance in elite handball close games. Kinesiology 48(1.): 115–123 . Singh et al. [2023] Singh, A., P. Scarf, and R. Baker. 2023. A unified theory for bivariate scores in possessive ball-sports: The case of handball. European Journal of Operational Research 304(3): 1099–1112 . Skellam [1946] Skellam, J. 1946. The frequency distribution of the difference between two Poisson variates belonging to different populations. Journal of the Royal Statistical Society. Series A 109(3): 296–296 . Smiatek and Heuer [2012] Smiatek, J. and A. Heuer. 2012. A statistical view on team handball results: home advantage, team fitness and prediction of match outcomes. arXiv preprint arXiv:1207.0700 . Tomy and Veena [2022] Tomy, L. and G. Veena. 2022. A retrospective study on Skellam and related distributions. Austrian Journal of Statistics 51(1): 102–111 . Van Eetvelde et al. [2023] Van Eetvelde, H., L.M. Hvattum, and C. Ley. 2023. The probabilistic final standing calculator: a fair stochastic tool to handle abruptly stopped football seasons. AStA Advances in Statistical Analysis 107(1-2): 251–269 . Volossovitch and Debanne [2021] Volossovitch, A. and T. Debanne. 2021. Home advantage in handball. Home Advantage in Sport: Causes and the Effect on Performance: 220–227 . Prieto, J., M.Á. Gómez, A. Volossovitch, and J. Sampaio. 2016. Effects of team timeouts on the teams’ scoring performance in elite handball close games. Kinesiology 48(1.): 115–123 . Singh et al. [2023] Singh, A., P. Scarf, and R. Baker. 2023. A unified theory for bivariate scores in possessive ball-sports: The case of handball. European Journal of Operational Research 304(3): 1099–1112 . Skellam [1946] Skellam, J. 1946. The frequency distribution of the difference between two Poisson variates belonging to different populations. Journal of the Royal Statistical Society. Series A 109(3): 296–296 . Smiatek and Heuer [2012] Smiatek, J. and A. Heuer. 2012. A statistical view on team handball results: home advantage, team fitness and prediction of match outcomes. arXiv preprint arXiv:1207.0700 . Tomy and Veena [2022] Tomy, L. and G. Veena. 2022. A retrospective study on Skellam and related distributions. Austrian Journal of Statistics 51(1): 102–111 . Van Eetvelde et al. [2023] Van Eetvelde, H., L.M. Hvattum, and C. Ley. 2023. The probabilistic final standing calculator: a fair stochastic tool to handle abruptly stopped football seasons. AStA Advances in Statistical Analysis 107(1-2): 251–269 . Volossovitch and Debanne [2021] Volossovitch, A. and T. Debanne. 2021. Home advantage in handball. Home Advantage in Sport: Causes and the Effect on Performance: 220–227 . Singh, A., P. Scarf, and R. Baker. 2023. A unified theory for bivariate scores in possessive ball-sports: The case of handball. European Journal of Operational Research 304(3): 1099–1112 . Skellam [1946] Skellam, J. 1946. The frequency distribution of the difference between two Poisson variates belonging to different populations. Journal of the Royal Statistical Society. Series A 109(3): 296–296 . Smiatek and Heuer [2012] Smiatek, J. and A. Heuer. 2012. A statistical view on team handball results: home advantage, team fitness and prediction of match outcomes. arXiv preprint arXiv:1207.0700 . Tomy and Veena [2022] Tomy, L. and G. Veena. 2022. A retrospective study on Skellam and related distributions. Austrian Journal of Statistics 51(1): 102–111 . Van Eetvelde et al. [2023] Van Eetvelde, H., L.M. Hvattum, and C. Ley. 2023. The probabilistic final standing calculator: a fair stochastic tool to handle abruptly stopped football seasons. AStA Advances in Statistical Analysis 107(1-2): 251–269 . Volossovitch and Debanne [2021] Volossovitch, A. and T. Debanne. 2021. Home advantage in handball. Home Advantage in Sport: Causes and the Effect on Performance: 220–227 . Skellam, J. 1946. The frequency distribution of the difference between two Poisson variates belonging to different populations. Journal of the Royal Statistical Society. Series A 109(3): 296–296 . Smiatek and Heuer [2012] Smiatek, J. and A. Heuer. 2012. A statistical view on team handball results: home advantage, team fitness and prediction of match outcomes. arXiv preprint arXiv:1207.0700 . Tomy and Veena [2022] Tomy, L. and G. Veena. 2022. A retrospective study on Skellam and related distributions. Austrian Journal of Statistics 51(1): 102–111 . Van Eetvelde et al. [2023] Van Eetvelde, H., L.M. Hvattum, and C. Ley. 2023. The probabilistic final standing calculator: a fair stochastic tool to handle abruptly stopped football seasons. AStA Advances in Statistical Analysis 107(1-2): 251–269 . Volossovitch and Debanne [2021] Volossovitch, A. and T. Debanne. 2021. Home advantage in handball. Home Advantage in Sport: Causes and the Effect on Performance: 220–227 . Smiatek, J. and A. Heuer. 2012. A statistical view on team handball results: home advantage, team fitness and prediction of match outcomes. arXiv preprint arXiv:1207.0700 . Tomy and Veena [2022] Tomy, L. and G. Veena. 2022. A retrospective study on Skellam and related distributions. Austrian Journal of Statistics 51(1): 102–111 . Van Eetvelde et al. [2023] Van Eetvelde, H., L.M. Hvattum, and C. Ley. 2023. The probabilistic final standing calculator: a fair stochastic tool to handle abruptly stopped football seasons. AStA Advances in Statistical Analysis 107(1-2): 251–269 . Volossovitch and Debanne [2021] Volossovitch, A. and T. Debanne. 2021. Home advantage in handball. Home Advantage in Sport: Causes and the Effect on Performance: 220–227 . Tomy, L. and G. Veena. 2022. A retrospective study on Skellam and related distributions. Austrian Journal of Statistics 51(1): 102–111 . Van Eetvelde et al. [2023] Van Eetvelde, H., L.M. Hvattum, and C. Ley. 2023. The probabilistic final standing calculator: a fair stochastic tool to handle abruptly stopped football seasons. AStA Advances in Statistical Analysis 107(1-2): 251–269 . Volossovitch and Debanne [2021] Volossovitch, A. and T. Debanne. 2021. Home advantage in handball. Home Advantage in Sport: Causes and the Effect on Performance: 220–227 . Van Eetvelde, H., L.M. Hvattum, and C. Ley. 2023. The probabilistic final standing calculator: a fair stochastic tool to handle abruptly stopped football seasons. AStA Advances in Statistical Analysis 107(1-2): 251–269 . Volossovitch and Debanne [2021] Volossovitch, A. and T. Debanne. 2021. Home advantage in handball. Home Advantage in Sport: Causes and the Effect on Performance: 220–227 . Volossovitch, A. and T. Debanne. 2021. Home advantage in handball. Home Advantage in Sport: Causes and the Effect on Performance: 220–227 .
- Causal effects of an absent crowd on performances and refereeing decisions during Covid-19. Economics Letters 198: 109664 . Csató [2021] Csató, L. 2021. Coronavirus and sports leagues: obtaining a fair ranking when the season cannot resume. IMA Journal of Management Mathematics 32(4): 547–560 . Dixon and Coles [1997] Dixon, M.J. and S.G. Coles. 1997. Modelling association football scores and inefficiencies in the football betting market. Journal of the Royal Statistical Society: Series C (Applied Statistics) 46(2): 265–280 . Dumangane et al. [2009] Dumangane, M., N. Rosati, and A. Volossovitch. 2009. Departure from independence and stationarity in a handball match. Journal of Applied Statistics 36(7): 723–741 . Felice [2023] Felice, F. 2023. Ranking handball teams from statistical strength estimation. arXiv preprint arXiv:2307.06754 . Felice and Ley [2023] Felice, F. and C. Ley. 2023. Prediction of handball matches with statistically enhanced learning via estimated team strengths. arXiv preprint arXiv:2307.11777 . Groll et al. [2020] Groll, A., J. Heiner, G. Schauberger, and J. Uhrmeister. 2020. Prediction of the 2019 IHF World Men’s Handball Championship–a sparse Gaussian approximation model. Journal of Sports Analytics 6(3): 187–197 . Holmes and McHale [2024] Holmes, B. and I.G. McHale. 2024. Forecasting football match results using a player rating based model. International Journal of Forecasting 40(1): 302–312 . Irwin [1937] Irwin, J.O. 1937. The frequency distribution of the difference between two independent variates following the same Poisson distribution. Journal of the Royal Statistical Society 100(3): 415–416 . Jiang et al. [2014] Jiang, L., K. Mao, and R. Wu. 2014. A Skellam model to identify differential patterns of gene expression induced by environmental signals. BMC Genomics 15(1): 1–9 . Karlis and Mamode Khan [2023] Karlis, D. and N. Mamode Khan. 2023. Models for integer data. Annual Review of Statistics and its Application 10: 297–323 . Karlis and Ntzoufras [2006] Karlis, D. and I. Ntzoufras. 2006. Bayesian analysis of the differences of count data. Statistics in Medicine 25(11): 1885–1905 . Koopman et al. [2017] Koopman, S.J., R. Lit, and A. Lucas. 2017. Intraday stochastic volatility in discrete price changes: the dynamic Skellam model. Journal of the American Statistical Association 112(520): 1490–1503 . Lago-Peñas et al. [2013] Lago-Peñas, C., M.A. Gomez, J. Viaño, and I. González-García. 2013. Home advantage in elite handball: the impact of the quality of opposition on team performance. International Journal of Performance Analysis in Sport 13(3): 724–733 . Maher [1982] Maher, M.J. 1982. Modelling association football scores. Statistica Neerlandica 36(3): 109–118 . McHale and Scarf [2007] McHale, I. and P. Scarf. 2007. Modelling soccer matches using bivariate discrete distributions with general dependence structure. Statistica Neerlandica 61(4): 432–445 . Michels et al. [2023] Michels, R., M. Ötting, and D. Karlis. 2023. Extending the Dixon and Coles model: an application to women’s football data. arXiv preprint arXiv:2307.02139 . Michels et al. [2023] Michels, R., M. Ötting, and R. Langrock. 2023. Bettors’ reaction to match dynamics: Evidence from in-game betting. European Journal of Operational Research 310(3): 1118–1127 . Ntzoufras et al. [2021] Ntzoufras, I., V. Palaskas, and S. Drikos. 2021. Bayesian models for prediction of the set-difference in volleyball. IMA Journal of Management Mathematics 32(4): 491–518 . Ötting et al. [2024] Ötting, M., R. Michels, R. Langrock, and C. Deutscher. 2024. Demand for live betting: An analysis using state-space models. Applied Stochastic Models in Business and Industry . Pelechrinis and Winston [2021] Pelechrinis, K. and W. Winston. 2021. A Skellam regression model for quantifying positional value in soccer. Journal of Quantitative Analysis in Sports 17(3): 187–201 . Prieto et al. [2016] Prieto, J., M.Á. Gómez, A. Volossovitch, and J. Sampaio. 2016. Effects of team timeouts on the teams’ scoring performance in elite handball close games. Kinesiology 48(1.): 115–123 . Singh et al. [2023] Singh, A., P. Scarf, and R. Baker. 2023. A unified theory for bivariate scores in possessive ball-sports: The case of handball. European Journal of Operational Research 304(3): 1099–1112 . Skellam [1946] Skellam, J. 1946. The frequency distribution of the difference between two Poisson variates belonging to different populations. Journal of the Royal Statistical Society. Series A 109(3): 296–296 . Smiatek and Heuer [2012] Smiatek, J. and A. Heuer. 2012. A statistical view on team handball results: home advantage, team fitness and prediction of match outcomes. arXiv preprint arXiv:1207.0700 . Tomy and Veena [2022] Tomy, L. and G. Veena. 2022. A retrospective study on Skellam and related distributions. Austrian Journal of Statistics 51(1): 102–111 . Van Eetvelde et al. [2023] Van Eetvelde, H., L.M. Hvattum, and C. Ley. 2023. The probabilistic final standing calculator: a fair stochastic tool to handle abruptly stopped football seasons. AStA Advances in Statistical Analysis 107(1-2): 251–269 . Volossovitch and Debanne [2021] Volossovitch, A. and T. Debanne. 2021. Home advantage in handball. Home Advantage in Sport: Causes and the Effect on Performance: 220–227 . Csató, L. 2021. Coronavirus and sports leagues: obtaining a fair ranking when the season cannot resume. IMA Journal of Management Mathematics 32(4): 547–560 . Dixon and Coles [1997] Dixon, M.J. and S.G. Coles. 1997. Modelling association football scores and inefficiencies in the football betting market. Journal of the Royal Statistical Society: Series C (Applied Statistics) 46(2): 265–280 . Dumangane et al. [2009] Dumangane, M., N. Rosati, and A. Volossovitch. 2009. Departure from independence and stationarity in a handball match. Journal of Applied Statistics 36(7): 723–741 . Felice [2023] Felice, F. 2023. Ranking handball teams from statistical strength estimation. arXiv preprint arXiv:2307.06754 . Felice and Ley [2023] Felice, F. and C. Ley. 2023. Prediction of handball matches with statistically enhanced learning via estimated team strengths. arXiv preprint arXiv:2307.11777 . Groll et al. [2020] Groll, A., J. Heiner, G. Schauberger, and J. Uhrmeister. 2020. Prediction of the 2019 IHF World Men’s Handball Championship–a sparse Gaussian approximation model. Journal of Sports Analytics 6(3): 187–197 . Holmes and McHale [2024] Holmes, B. and I.G. McHale. 2024. Forecasting football match results using a player rating based model. International Journal of Forecasting 40(1): 302–312 . Irwin [1937] Irwin, J.O. 1937. The frequency distribution of the difference between two independent variates following the same Poisson distribution. Journal of the Royal Statistical Society 100(3): 415–416 . Jiang et al. [2014] Jiang, L., K. Mao, and R. Wu. 2014. A Skellam model to identify differential patterns of gene expression induced by environmental signals. BMC Genomics 15(1): 1–9 . Karlis and Mamode Khan [2023] Karlis, D. and N. Mamode Khan. 2023. Models for integer data. Annual Review of Statistics and its Application 10: 297–323 . Karlis and Ntzoufras [2006] Karlis, D. and I. Ntzoufras. 2006. Bayesian analysis of the differences of count data. Statistics in Medicine 25(11): 1885–1905 . Koopman et al. [2017] Koopman, S.J., R. Lit, and A. Lucas. 2017. Intraday stochastic volatility in discrete price changes: the dynamic Skellam model. Journal of the American Statistical Association 112(520): 1490–1503 . Lago-Peñas et al. [2013] Lago-Peñas, C., M.A. Gomez, J. Viaño, and I. González-García. 2013. Home advantage in elite handball: the impact of the quality of opposition on team performance. International Journal of Performance Analysis in Sport 13(3): 724–733 . Maher [1982] Maher, M.J. 1982. Modelling association football scores. Statistica Neerlandica 36(3): 109–118 . McHale and Scarf [2007] McHale, I. and P. Scarf. 2007. Modelling soccer matches using bivariate discrete distributions with general dependence structure. Statistica Neerlandica 61(4): 432–445 . Michels et al. [2023] Michels, R., M. Ötting, and D. Karlis. 2023. Extending the Dixon and Coles model: an application to women’s football data. arXiv preprint arXiv:2307.02139 . Michels et al. [2023] Michels, R., M. Ötting, and R. Langrock. 2023. Bettors’ reaction to match dynamics: Evidence from in-game betting. European Journal of Operational Research 310(3): 1118–1127 . Ntzoufras et al. [2021] Ntzoufras, I., V. Palaskas, and S. Drikos. 2021. Bayesian models for prediction of the set-difference in volleyball. IMA Journal of Management Mathematics 32(4): 491–518 . Ötting et al. [2024] Ötting, M., R. Michels, R. Langrock, and C. Deutscher. 2024. Demand for live betting: An analysis using state-space models. Applied Stochastic Models in Business and Industry . Pelechrinis and Winston [2021] Pelechrinis, K. and W. Winston. 2021. A Skellam regression model for quantifying positional value in soccer. Journal of Quantitative Analysis in Sports 17(3): 187–201 . Prieto et al. [2016] Prieto, J., M.Á. Gómez, A. Volossovitch, and J. Sampaio. 2016. Effects of team timeouts on the teams’ scoring performance in elite handball close games. Kinesiology 48(1.): 115–123 . Singh et al. [2023] Singh, A., P. Scarf, and R. Baker. 2023. A unified theory for bivariate scores in possessive ball-sports: The case of handball. European Journal of Operational Research 304(3): 1099–1112 . Skellam [1946] Skellam, J. 1946. The frequency distribution of the difference between two Poisson variates belonging to different populations. Journal of the Royal Statistical Society. Series A 109(3): 296–296 . Smiatek and Heuer [2012] Smiatek, J. and A. Heuer. 2012. A statistical view on team handball results: home advantage, team fitness and prediction of match outcomes. arXiv preprint arXiv:1207.0700 . Tomy and Veena [2022] Tomy, L. and G. Veena. 2022. A retrospective study on Skellam and related distributions. Austrian Journal of Statistics 51(1): 102–111 . Van Eetvelde et al. [2023] Van Eetvelde, H., L.M. Hvattum, and C. Ley. 2023. The probabilistic final standing calculator: a fair stochastic tool to handle abruptly stopped football seasons. AStA Advances in Statistical Analysis 107(1-2): 251–269 . Volossovitch and Debanne [2021] Volossovitch, A. and T. Debanne. 2021. Home advantage in handball. Home Advantage in Sport: Causes and the Effect on Performance: 220–227 . Dixon, M.J. and S.G. Coles. 1997. Modelling association football scores and inefficiencies in the football betting market. Journal of the Royal Statistical Society: Series C (Applied Statistics) 46(2): 265–280 . Dumangane et al. [2009] Dumangane, M., N. Rosati, and A. Volossovitch. 2009. Departure from independence and stationarity in a handball match. Journal of Applied Statistics 36(7): 723–741 . Felice [2023] Felice, F. 2023. Ranking handball teams from statistical strength estimation. arXiv preprint arXiv:2307.06754 . Felice and Ley [2023] Felice, F. and C. Ley. 2023. Prediction of handball matches with statistically enhanced learning via estimated team strengths. arXiv preprint arXiv:2307.11777 . Groll et al. [2020] Groll, A., J. Heiner, G. Schauberger, and J. Uhrmeister. 2020. Prediction of the 2019 IHF World Men’s Handball Championship–a sparse Gaussian approximation model. Journal of Sports Analytics 6(3): 187–197 . Holmes and McHale [2024] Holmes, B. and I.G. McHale. 2024. Forecasting football match results using a player rating based model. International Journal of Forecasting 40(1): 302–312 . Irwin [1937] Irwin, J.O. 1937. The frequency distribution of the difference between two independent variates following the same Poisson distribution. Journal of the Royal Statistical Society 100(3): 415–416 . Jiang et al. [2014] Jiang, L., K. Mao, and R. Wu. 2014. A Skellam model to identify differential patterns of gene expression induced by environmental signals. BMC Genomics 15(1): 1–9 . Karlis and Mamode Khan [2023] Karlis, D. and N. Mamode Khan. 2023. Models for integer data. Annual Review of Statistics and its Application 10: 297–323 . Karlis and Ntzoufras [2006] Karlis, D. and I. Ntzoufras. 2006. Bayesian analysis of the differences of count data. Statistics in Medicine 25(11): 1885–1905 . Koopman et al. [2017] Koopman, S.J., R. Lit, and A. Lucas. 2017. Intraday stochastic volatility in discrete price changes: the dynamic Skellam model. Journal of the American Statistical Association 112(520): 1490–1503 . Lago-Peñas et al. [2013] Lago-Peñas, C., M.A. Gomez, J. Viaño, and I. González-García. 2013. Home advantage in elite handball: the impact of the quality of opposition on team performance. International Journal of Performance Analysis in Sport 13(3): 724–733 . Maher [1982] Maher, M.J. 1982. Modelling association football scores. Statistica Neerlandica 36(3): 109–118 . McHale and Scarf [2007] McHale, I. and P. Scarf. 2007. Modelling soccer matches using bivariate discrete distributions with general dependence structure. Statistica Neerlandica 61(4): 432–445 . Michels et al. [2023] Michels, R., M. Ötting, and D. Karlis. 2023. Extending the Dixon and Coles model: an application to women’s football data. arXiv preprint arXiv:2307.02139 . Michels et al. [2023] Michels, R., M. Ötting, and R. Langrock. 2023. Bettors’ reaction to match dynamics: Evidence from in-game betting. European Journal of Operational Research 310(3): 1118–1127 . Ntzoufras et al. [2021] Ntzoufras, I., V. Palaskas, and S. Drikos. 2021. Bayesian models for prediction of the set-difference in volleyball. IMA Journal of Management Mathematics 32(4): 491–518 . Ötting et al. [2024] Ötting, M., R. Michels, R. Langrock, and C. Deutscher. 2024. Demand for live betting: An analysis using state-space models. Applied Stochastic Models in Business and Industry . Pelechrinis and Winston [2021] Pelechrinis, K. and W. Winston. 2021. A Skellam regression model for quantifying positional value in soccer. Journal of Quantitative Analysis in Sports 17(3): 187–201 . Prieto et al. [2016] Prieto, J., M.Á. Gómez, A. Volossovitch, and J. Sampaio. 2016. Effects of team timeouts on the teams’ scoring performance in elite handball close games. Kinesiology 48(1.): 115–123 . Singh et al. [2023] Singh, A., P. Scarf, and R. Baker. 2023. A unified theory for bivariate scores in possessive ball-sports: The case of handball. European Journal of Operational Research 304(3): 1099–1112 . Skellam [1946] Skellam, J. 1946. The frequency distribution of the difference between two Poisson variates belonging to different populations. Journal of the Royal Statistical Society. Series A 109(3): 296–296 . Smiatek and Heuer [2012] Smiatek, J. and A. Heuer. 2012. A statistical view on team handball results: home advantage, team fitness and prediction of match outcomes. arXiv preprint arXiv:1207.0700 . Tomy and Veena [2022] Tomy, L. and G. Veena. 2022. A retrospective study on Skellam and related distributions. Austrian Journal of Statistics 51(1): 102–111 . Van Eetvelde et al. [2023] Van Eetvelde, H., L.M. Hvattum, and C. Ley. 2023. The probabilistic final standing calculator: a fair stochastic tool to handle abruptly stopped football seasons. AStA Advances in Statistical Analysis 107(1-2): 251–269 . Volossovitch and Debanne [2021] Volossovitch, A. and T. Debanne. 2021. Home advantage in handball. Home Advantage in Sport: Causes and the Effect on Performance: 220–227 . Dumangane, M., N. Rosati, and A. Volossovitch. 2009. Departure from independence and stationarity in a handball match. Journal of Applied Statistics 36(7): 723–741 . Felice [2023] Felice, F. 2023. Ranking handball teams from statistical strength estimation. arXiv preprint arXiv:2307.06754 . Felice and Ley [2023] Felice, F. and C. Ley. 2023. Prediction of handball matches with statistically enhanced learning via estimated team strengths. arXiv preprint arXiv:2307.11777 . Groll et al. [2020] Groll, A., J. Heiner, G. Schauberger, and J. Uhrmeister. 2020. Prediction of the 2019 IHF World Men’s Handball Championship–a sparse Gaussian approximation model. Journal of Sports Analytics 6(3): 187–197 . Holmes and McHale [2024] Holmes, B. and I.G. McHale. 2024. Forecasting football match results using a player rating based model. International Journal of Forecasting 40(1): 302–312 . Irwin [1937] Irwin, J.O. 1937. The frequency distribution of the difference between two independent variates following the same Poisson distribution. Journal of the Royal Statistical Society 100(3): 415–416 . Jiang et al. [2014] Jiang, L., K. Mao, and R. Wu. 2014. A Skellam model to identify differential patterns of gene expression induced by environmental signals. BMC Genomics 15(1): 1–9 . Karlis and Mamode Khan [2023] Karlis, D. and N. Mamode Khan. 2023. Models for integer data. Annual Review of Statistics and its Application 10: 297–323 . Karlis and Ntzoufras [2006] Karlis, D. and I. Ntzoufras. 2006. Bayesian analysis of the differences of count data. Statistics in Medicine 25(11): 1885–1905 . Koopman et al. [2017] Koopman, S.J., R. Lit, and A. Lucas. 2017. Intraday stochastic volatility in discrete price changes: the dynamic Skellam model. Journal of the American Statistical Association 112(520): 1490–1503 . Lago-Peñas et al. [2013] Lago-Peñas, C., M.A. Gomez, J. Viaño, and I. González-García. 2013. Home advantage in elite handball: the impact of the quality of opposition on team performance. International Journal of Performance Analysis in Sport 13(3): 724–733 . Maher [1982] Maher, M.J. 1982. Modelling association football scores. Statistica Neerlandica 36(3): 109–118 . McHale and Scarf [2007] McHale, I. and P. Scarf. 2007. Modelling soccer matches using bivariate discrete distributions with general dependence structure. Statistica Neerlandica 61(4): 432–445 . Michels et al. [2023] Michels, R., M. Ötting, and D. Karlis. 2023. Extending the Dixon and Coles model: an application to women’s football data. arXiv preprint arXiv:2307.02139 . Michels et al. [2023] Michels, R., M. Ötting, and R. Langrock. 2023. Bettors’ reaction to match dynamics: Evidence from in-game betting. European Journal of Operational Research 310(3): 1118–1127 . Ntzoufras et al. [2021] Ntzoufras, I., V. Palaskas, and S. Drikos. 2021. Bayesian models for prediction of the set-difference in volleyball. IMA Journal of Management Mathematics 32(4): 491–518 . Ötting et al. [2024] Ötting, M., R. Michels, R. Langrock, and C. Deutscher. 2024. Demand for live betting: An analysis using state-space models. Applied Stochastic Models in Business and Industry . Pelechrinis and Winston [2021] Pelechrinis, K. and W. Winston. 2021. A Skellam regression model for quantifying positional value in soccer. Journal of Quantitative Analysis in Sports 17(3): 187–201 . Prieto et al. [2016] Prieto, J., M.Á. Gómez, A. Volossovitch, and J. Sampaio. 2016. Effects of team timeouts on the teams’ scoring performance in elite handball close games. Kinesiology 48(1.): 115–123 . Singh et al. [2023] Singh, A., P. Scarf, and R. Baker. 2023. A unified theory for bivariate scores in possessive ball-sports: The case of handball. European Journal of Operational Research 304(3): 1099–1112 . Skellam [1946] Skellam, J. 1946. The frequency distribution of the difference between two Poisson variates belonging to different populations. Journal of the Royal Statistical Society. Series A 109(3): 296–296 . Smiatek and Heuer [2012] Smiatek, J. and A. Heuer. 2012. A statistical view on team handball results: home advantage, team fitness and prediction of match outcomes. arXiv preprint arXiv:1207.0700 . Tomy and Veena [2022] Tomy, L. and G. Veena. 2022. A retrospective study on Skellam and related distributions. Austrian Journal of Statistics 51(1): 102–111 . Van Eetvelde et al. [2023] Van Eetvelde, H., L.M. Hvattum, and C. Ley. 2023. The probabilistic final standing calculator: a fair stochastic tool to handle abruptly stopped football seasons. AStA Advances in Statistical Analysis 107(1-2): 251–269 . Volossovitch and Debanne [2021] Volossovitch, A. and T. Debanne. 2021. Home advantage in handball. Home Advantage in Sport: Causes and the Effect on Performance: 220–227 . Felice, F. 2023. Ranking handball teams from statistical strength estimation. arXiv preprint arXiv:2307.06754 . Felice and Ley [2023] Felice, F. and C. Ley. 2023. Prediction of handball matches with statistically enhanced learning via estimated team strengths. arXiv preprint arXiv:2307.11777 . Groll et al. [2020] Groll, A., J. Heiner, G. Schauberger, and J. Uhrmeister. 2020. Prediction of the 2019 IHF World Men’s Handball Championship–a sparse Gaussian approximation model. Journal of Sports Analytics 6(3): 187–197 . Holmes and McHale [2024] Holmes, B. and I.G. McHale. 2024. Forecasting football match results using a player rating based model. International Journal of Forecasting 40(1): 302–312 . Irwin [1937] Irwin, J.O. 1937. The frequency distribution of the difference between two independent variates following the same Poisson distribution. Journal of the Royal Statistical Society 100(3): 415–416 . Jiang et al. [2014] Jiang, L., K. Mao, and R. Wu. 2014. A Skellam model to identify differential patterns of gene expression induced by environmental signals. BMC Genomics 15(1): 1–9 . Karlis and Mamode Khan [2023] Karlis, D. and N. Mamode Khan. 2023. Models for integer data. Annual Review of Statistics and its Application 10: 297–323 . Karlis and Ntzoufras [2006] Karlis, D. and I. Ntzoufras. 2006. Bayesian analysis of the differences of count data. Statistics in Medicine 25(11): 1885–1905 . Koopman et al. [2017] Koopman, S.J., R. Lit, and A. Lucas. 2017. Intraday stochastic volatility in discrete price changes: the dynamic Skellam model. Journal of the American Statistical Association 112(520): 1490–1503 . Lago-Peñas et al. [2013] Lago-Peñas, C., M.A. Gomez, J. Viaño, and I. González-García. 2013. Home advantage in elite handball: the impact of the quality of opposition on team performance. International Journal of Performance Analysis in Sport 13(3): 724–733 . Maher [1982] Maher, M.J. 1982. Modelling association football scores. Statistica Neerlandica 36(3): 109–118 . McHale and Scarf [2007] McHale, I. and P. Scarf. 2007. Modelling soccer matches using bivariate discrete distributions with general dependence structure. Statistica Neerlandica 61(4): 432–445 . Michels et al. [2023] Michels, R., M. Ötting, and D. Karlis. 2023. Extending the Dixon and Coles model: an application to women’s football data. arXiv preprint arXiv:2307.02139 . Michels et al. [2023] Michels, R., M. Ötting, and R. Langrock. 2023. Bettors’ reaction to match dynamics: Evidence from in-game betting. European Journal of Operational Research 310(3): 1118–1127 . Ntzoufras et al. [2021] Ntzoufras, I., V. Palaskas, and S. Drikos. 2021. Bayesian models for prediction of the set-difference in volleyball. IMA Journal of Management Mathematics 32(4): 491–518 . Ötting et al. [2024] Ötting, M., R. Michels, R. Langrock, and C. Deutscher. 2024. Demand for live betting: An analysis using state-space models. Applied Stochastic Models in Business and Industry . Pelechrinis and Winston [2021] Pelechrinis, K. and W. Winston. 2021. A Skellam regression model for quantifying positional value in soccer. Journal of Quantitative Analysis in Sports 17(3): 187–201 . Prieto et al. [2016] Prieto, J., M.Á. Gómez, A. Volossovitch, and J. Sampaio. 2016. Effects of team timeouts on the teams’ scoring performance in elite handball close games. Kinesiology 48(1.): 115–123 . Singh et al. [2023] Singh, A., P. Scarf, and R. Baker. 2023. A unified theory for bivariate scores in possessive ball-sports: The case of handball. European Journal of Operational Research 304(3): 1099–1112 . Skellam [1946] Skellam, J. 1946. The frequency distribution of the difference between two Poisson variates belonging to different populations. Journal of the Royal Statistical Society. Series A 109(3): 296–296 . Smiatek and Heuer [2012] Smiatek, J. and A. Heuer. 2012. A statistical view on team handball results: home advantage, team fitness and prediction of match outcomes. arXiv preprint arXiv:1207.0700 . Tomy and Veena [2022] Tomy, L. and G. Veena. 2022. A retrospective study on Skellam and related distributions. Austrian Journal of Statistics 51(1): 102–111 . Van Eetvelde et al. [2023] Van Eetvelde, H., L.M. Hvattum, and C. Ley. 2023. The probabilistic final standing calculator: a fair stochastic tool to handle abruptly stopped football seasons. AStA Advances in Statistical Analysis 107(1-2): 251–269 . Volossovitch and Debanne [2021] Volossovitch, A. and T. Debanne. 2021. Home advantage in handball. Home Advantage in Sport: Causes and the Effect on Performance: 220–227 . Felice, F. and C. Ley. 2023. Prediction of handball matches with statistically enhanced learning via estimated team strengths. arXiv preprint arXiv:2307.11777 . Groll et al. [2020] Groll, A., J. Heiner, G. Schauberger, and J. Uhrmeister. 2020. Prediction of the 2019 IHF World Men’s Handball Championship–a sparse Gaussian approximation model. Journal of Sports Analytics 6(3): 187–197 . Holmes and McHale [2024] Holmes, B. and I.G. McHale. 2024. Forecasting football match results using a player rating based model. International Journal of Forecasting 40(1): 302–312 . Irwin [1937] Irwin, J.O. 1937. The frequency distribution of the difference between two independent variates following the same Poisson distribution. Journal of the Royal Statistical Society 100(3): 415–416 . Jiang et al. [2014] Jiang, L., K. Mao, and R. Wu. 2014. A Skellam model to identify differential patterns of gene expression induced by environmental signals. BMC Genomics 15(1): 1–9 . Karlis and Mamode Khan [2023] Karlis, D. and N. Mamode Khan. 2023. Models for integer data. Annual Review of Statistics and its Application 10: 297–323 . Karlis and Ntzoufras [2006] Karlis, D. and I. Ntzoufras. 2006. Bayesian analysis of the differences of count data. Statistics in Medicine 25(11): 1885–1905 . Koopman et al. [2017] Koopman, S.J., R. Lit, and A. Lucas. 2017. Intraday stochastic volatility in discrete price changes: the dynamic Skellam model. Journal of the American Statistical Association 112(520): 1490–1503 . Lago-Peñas et al. [2013] Lago-Peñas, C., M.A. Gomez, J. Viaño, and I. González-García. 2013. Home advantage in elite handball: the impact of the quality of opposition on team performance. International Journal of Performance Analysis in Sport 13(3): 724–733 . Maher [1982] Maher, M.J. 1982. Modelling association football scores. Statistica Neerlandica 36(3): 109–118 . McHale and Scarf [2007] McHale, I. and P. Scarf. 2007. Modelling soccer matches using bivariate discrete distributions with general dependence structure. Statistica Neerlandica 61(4): 432–445 . Michels et al. [2023] Michels, R., M. Ötting, and D. Karlis. 2023. Extending the Dixon and Coles model: an application to women’s football data. arXiv preprint arXiv:2307.02139 . Michels et al. [2023] Michels, R., M. Ötting, and R. Langrock. 2023. Bettors’ reaction to match dynamics: Evidence from in-game betting. European Journal of Operational Research 310(3): 1118–1127 . Ntzoufras et al. [2021] Ntzoufras, I., V. Palaskas, and S. Drikos. 2021. Bayesian models for prediction of the set-difference in volleyball. IMA Journal of Management Mathematics 32(4): 491–518 . Ötting et al. [2024] Ötting, M., R. Michels, R. Langrock, and C. Deutscher. 2024. Demand for live betting: An analysis using state-space models. Applied Stochastic Models in Business and Industry . Pelechrinis and Winston [2021] Pelechrinis, K. and W. Winston. 2021. A Skellam regression model for quantifying positional value in soccer. Journal of Quantitative Analysis in Sports 17(3): 187–201 . Prieto et al. [2016] Prieto, J., M.Á. Gómez, A. Volossovitch, and J. Sampaio. 2016. Effects of team timeouts on the teams’ scoring performance in elite handball close games. Kinesiology 48(1.): 115–123 . Singh et al. [2023] Singh, A., P. Scarf, and R. Baker. 2023. A unified theory for bivariate scores in possessive ball-sports: The case of handball. European Journal of Operational Research 304(3): 1099–1112 . Skellam [1946] Skellam, J. 1946. The frequency distribution of the difference between two Poisson variates belonging to different populations. Journal of the Royal Statistical Society. Series A 109(3): 296–296 . Smiatek and Heuer [2012] Smiatek, J. and A. Heuer. 2012. A statistical view on team handball results: home advantage, team fitness and prediction of match outcomes. arXiv preprint arXiv:1207.0700 . Tomy and Veena [2022] Tomy, L. and G. Veena. 2022. A retrospective study on Skellam and related distributions. Austrian Journal of Statistics 51(1): 102–111 . Van Eetvelde et al. [2023] Van Eetvelde, H., L.M. Hvattum, and C. Ley. 2023. The probabilistic final standing calculator: a fair stochastic tool to handle abruptly stopped football seasons. AStA Advances in Statistical Analysis 107(1-2): 251–269 . Volossovitch and Debanne [2021] Volossovitch, A. and T. Debanne. 2021. Home advantage in handball. Home Advantage in Sport: Causes and the Effect on Performance: 220–227 . Groll, A., J. Heiner, G. Schauberger, and J. Uhrmeister. 2020. Prediction of the 2019 IHF World Men’s Handball Championship–a sparse Gaussian approximation model. Journal of Sports Analytics 6(3): 187–197 . Holmes and McHale [2024] Holmes, B. and I.G. McHale. 2024. Forecasting football match results using a player rating based model. International Journal of Forecasting 40(1): 302–312 . Irwin [1937] Irwin, J.O. 1937. The frequency distribution of the difference between two independent variates following the same Poisson distribution. Journal of the Royal Statistical Society 100(3): 415–416 . Jiang et al. [2014] Jiang, L., K. Mao, and R. Wu. 2014. A Skellam model to identify differential patterns of gene expression induced by environmental signals. BMC Genomics 15(1): 1–9 . Karlis and Mamode Khan [2023] Karlis, D. and N. Mamode Khan. 2023. Models for integer data. Annual Review of Statistics and its Application 10: 297–323 . Karlis and Ntzoufras [2006] Karlis, D. and I. Ntzoufras. 2006. Bayesian analysis of the differences of count data. Statistics in Medicine 25(11): 1885–1905 . Koopman et al. [2017] Koopman, S.J., R. Lit, and A. Lucas. 2017. Intraday stochastic volatility in discrete price changes: the dynamic Skellam model. Journal of the American Statistical Association 112(520): 1490–1503 . Lago-Peñas et al. [2013] Lago-Peñas, C., M.A. Gomez, J. Viaño, and I. González-García. 2013. Home advantage in elite handball: the impact of the quality of opposition on team performance. International Journal of Performance Analysis in Sport 13(3): 724–733 . Maher [1982] Maher, M.J. 1982. Modelling association football scores. Statistica Neerlandica 36(3): 109–118 . McHale and Scarf [2007] McHale, I. and P. Scarf. 2007. Modelling soccer matches using bivariate discrete distributions with general dependence structure. Statistica Neerlandica 61(4): 432–445 . Michels et al. [2023] Michels, R., M. Ötting, and D. Karlis. 2023. Extending the Dixon and Coles model: an application to women’s football data. arXiv preprint arXiv:2307.02139 . Michels et al. [2023] Michels, R., M. Ötting, and R. Langrock. 2023. Bettors’ reaction to match dynamics: Evidence from in-game betting. European Journal of Operational Research 310(3): 1118–1127 . Ntzoufras et al. [2021] Ntzoufras, I., V. Palaskas, and S. Drikos. 2021. Bayesian models for prediction of the set-difference in volleyball. IMA Journal of Management Mathematics 32(4): 491–518 . Ötting et al. [2024] Ötting, M., R. Michels, R. Langrock, and C. Deutscher. 2024. Demand for live betting: An analysis using state-space models. Applied Stochastic Models in Business and Industry . Pelechrinis and Winston [2021] Pelechrinis, K. and W. Winston. 2021. A Skellam regression model for quantifying positional value in soccer. Journal of Quantitative Analysis in Sports 17(3): 187–201 . Prieto et al. [2016] Prieto, J., M.Á. Gómez, A. Volossovitch, and J. Sampaio. 2016. Effects of team timeouts on the teams’ scoring performance in elite handball close games. Kinesiology 48(1.): 115–123 . Singh et al. [2023] Singh, A., P. Scarf, and R. Baker. 2023. A unified theory for bivariate scores in possessive ball-sports: The case of handball. European Journal of Operational Research 304(3): 1099–1112 . Skellam [1946] Skellam, J. 1946. The frequency distribution of the difference between two Poisson variates belonging to different populations. Journal of the Royal Statistical Society. Series A 109(3): 296–296 . Smiatek and Heuer [2012] Smiatek, J. and A. Heuer. 2012. A statistical view on team handball results: home advantage, team fitness and prediction of match outcomes. arXiv preprint arXiv:1207.0700 . Tomy and Veena [2022] Tomy, L. and G. Veena. 2022. A retrospective study on Skellam and related distributions. Austrian Journal of Statistics 51(1): 102–111 . Van Eetvelde et al. [2023] Van Eetvelde, H., L.M. Hvattum, and C. Ley. 2023. The probabilistic final standing calculator: a fair stochastic tool to handle abruptly stopped football seasons. AStA Advances in Statistical Analysis 107(1-2): 251–269 . Volossovitch and Debanne [2021] Volossovitch, A. and T. Debanne. 2021. Home advantage in handball. Home Advantage in Sport: Causes and the Effect on Performance: 220–227 . Holmes, B. and I.G. McHale. 2024. Forecasting football match results using a player rating based model. International Journal of Forecasting 40(1): 302–312 . Irwin [1937] Irwin, J.O. 1937. The frequency distribution of the difference between two independent variates following the same Poisson distribution. Journal of the Royal Statistical Society 100(3): 415–416 . Jiang et al. [2014] Jiang, L., K. Mao, and R. Wu. 2014. A Skellam model to identify differential patterns of gene expression induced by environmental signals. BMC Genomics 15(1): 1–9 . Karlis and Mamode Khan [2023] Karlis, D. and N. Mamode Khan. 2023. Models for integer data. Annual Review of Statistics and its Application 10: 297–323 . Karlis and Ntzoufras [2006] Karlis, D. and I. Ntzoufras. 2006. Bayesian analysis of the differences of count data. Statistics in Medicine 25(11): 1885–1905 . Koopman et al. [2017] Koopman, S.J., R. Lit, and A. Lucas. 2017. Intraday stochastic volatility in discrete price changes: the dynamic Skellam model. Journal of the American Statistical Association 112(520): 1490–1503 . Lago-Peñas et al. [2013] Lago-Peñas, C., M.A. Gomez, J. Viaño, and I. González-García. 2013. Home advantage in elite handball: the impact of the quality of opposition on team performance. International Journal of Performance Analysis in Sport 13(3): 724–733 . Maher [1982] Maher, M.J. 1982. Modelling association football scores. Statistica Neerlandica 36(3): 109–118 . McHale and Scarf [2007] McHale, I. and P. Scarf. 2007. Modelling soccer matches using bivariate discrete distributions with general dependence structure. Statistica Neerlandica 61(4): 432–445 . Michels et al. [2023] Michels, R., M. Ötting, and D. Karlis. 2023. Extending the Dixon and Coles model: an application to women’s football data. arXiv preprint arXiv:2307.02139 . Michels et al. [2023] Michels, R., M. Ötting, and R. Langrock. 2023. Bettors’ reaction to match dynamics: Evidence from in-game betting. European Journal of Operational Research 310(3): 1118–1127 . Ntzoufras et al. [2021] Ntzoufras, I., V. Palaskas, and S. Drikos. 2021. Bayesian models for prediction of the set-difference in volleyball. IMA Journal of Management Mathematics 32(4): 491–518 . Ötting et al. [2024] Ötting, M., R. Michels, R. Langrock, and C. Deutscher. 2024. Demand for live betting: An analysis using state-space models. Applied Stochastic Models in Business and Industry . Pelechrinis and Winston [2021] Pelechrinis, K. and W. Winston. 2021. A Skellam regression model for quantifying positional value in soccer. Journal of Quantitative Analysis in Sports 17(3): 187–201 . Prieto et al. [2016] Prieto, J., M.Á. Gómez, A. Volossovitch, and J. Sampaio. 2016. Effects of team timeouts on the teams’ scoring performance in elite handball close games. Kinesiology 48(1.): 115–123 . Singh et al. [2023] Singh, A., P. Scarf, and R. Baker. 2023. A unified theory for bivariate scores in possessive ball-sports: The case of handball. European Journal of Operational Research 304(3): 1099–1112 . Skellam [1946] Skellam, J. 1946. The frequency distribution of the difference between two Poisson variates belonging to different populations. Journal of the Royal Statistical Society. Series A 109(3): 296–296 . Smiatek and Heuer [2012] Smiatek, J. and A. Heuer. 2012. A statistical view on team handball results: home advantage, team fitness and prediction of match outcomes. arXiv preprint arXiv:1207.0700 . Tomy and Veena [2022] Tomy, L. and G. Veena. 2022. A retrospective study on Skellam and related distributions. Austrian Journal of Statistics 51(1): 102–111 . Van Eetvelde et al. [2023] Van Eetvelde, H., L.M. Hvattum, and C. Ley. 2023. The probabilistic final standing calculator: a fair stochastic tool to handle abruptly stopped football seasons. AStA Advances in Statistical Analysis 107(1-2): 251–269 . Volossovitch and Debanne [2021] Volossovitch, A. and T. Debanne. 2021. Home advantage in handball. Home Advantage in Sport: Causes and the Effect on Performance: 220–227 . Irwin, J.O. 1937. The frequency distribution of the difference between two independent variates following the same Poisson distribution. Journal of the Royal Statistical Society 100(3): 415–416 . Jiang et al. [2014] Jiang, L., K. Mao, and R. Wu. 2014. A Skellam model to identify differential patterns of gene expression induced by environmental signals. BMC Genomics 15(1): 1–9 . Karlis and Mamode Khan [2023] Karlis, D. and N. Mamode Khan. 2023. Models for integer data. Annual Review of Statistics and its Application 10: 297–323 . Karlis and Ntzoufras [2006] Karlis, D. and I. Ntzoufras. 2006. Bayesian analysis of the differences of count data. Statistics in Medicine 25(11): 1885–1905 . Koopman et al. [2017] Koopman, S.J., R. Lit, and A. Lucas. 2017. Intraday stochastic volatility in discrete price changes: the dynamic Skellam model. Journal of the American Statistical Association 112(520): 1490–1503 . Lago-Peñas et al. [2013] Lago-Peñas, C., M.A. Gomez, J. Viaño, and I. González-García. 2013. Home advantage in elite handball: the impact of the quality of opposition on team performance. International Journal of Performance Analysis in Sport 13(3): 724–733 . Maher [1982] Maher, M.J. 1982. Modelling association football scores. Statistica Neerlandica 36(3): 109–118 . McHale and Scarf [2007] McHale, I. and P. Scarf. 2007. Modelling soccer matches using bivariate discrete distributions with general dependence structure. Statistica Neerlandica 61(4): 432–445 . Michels et al. [2023] Michels, R., M. Ötting, and D. Karlis. 2023. Extending the Dixon and Coles model: an application to women’s football data. arXiv preprint arXiv:2307.02139 . Michels et al. [2023] Michels, R., M. Ötting, and R. Langrock. 2023. Bettors’ reaction to match dynamics: Evidence from in-game betting. European Journal of Operational Research 310(3): 1118–1127 . Ntzoufras et al. [2021] Ntzoufras, I., V. Palaskas, and S. Drikos. 2021. Bayesian models for prediction of the set-difference in volleyball. IMA Journal of Management Mathematics 32(4): 491–518 . Ötting et al. [2024] Ötting, M., R. Michels, R. Langrock, and C. Deutscher. 2024. Demand for live betting: An analysis using state-space models. Applied Stochastic Models in Business and Industry . Pelechrinis and Winston [2021] Pelechrinis, K. and W. Winston. 2021. A Skellam regression model for quantifying positional value in soccer. Journal of Quantitative Analysis in Sports 17(3): 187–201 . Prieto et al. [2016] Prieto, J., M.Á. Gómez, A. Volossovitch, and J. Sampaio. 2016. Effects of team timeouts on the teams’ scoring performance in elite handball close games. Kinesiology 48(1.): 115–123 . Singh et al. [2023] Singh, A., P. Scarf, and R. Baker. 2023. A unified theory for bivariate scores in possessive ball-sports: The case of handball. European Journal of Operational Research 304(3): 1099–1112 . Skellam [1946] Skellam, J. 1946. The frequency distribution of the difference between two Poisson variates belonging to different populations. Journal of the Royal Statistical Society. Series A 109(3): 296–296 . Smiatek and Heuer [2012] Smiatek, J. and A. Heuer. 2012. A statistical view on team handball results: home advantage, team fitness and prediction of match outcomes. arXiv preprint arXiv:1207.0700 . Tomy and Veena [2022] Tomy, L. and G. Veena. 2022. A retrospective study on Skellam and related distributions. Austrian Journal of Statistics 51(1): 102–111 . Van Eetvelde et al. [2023] Van Eetvelde, H., L.M. Hvattum, and C. Ley. 2023. The probabilistic final standing calculator: a fair stochastic tool to handle abruptly stopped football seasons. AStA Advances in Statistical Analysis 107(1-2): 251–269 . Volossovitch and Debanne [2021] Volossovitch, A. and T. Debanne. 2021. Home advantage in handball. Home Advantage in Sport: Causes and the Effect on Performance: 220–227 . Jiang, L., K. Mao, and R. Wu. 2014. A Skellam model to identify differential patterns of gene expression induced by environmental signals. BMC Genomics 15(1): 1–9 . Karlis and Mamode Khan [2023] Karlis, D. and N. Mamode Khan. 2023. Models for integer data. Annual Review of Statistics and its Application 10: 297–323 . Karlis and Ntzoufras [2006] Karlis, D. and I. Ntzoufras. 2006. Bayesian analysis of the differences of count data. Statistics in Medicine 25(11): 1885–1905 . Koopman et al. [2017] Koopman, S.J., R. Lit, and A. Lucas. 2017. Intraday stochastic volatility in discrete price changes: the dynamic Skellam model. Journal of the American Statistical Association 112(520): 1490–1503 . Lago-Peñas et al. [2013] Lago-Peñas, C., M.A. Gomez, J. Viaño, and I. González-García. 2013. Home advantage in elite handball: the impact of the quality of opposition on team performance. International Journal of Performance Analysis in Sport 13(3): 724–733 . Maher [1982] Maher, M.J. 1982. Modelling association football scores. Statistica Neerlandica 36(3): 109–118 . McHale and Scarf [2007] McHale, I. and P. Scarf. 2007. Modelling soccer matches using bivariate discrete distributions with general dependence structure. Statistica Neerlandica 61(4): 432–445 . Michels et al. [2023] Michels, R., M. Ötting, and D. Karlis. 2023. Extending the Dixon and Coles model: an application to women’s football data. arXiv preprint arXiv:2307.02139 . Michels et al. [2023] Michels, R., M. Ötting, and R. Langrock. 2023. Bettors’ reaction to match dynamics: Evidence from in-game betting. European Journal of Operational Research 310(3): 1118–1127 . Ntzoufras et al. [2021] Ntzoufras, I., V. Palaskas, and S. Drikos. 2021. Bayesian models for prediction of the set-difference in volleyball. IMA Journal of Management Mathematics 32(4): 491–518 . Ötting et al. [2024] Ötting, M., R. Michels, R. Langrock, and C. Deutscher. 2024. Demand for live betting: An analysis using state-space models. Applied Stochastic Models in Business and Industry . Pelechrinis and Winston [2021] Pelechrinis, K. and W. Winston. 2021. A Skellam regression model for quantifying positional value in soccer. Journal of Quantitative Analysis in Sports 17(3): 187–201 . Prieto et al. [2016] Prieto, J., M.Á. Gómez, A. Volossovitch, and J. Sampaio. 2016. Effects of team timeouts on the teams’ scoring performance in elite handball close games. Kinesiology 48(1.): 115–123 . Singh et al. [2023] Singh, A., P. Scarf, and R. Baker. 2023. A unified theory for bivariate scores in possessive ball-sports: The case of handball. European Journal of Operational Research 304(3): 1099–1112 . Skellam [1946] Skellam, J. 1946. The frequency distribution of the difference between two Poisson variates belonging to different populations. Journal of the Royal Statistical Society. Series A 109(3): 296–296 . Smiatek and Heuer [2012] Smiatek, J. and A. Heuer. 2012. A statistical view on team handball results: home advantage, team fitness and prediction of match outcomes. arXiv preprint arXiv:1207.0700 . Tomy and Veena [2022] Tomy, L. and G. Veena. 2022. A retrospective study on Skellam and related distributions. Austrian Journal of Statistics 51(1): 102–111 . Van Eetvelde et al. [2023] Van Eetvelde, H., L.M. Hvattum, and C. Ley. 2023. The probabilistic final standing calculator: a fair stochastic tool to handle abruptly stopped football seasons. AStA Advances in Statistical Analysis 107(1-2): 251–269 . Volossovitch and Debanne [2021] Volossovitch, A. and T. Debanne. 2021. Home advantage in handball. Home Advantage in Sport: Causes and the Effect on Performance: 220–227 . Karlis, D. and N. Mamode Khan. 2023. Models for integer data. Annual Review of Statistics and its Application 10: 297–323 . Karlis and Ntzoufras [2006] Karlis, D. and I. Ntzoufras. 2006. Bayesian analysis of the differences of count data. Statistics in Medicine 25(11): 1885–1905 . Koopman et al. [2017] Koopman, S.J., R. Lit, and A. Lucas. 2017. Intraday stochastic volatility in discrete price changes: the dynamic Skellam model. Journal of the American Statistical Association 112(520): 1490–1503 . Lago-Peñas et al. [2013] Lago-Peñas, C., M.A. Gomez, J. Viaño, and I. González-García. 2013. Home advantage in elite handball: the impact of the quality of opposition on team performance. International Journal of Performance Analysis in Sport 13(3): 724–733 . Maher [1982] Maher, M.J. 1982. Modelling association football scores. Statistica Neerlandica 36(3): 109–118 . McHale and Scarf [2007] McHale, I. and P. Scarf. 2007. Modelling soccer matches using bivariate discrete distributions with general dependence structure. Statistica Neerlandica 61(4): 432–445 . Michels et al. [2023] Michels, R., M. Ötting, and D. Karlis. 2023. Extending the Dixon and Coles model: an application to women’s football data. arXiv preprint arXiv:2307.02139 . Michels et al. [2023] Michels, R., M. Ötting, and R. Langrock. 2023. Bettors’ reaction to match dynamics: Evidence from in-game betting. European Journal of Operational Research 310(3): 1118–1127 . Ntzoufras et al. [2021] Ntzoufras, I., V. Palaskas, and S. Drikos. 2021. Bayesian models for prediction of the set-difference in volleyball. IMA Journal of Management Mathematics 32(4): 491–518 . Ötting et al. [2024] Ötting, M., R. Michels, R. Langrock, and C. Deutscher. 2024. Demand for live betting: An analysis using state-space models. Applied Stochastic Models in Business and Industry . Pelechrinis and Winston [2021] Pelechrinis, K. and W. Winston. 2021. A Skellam regression model for quantifying positional value in soccer. Journal of Quantitative Analysis in Sports 17(3): 187–201 . Prieto et al. [2016] Prieto, J., M.Á. Gómez, A. Volossovitch, and J. Sampaio. 2016. Effects of team timeouts on the teams’ scoring performance in elite handball close games. Kinesiology 48(1.): 115–123 . Singh et al. [2023] Singh, A., P. Scarf, and R. Baker. 2023. A unified theory for bivariate scores in possessive ball-sports: The case of handball. European Journal of Operational Research 304(3): 1099–1112 . Skellam [1946] Skellam, J. 1946. The frequency distribution of the difference between two Poisson variates belonging to different populations. Journal of the Royal Statistical Society. Series A 109(3): 296–296 . Smiatek and Heuer [2012] Smiatek, J. and A. Heuer. 2012. A statistical view on team handball results: home advantage, team fitness and prediction of match outcomes. arXiv preprint arXiv:1207.0700 . Tomy and Veena [2022] Tomy, L. and G. Veena. 2022. A retrospective study on Skellam and related distributions. Austrian Journal of Statistics 51(1): 102–111 . Van Eetvelde et al. [2023] Van Eetvelde, H., L.M. Hvattum, and C. Ley. 2023. The probabilistic final standing calculator: a fair stochastic tool to handle abruptly stopped football seasons. AStA Advances in Statistical Analysis 107(1-2): 251–269 . Volossovitch and Debanne [2021] Volossovitch, A. and T. Debanne. 2021. Home advantage in handball. Home Advantage in Sport: Causes and the Effect on Performance: 220–227 . Karlis, D. and I. Ntzoufras. 2006. Bayesian analysis of the differences of count data. Statistics in Medicine 25(11): 1885–1905 . Koopman et al. [2017] Koopman, S.J., R. Lit, and A. Lucas. 2017. Intraday stochastic volatility in discrete price changes: the dynamic Skellam model. Journal of the American Statistical Association 112(520): 1490–1503 . Lago-Peñas et al. [2013] Lago-Peñas, C., M.A. Gomez, J. Viaño, and I. González-García. 2013. Home advantage in elite handball: the impact of the quality of opposition on team performance. International Journal of Performance Analysis in Sport 13(3): 724–733 . Maher [1982] Maher, M.J. 1982. Modelling association football scores. Statistica Neerlandica 36(3): 109–118 . McHale and Scarf [2007] McHale, I. and P. Scarf. 2007. Modelling soccer matches using bivariate discrete distributions with general dependence structure. Statistica Neerlandica 61(4): 432–445 . Michels et al. [2023] Michels, R., M. Ötting, and D. Karlis. 2023. Extending the Dixon and Coles model: an application to women’s football data. arXiv preprint arXiv:2307.02139 . Michels et al. [2023] Michels, R., M. Ötting, and R. Langrock. 2023. Bettors’ reaction to match dynamics: Evidence from in-game betting. European Journal of Operational Research 310(3): 1118–1127 . Ntzoufras et al. [2021] Ntzoufras, I., V. Palaskas, and S. Drikos. 2021. Bayesian models for prediction of the set-difference in volleyball. IMA Journal of Management Mathematics 32(4): 491–518 . Ötting et al. [2024] Ötting, M., R. Michels, R. Langrock, and C. Deutscher. 2024. Demand for live betting: An analysis using state-space models. Applied Stochastic Models in Business and Industry . Pelechrinis and Winston [2021] Pelechrinis, K. and W. Winston. 2021. A Skellam regression model for quantifying positional value in soccer. Journal of Quantitative Analysis in Sports 17(3): 187–201 . Prieto et al. [2016] Prieto, J., M.Á. Gómez, A. Volossovitch, and J. Sampaio. 2016. Effects of team timeouts on the teams’ scoring performance in elite handball close games. Kinesiology 48(1.): 115–123 . Singh et al. [2023] Singh, A., P. Scarf, and R. Baker. 2023. A unified theory for bivariate scores in possessive ball-sports: The case of handball. European Journal of Operational Research 304(3): 1099–1112 . Skellam [1946] Skellam, J. 1946. The frequency distribution of the difference between two Poisson variates belonging to different populations. Journal of the Royal Statistical Society. Series A 109(3): 296–296 . Smiatek and Heuer [2012] Smiatek, J. and A. Heuer. 2012. A statistical view on team handball results: home advantage, team fitness and prediction of match outcomes. arXiv preprint arXiv:1207.0700 . Tomy and Veena [2022] Tomy, L. and G. Veena. 2022. A retrospective study on Skellam and related distributions. Austrian Journal of Statistics 51(1): 102–111 . Van Eetvelde et al. [2023] Van Eetvelde, H., L.M. Hvattum, and C. Ley. 2023. The probabilistic final standing calculator: a fair stochastic tool to handle abruptly stopped football seasons. AStA Advances in Statistical Analysis 107(1-2): 251–269 . Volossovitch and Debanne [2021] Volossovitch, A. and T. Debanne. 2021. Home advantage in handball. Home Advantage in Sport: Causes and the Effect on Performance: 220–227 . Koopman, S.J., R. Lit, and A. Lucas. 2017. Intraday stochastic volatility in discrete price changes: the dynamic Skellam model. Journal of the American Statistical Association 112(520): 1490–1503 . Lago-Peñas et al. [2013] Lago-Peñas, C., M.A. Gomez, J. Viaño, and I. González-García. 2013. Home advantage in elite handball: the impact of the quality of opposition on team performance. International Journal of Performance Analysis in Sport 13(3): 724–733 . Maher [1982] Maher, M.J. 1982. Modelling association football scores. Statistica Neerlandica 36(3): 109–118 . McHale and Scarf [2007] McHale, I. and P. Scarf. 2007. Modelling soccer matches using bivariate discrete distributions with general dependence structure. Statistica Neerlandica 61(4): 432–445 . Michels et al. [2023] Michels, R., M. Ötting, and D. Karlis. 2023. Extending the Dixon and Coles model: an application to women’s football data. arXiv preprint arXiv:2307.02139 . Michels et al. [2023] Michels, R., M. Ötting, and R. Langrock. 2023. Bettors’ reaction to match dynamics: Evidence from in-game betting. European Journal of Operational Research 310(3): 1118–1127 . Ntzoufras et al. [2021] Ntzoufras, I., V. Palaskas, and S. Drikos. 2021. Bayesian models for prediction of the set-difference in volleyball. IMA Journal of Management Mathematics 32(4): 491–518 . Ötting et al. [2024] Ötting, M., R. Michels, R. Langrock, and C. Deutscher. 2024. Demand for live betting: An analysis using state-space models. Applied Stochastic Models in Business and Industry . Pelechrinis and Winston [2021] Pelechrinis, K. and W. Winston. 2021. A Skellam regression model for quantifying positional value in soccer. Journal of Quantitative Analysis in Sports 17(3): 187–201 . Prieto et al. [2016] Prieto, J., M.Á. Gómez, A. Volossovitch, and J. Sampaio. 2016. Effects of team timeouts on the teams’ scoring performance in elite handball close games. Kinesiology 48(1.): 115–123 . Singh et al. [2023] Singh, A., P. Scarf, and R. Baker. 2023. A unified theory for bivariate scores in possessive ball-sports: The case of handball. European Journal of Operational Research 304(3): 1099–1112 . Skellam [1946] Skellam, J. 1946. The frequency distribution of the difference between two Poisson variates belonging to different populations. Journal of the Royal Statistical Society. Series A 109(3): 296–296 . Smiatek and Heuer [2012] Smiatek, J. and A. Heuer. 2012. A statistical view on team handball results: home advantage, team fitness and prediction of match outcomes. arXiv preprint arXiv:1207.0700 . Tomy and Veena [2022] Tomy, L. and G. Veena. 2022. A retrospective study on Skellam and related distributions. Austrian Journal of Statistics 51(1): 102–111 . Van Eetvelde et al. [2023] Van Eetvelde, H., L.M. Hvattum, and C. Ley. 2023. The probabilistic final standing calculator: a fair stochastic tool to handle abruptly stopped football seasons. AStA Advances in Statistical Analysis 107(1-2): 251–269 . Volossovitch and Debanne [2021] Volossovitch, A. and T. Debanne. 2021. Home advantage in handball. Home Advantage in Sport: Causes and the Effect on Performance: 220–227 . Lago-Peñas, C., M.A. Gomez, J. Viaño, and I. González-García. 2013. Home advantage in elite handball: the impact of the quality of opposition on team performance. International Journal of Performance Analysis in Sport 13(3): 724–733 . Maher [1982] Maher, M.J. 1982. Modelling association football scores. Statistica Neerlandica 36(3): 109–118 . McHale and Scarf [2007] McHale, I. and P. Scarf. 2007. Modelling soccer matches using bivariate discrete distributions with general dependence structure. Statistica Neerlandica 61(4): 432–445 . Michels et al. [2023] Michels, R., M. Ötting, and D. Karlis. 2023. Extending the Dixon and Coles model: an application to women’s football data. arXiv preprint arXiv:2307.02139 . Michels et al. [2023] Michels, R., M. Ötting, and R. Langrock. 2023. Bettors’ reaction to match dynamics: Evidence from in-game betting. European Journal of Operational Research 310(3): 1118–1127 . Ntzoufras et al. [2021] Ntzoufras, I., V. Palaskas, and S. Drikos. 2021. Bayesian models for prediction of the set-difference in volleyball. IMA Journal of Management Mathematics 32(4): 491–518 . Ötting et al. [2024] Ötting, M., R. Michels, R. Langrock, and C. Deutscher. 2024. Demand for live betting: An analysis using state-space models. Applied Stochastic Models in Business and Industry . Pelechrinis and Winston [2021] Pelechrinis, K. and W. Winston. 2021. A Skellam regression model for quantifying positional value in soccer. Journal of Quantitative Analysis in Sports 17(3): 187–201 . Prieto et al. [2016] Prieto, J., M.Á. Gómez, A. Volossovitch, and J. Sampaio. 2016. Effects of team timeouts on the teams’ scoring performance in elite handball close games. Kinesiology 48(1.): 115–123 . Singh et al. [2023] Singh, A., P. Scarf, and R. Baker. 2023. A unified theory for bivariate scores in possessive ball-sports: The case of handball. European Journal of Operational Research 304(3): 1099–1112 . Skellam [1946] Skellam, J. 1946. The frequency distribution of the difference between two Poisson variates belonging to different populations. Journal of the Royal Statistical Society. Series A 109(3): 296–296 . Smiatek and Heuer [2012] Smiatek, J. and A. Heuer. 2012. A statistical view on team handball results: home advantage, team fitness and prediction of match outcomes. arXiv preprint arXiv:1207.0700 . Tomy and Veena [2022] Tomy, L. and G. Veena. 2022. A retrospective study on Skellam and related distributions. Austrian Journal of Statistics 51(1): 102–111 . Van Eetvelde et al. [2023] Van Eetvelde, H., L.M. Hvattum, and C. Ley. 2023. The probabilistic final standing calculator: a fair stochastic tool to handle abruptly stopped football seasons. AStA Advances in Statistical Analysis 107(1-2): 251–269 . Volossovitch and Debanne [2021] Volossovitch, A. and T. Debanne. 2021. Home advantage in handball. Home Advantage in Sport: Causes and the Effect on Performance: 220–227 . Maher, M.J. 1982. Modelling association football scores. Statistica Neerlandica 36(3): 109–118 . McHale and Scarf [2007] McHale, I. and P. Scarf. 2007. Modelling soccer matches using bivariate discrete distributions with general dependence structure. Statistica Neerlandica 61(4): 432–445 . Michels et al. [2023] Michels, R., M. Ötting, and D. Karlis. 2023. Extending the Dixon and Coles model: an application to women’s football data. arXiv preprint arXiv:2307.02139 . Michels et al. [2023] Michels, R., M. Ötting, and R. Langrock. 2023. Bettors’ reaction to match dynamics: Evidence from in-game betting. European Journal of Operational Research 310(3): 1118–1127 . Ntzoufras et al. [2021] Ntzoufras, I., V. Palaskas, and S. Drikos. 2021. Bayesian models for prediction of the set-difference in volleyball. IMA Journal of Management Mathematics 32(4): 491–518 . Ötting et al. [2024] Ötting, M., R. Michels, R. Langrock, and C. Deutscher. 2024. Demand for live betting: An analysis using state-space models. Applied Stochastic Models in Business and Industry . Pelechrinis and Winston [2021] Pelechrinis, K. and W. Winston. 2021. A Skellam regression model for quantifying positional value in soccer. Journal of Quantitative Analysis in Sports 17(3): 187–201 . Prieto et al. [2016] Prieto, J., M.Á. Gómez, A. Volossovitch, and J. Sampaio. 2016. Effects of team timeouts on the teams’ scoring performance in elite handball close games. Kinesiology 48(1.): 115–123 . Singh et al. [2023] Singh, A., P. Scarf, and R. Baker. 2023. A unified theory for bivariate scores in possessive ball-sports: The case of handball. European Journal of Operational Research 304(3): 1099–1112 . Skellam [1946] Skellam, J. 1946. The frequency distribution of the difference between two Poisson variates belonging to different populations. Journal of the Royal Statistical Society. Series A 109(3): 296–296 . Smiatek and Heuer [2012] Smiatek, J. and A. Heuer. 2012. A statistical view on team handball results: home advantage, team fitness and prediction of match outcomes. arXiv preprint arXiv:1207.0700 . Tomy and Veena [2022] Tomy, L. and G. Veena. 2022. A retrospective study on Skellam and related distributions. Austrian Journal of Statistics 51(1): 102–111 . Van Eetvelde et al. [2023] Van Eetvelde, H., L.M. Hvattum, and C. Ley. 2023. The probabilistic final standing calculator: a fair stochastic tool to handle abruptly stopped football seasons. AStA Advances in Statistical Analysis 107(1-2): 251–269 . Volossovitch and Debanne [2021] Volossovitch, A. and T. Debanne. 2021. Home advantage in handball. Home Advantage in Sport: Causes and the Effect on Performance: 220–227 . McHale, I. and P. Scarf. 2007. Modelling soccer matches using bivariate discrete distributions with general dependence structure. Statistica Neerlandica 61(4): 432–445 . Michels et al. [2023] Michels, R., M. Ötting, and D. Karlis. 2023. Extending the Dixon and Coles model: an application to women’s football data. arXiv preprint arXiv:2307.02139 . Michels et al. [2023] Michels, R., M. Ötting, and R. Langrock. 2023. Bettors’ reaction to match dynamics: Evidence from in-game betting. European Journal of Operational Research 310(3): 1118–1127 . Ntzoufras et al. [2021] Ntzoufras, I., V. Palaskas, and S. Drikos. 2021. Bayesian models for prediction of the set-difference in volleyball. IMA Journal of Management Mathematics 32(4): 491–518 . Ötting et al. [2024] Ötting, M., R. Michels, R. Langrock, and C. Deutscher. 2024. Demand for live betting: An analysis using state-space models. Applied Stochastic Models in Business and Industry . Pelechrinis and Winston [2021] Pelechrinis, K. and W. Winston. 2021. A Skellam regression model for quantifying positional value in soccer. Journal of Quantitative Analysis in Sports 17(3): 187–201 . Prieto et al. [2016] Prieto, J., M.Á. Gómez, A. Volossovitch, and J. Sampaio. 2016. Effects of team timeouts on the teams’ scoring performance in elite handball close games. Kinesiology 48(1.): 115–123 . Singh et al. [2023] Singh, A., P. Scarf, and R. Baker. 2023. A unified theory for bivariate scores in possessive ball-sports: The case of handball. European Journal of Operational Research 304(3): 1099–1112 . Skellam [1946] Skellam, J. 1946. The frequency distribution of the difference between two Poisson variates belonging to different populations. Journal of the Royal Statistical Society. Series A 109(3): 296–296 . Smiatek and Heuer [2012] Smiatek, J. and A. Heuer. 2012. A statistical view on team handball results: home advantage, team fitness and prediction of match outcomes. arXiv preprint arXiv:1207.0700 . Tomy and Veena [2022] Tomy, L. and G. Veena. 2022. A retrospective study on Skellam and related distributions. Austrian Journal of Statistics 51(1): 102–111 . Van Eetvelde et al. [2023] Van Eetvelde, H., L.M. Hvattum, and C. Ley. 2023. The probabilistic final standing calculator: a fair stochastic tool to handle abruptly stopped football seasons. AStA Advances in Statistical Analysis 107(1-2): 251–269 . Volossovitch and Debanne [2021] Volossovitch, A. and T. Debanne. 2021. Home advantage in handball. Home Advantage in Sport: Causes and the Effect on Performance: 220–227 . Michels, R., M. Ötting, and D. Karlis. 2023. Extending the Dixon and Coles model: an application to women’s football data. arXiv preprint arXiv:2307.02139 . Michels et al. [2023] Michels, R., M. Ötting, and R. Langrock. 2023. Bettors’ reaction to match dynamics: Evidence from in-game betting. European Journal of Operational Research 310(3): 1118–1127 . Ntzoufras et al. [2021] Ntzoufras, I., V. Palaskas, and S. Drikos. 2021. Bayesian models for prediction of the set-difference in volleyball. IMA Journal of Management Mathematics 32(4): 491–518 . Ötting et al. [2024] Ötting, M., R. Michels, R. Langrock, and C. Deutscher. 2024. Demand for live betting: An analysis using state-space models. Applied Stochastic Models in Business and Industry . Pelechrinis and Winston [2021] Pelechrinis, K. and W. Winston. 2021. A Skellam regression model for quantifying positional value in soccer. Journal of Quantitative Analysis in Sports 17(3): 187–201 . Prieto et al. [2016] Prieto, J., M.Á. Gómez, A. Volossovitch, and J. Sampaio. 2016. Effects of team timeouts on the teams’ scoring performance in elite handball close games. Kinesiology 48(1.): 115–123 . Singh et al. [2023] Singh, A., P. Scarf, and R. Baker. 2023. A unified theory for bivariate scores in possessive ball-sports: The case of handball. European Journal of Operational Research 304(3): 1099–1112 . Skellam [1946] Skellam, J. 1946. The frequency distribution of the difference between two Poisson variates belonging to different populations. Journal of the Royal Statistical Society. Series A 109(3): 296–296 . Smiatek and Heuer [2012] Smiatek, J. and A. Heuer. 2012. A statistical view on team handball results: home advantage, team fitness and prediction of match outcomes. arXiv preprint arXiv:1207.0700 . Tomy and Veena [2022] Tomy, L. and G. Veena. 2022. A retrospective study on Skellam and related distributions. Austrian Journal of Statistics 51(1): 102–111 . Van Eetvelde et al. [2023] Van Eetvelde, H., L.M. Hvattum, and C. Ley. 2023. The probabilistic final standing calculator: a fair stochastic tool to handle abruptly stopped football seasons. AStA Advances in Statistical Analysis 107(1-2): 251–269 . Volossovitch and Debanne [2021] Volossovitch, A. and T. Debanne. 2021. Home advantage in handball. Home Advantage in Sport: Causes and the Effect on Performance: 220–227 . Michels, R., M. Ötting, and R. Langrock. 2023. Bettors’ reaction to match dynamics: Evidence from in-game betting. European Journal of Operational Research 310(3): 1118–1127 . Ntzoufras et al. [2021] Ntzoufras, I., V. Palaskas, and S. Drikos. 2021. Bayesian models for prediction of the set-difference in volleyball. IMA Journal of Management Mathematics 32(4): 491–518 . Ötting et al. [2024] Ötting, M., R. Michels, R. Langrock, and C. Deutscher. 2024. Demand for live betting: An analysis using state-space models. Applied Stochastic Models in Business and Industry . Pelechrinis and Winston [2021] Pelechrinis, K. and W. Winston. 2021. A Skellam regression model for quantifying positional value in soccer. Journal of Quantitative Analysis in Sports 17(3): 187–201 . Prieto et al. [2016] Prieto, J., M.Á. Gómez, A. Volossovitch, and J. Sampaio. 2016. Effects of team timeouts on the teams’ scoring performance in elite handball close games. Kinesiology 48(1.): 115–123 . Singh et al. [2023] Singh, A., P. Scarf, and R. Baker. 2023. A unified theory for bivariate scores in possessive ball-sports: The case of handball. European Journal of Operational Research 304(3): 1099–1112 . Skellam [1946] Skellam, J. 1946. The frequency distribution of the difference between two Poisson variates belonging to different populations. Journal of the Royal Statistical Society. Series A 109(3): 296–296 . Smiatek and Heuer [2012] Smiatek, J. and A. Heuer. 2012. A statistical view on team handball results: home advantage, team fitness and prediction of match outcomes. arXiv preprint arXiv:1207.0700 . Tomy and Veena [2022] Tomy, L. and G. Veena. 2022. A retrospective study on Skellam and related distributions. Austrian Journal of Statistics 51(1): 102–111 . Van Eetvelde et al. [2023] Van Eetvelde, H., L.M. Hvattum, and C. Ley. 2023. The probabilistic final standing calculator: a fair stochastic tool to handle abruptly stopped football seasons. AStA Advances in Statistical Analysis 107(1-2): 251–269 . Volossovitch and Debanne [2021] Volossovitch, A. and T. Debanne. 2021. Home advantage in handball. Home Advantage in Sport: Causes and the Effect on Performance: 220–227 . Ntzoufras, I., V. Palaskas, and S. Drikos. 2021. Bayesian models for prediction of the set-difference in volleyball. IMA Journal of Management Mathematics 32(4): 491–518 . Ötting et al. [2024] Ötting, M., R. Michels, R. Langrock, and C. Deutscher. 2024. Demand for live betting: An analysis using state-space models. Applied Stochastic Models in Business and Industry . Pelechrinis and Winston [2021] Pelechrinis, K. and W. Winston. 2021. A Skellam regression model for quantifying positional value in soccer. Journal of Quantitative Analysis in Sports 17(3): 187–201 . Prieto et al. [2016] Prieto, J., M.Á. Gómez, A. Volossovitch, and J. Sampaio. 2016. Effects of team timeouts on the teams’ scoring performance in elite handball close games. Kinesiology 48(1.): 115–123 . Singh et al. [2023] Singh, A., P. Scarf, and R. Baker. 2023. A unified theory for bivariate scores in possessive ball-sports: The case of handball. European Journal of Operational Research 304(3): 1099–1112 . Skellam [1946] Skellam, J. 1946. The frequency distribution of the difference between two Poisson variates belonging to different populations. Journal of the Royal Statistical Society. Series A 109(3): 296–296 . Smiatek and Heuer [2012] Smiatek, J. and A. Heuer. 2012. A statistical view on team handball results: home advantage, team fitness and prediction of match outcomes. arXiv preprint arXiv:1207.0700 . Tomy and Veena [2022] Tomy, L. and G. Veena. 2022. A retrospective study on Skellam and related distributions. Austrian Journal of Statistics 51(1): 102–111 . Van Eetvelde et al. [2023] Van Eetvelde, H., L.M. Hvattum, and C. Ley. 2023. The probabilistic final standing calculator: a fair stochastic tool to handle abruptly stopped football seasons. AStA Advances in Statistical Analysis 107(1-2): 251–269 . Volossovitch and Debanne [2021] Volossovitch, A. and T. Debanne. 2021. Home advantage in handball. Home Advantage in Sport: Causes and the Effect on Performance: 220–227 . Ötting, M., R. Michels, R. Langrock, and C. Deutscher. 2024. Demand for live betting: An analysis using state-space models. Applied Stochastic Models in Business and Industry . Pelechrinis and Winston [2021] Pelechrinis, K. and W. Winston. 2021. A Skellam regression model for quantifying positional value in soccer. Journal of Quantitative Analysis in Sports 17(3): 187–201 . Prieto et al. [2016] Prieto, J., M.Á. Gómez, A. Volossovitch, and J. Sampaio. 2016. Effects of team timeouts on the teams’ scoring performance in elite handball close games. Kinesiology 48(1.): 115–123 . Singh et al. [2023] Singh, A., P. Scarf, and R. Baker. 2023. A unified theory for bivariate scores in possessive ball-sports: The case of handball. European Journal of Operational Research 304(3): 1099–1112 . Skellam [1946] Skellam, J. 1946. The frequency distribution of the difference between two Poisson variates belonging to different populations. Journal of the Royal Statistical Society. Series A 109(3): 296–296 . Smiatek and Heuer [2012] Smiatek, J. and A. Heuer. 2012. A statistical view on team handball results: home advantage, team fitness and prediction of match outcomes. arXiv preprint arXiv:1207.0700 . Tomy and Veena [2022] Tomy, L. and G. Veena. 2022. A retrospective study on Skellam and related distributions. Austrian Journal of Statistics 51(1): 102–111 . Van Eetvelde et al. [2023] Van Eetvelde, H., L.M. Hvattum, and C. Ley. 2023. The probabilistic final standing calculator: a fair stochastic tool to handle abruptly stopped football seasons. AStA Advances in Statistical Analysis 107(1-2): 251–269 . Volossovitch and Debanne [2021] Volossovitch, A. and T. Debanne. 2021. Home advantage in handball. Home Advantage in Sport: Causes and the Effect on Performance: 220–227 . Pelechrinis, K. and W. Winston. 2021. A Skellam regression model for quantifying positional value in soccer. Journal of Quantitative Analysis in Sports 17(3): 187–201 . Prieto et al. [2016] Prieto, J., M.Á. Gómez, A. Volossovitch, and J. Sampaio. 2016. Effects of team timeouts on the teams’ scoring performance in elite handball close games. Kinesiology 48(1.): 115–123 . Singh et al. [2023] Singh, A., P. Scarf, and R. Baker. 2023. A unified theory for bivariate scores in possessive ball-sports: The case of handball. European Journal of Operational Research 304(3): 1099–1112 . Skellam [1946] Skellam, J. 1946. The frequency distribution of the difference between two Poisson variates belonging to different populations. Journal of the Royal Statistical Society. Series A 109(3): 296–296 . Smiatek and Heuer [2012] Smiatek, J. and A. Heuer. 2012. A statistical view on team handball results: home advantage, team fitness and prediction of match outcomes. arXiv preprint arXiv:1207.0700 . Tomy and Veena [2022] Tomy, L. and G. Veena. 2022. A retrospective study on Skellam and related distributions. Austrian Journal of Statistics 51(1): 102–111 . Van Eetvelde et al. [2023] Van Eetvelde, H., L.M. Hvattum, and C. Ley. 2023. The probabilistic final standing calculator: a fair stochastic tool to handle abruptly stopped football seasons. AStA Advances in Statistical Analysis 107(1-2): 251–269 . Volossovitch and Debanne [2021] Volossovitch, A. and T. Debanne. 2021. Home advantage in handball. Home Advantage in Sport: Causes and the Effect on Performance: 220–227 . Prieto, J., M.Á. Gómez, A. Volossovitch, and J. Sampaio. 2016. Effects of team timeouts on the teams’ scoring performance in elite handball close games. Kinesiology 48(1.): 115–123 . Singh et al. [2023] Singh, A., P. Scarf, and R. Baker. 2023. A unified theory for bivariate scores in possessive ball-sports: The case of handball. European Journal of Operational Research 304(3): 1099–1112 . Skellam [1946] Skellam, J. 1946. The frequency distribution of the difference between two Poisson variates belonging to different populations. Journal of the Royal Statistical Society. Series A 109(3): 296–296 . Smiatek and Heuer [2012] Smiatek, J. and A. Heuer. 2012. A statistical view on team handball results: home advantage, team fitness and prediction of match outcomes. arXiv preprint arXiv:1207.0700 . Tomy and Veena [2022] Tomy, L. and G. Veena. 2022. A retrospective study on Skellam and related distributions. Austrian Journal of Statistics 51(1): 102–111 . Van Eetvelde et al. [2023] Van Eetvelde, H., L.M. Hvattum, and C. Ley. 2023. The probabilistic final standing calculator: a fair stochastic tool to handle abruptly stopped football seasons. AStA Advances in Statistical Analysis 107(1-2): 251–269 . Volossovitch and Debanne [2021] Volossovitch, A. and T. Debanne. 2021. Home advantage in handball. Home Advantage in Sport: Causes and the Effect on Performance: 220–227 . Singh, A., P. Scarf, and R. Baker. 2023. A unified theory for bivariate scores in possessive ball-sports: The case of handball. European Journal of Operational Research 304(3): 1099–1112 . Skellam [1946] Skellam, J. 1946. The frequency distribution of the difference between two Poisson variates belonging to different populations. Journal of the Royal Statistical Society. Series A 109(3): 296–296 . Smiatek and Heuer [2012] Smiatek, J. and A. Heuer. 2012. A statistical view on team handball results: home advantage, team fitness and prediction of match outcomes. arXiv preprint arXiv:1207.0700 . Tomy and Veena [2022] Tomy, L. and G. Veena. 2022. A retrospective study on Skellam and related distributions. Austrian Journal of Statistics 51(1): 102–111 . Van Eetvelde et al. [2023] Van Eetvelde, H., L.M. Hvattum, and C. Ley. 2023. The probabilistic final standing calculator: a fair stochastic tool to handle abruptly stopped football seasons. AStA Advances in Statistical Analysis 107(1-2): 251–269 . Volossovitch and Debanne [2021] Volossovitch, A. and T. Debanne. 2021. Home advantage in handball. Home Advantage in Sport: Causes and the Effect on Performance: 220–227 . Skellam, J. 1946. The frequency distribution of the difference between two Poisson variates belonging to different populations. Journal of the Royal Statistical Society. Series A 109(3): 296–296 . Smiatek and Heuer [2012] Smiatek, J. and A. Heuer. 2012. A statistical view on team handball results: home advantage, team fitness and prediction of match outcomes. arXiv preprint arXiv:1207.0700 . Tomy and Veena [2022] Tomy, L. and G. Veena. 2022. A retrospective study on Skellam and related distributions. Austrian Journal of Statistics 51(1): 102–111 . Van Eetvelde et al. [2023] Van Eetvelde, H., L.M. Hvattum, and C. Ley. 2023. The probabilistic final standing calculator: a fair stochastic tool to handle abruptly stopped football seasons. AStA Advances in Statistical Analysis 107(1-2): 251–269 . Volossovitch and Debanne [2021] Volossovitch, A. and T. Debanne. 2021. Home advantage in handball. Home Advantage in Sport: Causes and the Effect on Performance: 220–227 . Smiatek, J. and A. Heuer. 2012. A statistical view on team handball results: home advantage, team fitness and prediction of match outcomes. arXiv preprint arXiv:1207.0700 . Tomy and Veena [2022] Tomy, L. and G. Veena. 2022. A retrospective study on Skellam and related distributions. Austrian Journal of Statistics 51(1): 102–111 . Van Eetvelde et al. [2023] Van Eetvelde, H., L.M. Hvattum, and C. Ley. 2023. The probabilistic final standing calculator: a fair stochastic tool to handle abruptly stopped football seasons. AStA Advances in Statistical Analysis 107(1-2): 251–269 . Volossovitch and Debanne [2021] Volossovitch, A. and T. Debanne. 2021. Home advantage in handball. Home Advantage in Sport: Causes and the Effect on Performance: 220–227 . Tomy, L. and G. Veena. 2022. A retrospective study on Skellam and related distributions. Austrian Journal of Statistics 51(1): 102–111 . Van Eetvelde et al. [2023] Van Eetvelde, H., L.M. Hvattum, and C. Ley. 2023. The probabilistic final standing calculator: a fair stochastic tool to handle abruptly stopped football seasons. AStA Advances in Statistical Analysis 107(1-2): 251–269 . Volossovitch and Debanne [2021] Volossovitch, A. and T. Debanne. 2021. Home advantage in handball. Home Advantage in Sport: Causes and the Effect on Performance: 220–227 . Van Eetvelde, H., L.M. Hvattum, and C. Ley. 2023. The probabilistic final standing calculator: a fair stochastic tool to handle abruptly stopped football seasons. AStA Advances in Statistical Analysis 107(1-2): 251–269 . Volossovitch and Debanne [2021] Volossovitch, A. and T. Debanne. 2021. Home advantage in handball. Home Advantage in Sport: Causes and the Effect on Performance: 220–227 . Volossovitch, A. and T. Debanne. 2021. Home advantage in handball. Home Advantage in Sport: Causes and the Effect on Performance: 220–227 .
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Prediction of the 2019 IHF World Men’s Handball Championship–a sparse Gaussian approximation model. Journal of Sports Analytics 6(3): 187–197 . Holmes and McHale [2024] Holmes, B. and I.G. McHale. 2024. Forecasting football match results using a player rating based model. International Journal of Forecasting 40(1): 302–312 . Irwin [1937] Irwin, J.O. 1937. The frequency distribution of the difference between two independent variates following the same Poisson distribution. Journal of the Royal Statistical Society 100(3): 415–416 . Jiang et al. [2014] Jiang, L., K. Mao, and R. Wu. 2014. A Skellam model to identify differential patterns of gene expression induced by environmental signals. BMC Genomics 15(1): 1–9 . Karlis and Mamode Khan [2023] Karlis, D. and N. Mamode Khan. 2023. Models for integer data. Annual Review of Statistics and its Application 10: 297–323 . Karlis and Ntzoufras [2006] Karlis, D. and I. Ntzoufras. 2006. Bayesian analysis of the differences of count data. 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Extending the Dixon and Coles model: an application to women’s football data. arXiv preprint arXiv:2307.02139 . Michels et al. [2023] Michels, R., M. Ötting, and R. Langrock. 2023. Bettors’ reaction to match dynamics: Evidence from in-game betting. European Journal of Operational Research 310(3): 1118–1127 . Ntzoufras et al. [2021] Ntzoufras, I., V. Palaskas, and S. Drikos. 2021. Bayesian models for prediction of the set-difference in volleyball. IMA Journal of Management Mathematics 32(4): 491–518 . Ötting et al. [2024] Ötting, M., R. Michels, R. Langrock, and C. Deutscher. 2024. Demand for live betting: An analysis using state-space models. Applied Stochastic Models in Business and Industry . Pelechrinis and Winston [2021] Pelechrinis, K. and W. Winston. 2021. A Skellam regression model for quantifying positional value in soccer. Journal of Quantitative Analysis in Sports 17(3): 187–201 . Prieto et al. [2016] Prieto, J., M.Á. Gómez, A. Volossovitch, and J. Sampaio. 2016. Effects of team timeouts on the teams’ scoring performance in elite handball close games. Kinesiology 48(1.): 115–123 . Singh et al. [2023] Singh, A., P. Scarf, and R. Baker. 2023. A unified theory for bivariate scores in possessive ball-sports: The case of handball. European Journal of Operational Research 304(3): 1099–1112 . Skellam [1946] Skellam, J. 1946. The frequency distribution of the difference between two Poisson variates belonging to different populations. Journal of the Royal Statistical Society. Series A 109(3): 296–296 . Smiatek and Heuer [2012] Smiatek, J. and A. Heuer. 2012. A statistical view on team handball results: home advantage, team fitness and prediction of match outcomes. arXiv preprint arXiv:1207.0700 . Tomy and Veena [2022] Tomy, L. and G. Veena. 2022. A retrospective study on Skellam and related distributions. Austrian Journal of Statistics 51(1): 102–111 . Van Eetvelde et al. [2023] Van Eetvelde, H., L.M. Hvattum, and C. Ley. 2023. The probabilistic final standing calculator: a fair stochastic tool to handle abruptly stopped football seasons. AStA Advances in Statistical Analysis 107(1-2): 251–269 . Volossovitch and Debanne [2021] Volossovitch, A. and T. Debanne. 2021. Home advantage in handball. Home Advantage in Sport: Causes and the Effect on Performance: 220–227 . Dixon, M.J. and S.G. Coles. 1997. Modelling association football scores and inefficiencies in the football betting market. Journal of the Royal Statistical Society: Series C (Applied Statistics) 46(2): 265–280 . Dumangane et al. [2009] Dumangane, M., N. Rosati, and A. Volossovitch. 2009. Departure from independence and stationarity in a handball match. Journal of Applied Statistics 36(7): 723–741 . Felice [2023] Felice, F. 2023. Ranking handball teams from statistical strength estimation. arXiv preprint arXiv:2307.06754 . Felice and Ley [2023] Felice, F. and C. Ley. 2023. Prediction of handball matches with statistically enhanced learning via estimated team strengths. arXiv preprint arXiv:2307.11777 . Groll et al. [2020] Groll, A., J. Heiner, G. Schauberger, and J. Uhrmeister. 2020. Prediction of the 2019 IHF World Men’s Handball Championship–a sparse Gaussian approximation model. Journal of Sports Analytics 6(3): 187–197 . Holmes and McHale [2024] Holmes, B. and I.G. McHale. 2024. Forecasting football match results using a player rating based model. International Journal of Forecasting 40(1): 302–312 . Irwin [1937] Irwin, J.O. 1937. The frequency distribution of the difference between two independent variates following the same Poisson distribution. Journal of the Royal Statistical Society 100(3): 415–416 . Jiang et al. [2014] Jiang, L., K. Mao, and R. Wu. 2014. A Skellam model to identify differential patterns of gene expression induced by environmental signals. BMC Genomics 15(1): 1–9 . Karlis and Mamode Khan [2023] Karlis, D. and N. Mamode Khan. 2023. Models for integer data. Annual Review of Statistics and its Application 10: 297–323 . Karlis and Ntzoufras [2006] Karlis, D. and I. Ntzoufras. 2006. Bayesian analysis of the differences of count data. Statistics in Medicine 25(11): 1885–1905 . Koopman et al. [2017] Koopman, S.J., R. Lit, and A. Lucas. 2017. Intraday stochastic volatility in discrete price changes: the dynamic Skellam model. Journal of the American Statistical Association 112(520): 1490–1503 . Lago-Peñas et al. [2013] Lago-Peñas, C., M.A. Gomez, J. Viaño, and I. González-García. 2013. Home advantage in elite handball: the impact of the quality of opposition on team performance. International Journal of Performance Analysis in Sport 13(3): 724–733 . Maher [1982] Maher, M.J. 1982. Modelling association football scores. Statistica Neerlandica 36(3): 109–118 . McHale and Scarf [2007] McHale, I. and P. Scarf. 2007. Modelling soccer matches using bivariate discrete distributions with general dependence structure. Statistica Neerlandica 61(4): 432–445 . Michels et al. [2023] Michels, R., M. Ötting, and D. Karlis. 2023. Extending the Dixon and Coles model: an application to women’s football data. arXiv preprint arXiv:2307.02139 . Michels et al. [2023] Michels, R., M. Ötting, and R. Langrock. 2023. Bettors’ reaction to match dynamics: Evidence from in-game betting. European Journal of Operational Research 310(3): 1118–1127 . Ntzoufras et al. [2021] Ntzoufras, I., V. Palaskas, and S. Drikos. 2021. Bayesian models for prediction of the set-difference in volleyball. IMA Journal of Management Mathematics 32(4): 491–518 . Ötting et al. [2024] Ötting, M., R. Michels, R. Langrock, and C. Deutscher. 2024. Demand for live betting: An analysis using state-space models. Applied Stochastic Models in Business and Industry . Pelechrinis and Winston [2021] Pelechrinis, K. and W. Winston. 2021. A Skellam regression model for quantifying positional value in soccer. Journal of Quantitative Analysis in Sports 17(3): 187–201 . Prieto et al. [2016] Prieto, J., M.Á. Gómez, A. Volossovitch, and J. Sampaio. 2016. Effects of team timeouts on the teams’ scoring performance in elite handball close games. Kinesiology 48(1.): 115–123 . Singh et al. [2023] Singh, A., P. Scarf, and R. Baker. 2023. A unified theory for bivariate scores in possessive ball-sports: The case of handball. European Journal of Operational Research 304(3): 1099–1112 . Skellam [1946] Skellam, J. 1946. The frequency distribution of the difference between two Poisson variates belonging to different populations. Journal of the Royal Statistical Society. Series A 109(3): 296–296 . Smiatek and Heuer [2012] Smiatek, J. and A. Heuer. 2012. A statistical view on team handball results: home advantage, team fitness and prediction of match outcomes. arXiv preprint arXiv:1207.0700 . Tomy and Veena [2022] Tomy, L. and G. Veena. 2022. A retrospective study on Skellam and related distributions. Austrian Journal of Statistics 51(1): 102–111 . Van Eetvelde et al. [2023] Van Eetvelde, H., L.M. Hvattum, and C. Ley. 2023. The probabilistic final standing calculator: a fair stochastic tool to handle abruptly stopped football seasons. AStA Advances in Statistical Analysis 107(1-2): 251–269 . Volossovitch and Debanne [2021] Volossovitch, A. and T. Debanne. 2021. Home advantage in handball. Home Advantage in Sport: Causes and the Effect on Performance: 220–227 . Dumangane, M., N. Rosati, and A. Volossovitch. 2009. Departure from independence and stationarity in a handball match. Journal of Applied Statistics 36(7): 723–741 . Felice [2023] Felice, F. 2023. Ranking handball teams from statistical strength estimation. arXiv preprint arXiv:2307.06754 . Felice and Ley [2023] Felice, F. and C. Ley. 2023. Prediction of handball matches with statistically enhanced learning via estimated team strengths. arXiv preprint arXiv:2307.11777 . Groll et al. [2020] Groll, A., J. Heiner, G. Schauberger, and J. Uhrmeister. 2020. Prediction of the 2019 IHF World Men’s Handball Championship–a sparse Gaussian approximation model. Journal of Sports Analytics 6(3): 187–197 . Holmes and McHale [2024] Holmes, B. and I.G. McHale. 2024. Forecasting football match results using a player rating based model. International Journal of Forecasting 40(1): 302–312 . Irwin [1937] Irwin, J.O. 1937. The frequency distribution of the difference between two independent variates following the same Poisson distribution. Journal of the Royal Statistical Society 100(3): 415–416 . Jiang et al. [2014] Jiang, L., K. Mao, and R. Wu. 2014. A Skellam model to identify differential patterns of gene expression induced by environmental signals. BMC Genomics 15(1): 1–9 . Karlis and Mamode Khan [2023] Karlis, D. and N. Mamode Khan. 2023. Models for integer data. Annual Review of Statistics and its Application 10: 297–323 . Karlis and Ntzoufras [2006] Karlis, D. and I. Ntzoufras. 2006. Bayesian analysis of the differences of count data. Statistics in Medicine 25(11): 1885–1905 . Koopman et al. [2017] Koopman, S.J., R. Lit, and A. Lucas. 2017. Intraday stochastic volatility in discrete price changes: the dynamic Skellam model. Journal of the American Statistical Association 112(520): 1490–1503 . Lago-Peñas et al. [2013] Lago-Peñas, C., M.A. Gomez, J. Viaño, and I. González-García. 2013. Home advantage in elite handball: the impact of the quality of opposition on team performance. International Journal of Performance Analysis in Sport 13(3): 724–733 . Maher [1982] Maher, M.J. 1982. Modelling association football scores. Statistica Neerlandica 36(3): 109–118 . McHale and Scarf [2007] McHale, I. and P. Scarf. 2007. Modelling soccer matches using bivariate discrete distributions with general dependence structure. Statistica Neerlandica 61(4): 432–445 . Michels et al. [2023] Michels, R., M. Ötting, and D. Karlis. 2023. Extending the Dixon and Coles model: an application to women’s football data. arXiv preprint arXiv:2307.02139 . Michels et al. [2023] Michels, R., M. Ötting, and R. Langrock. 2023. Bettors’ reaction to match dynamics: Evidence from in-game betting. European Journal of Operational Research 310(3): 1118–1127 . Ntzoufras et al. [2021] Ntzoufras, I., V. Palaskas, and S. Drikos. 2021. Bayesian models for prediction of the set-difference in volleyball. IMA Journal of Management Mathematics 32(4): 491–518 . Ötting et al. [2024] Ötting, M., R. Michels, R. Langrock, and C. Deutscher. 2024. Demand for live betting: An analysis using state-space models. Applied Stochastic Models in Business and Industry . Pelechrinis and Winston [2021] Pelechrinis, K. and W. Winston. 2021. A Skellam regression model for quantifying positional value in soccer. Journal of Quantitative Analysis in Sports 17(3): 187–201 . Prieto et al. [2016] Prieto, J., M.Á. Gómez, A. Volossovitch, and J. Sampaio. 2016. Effects of team timeouts on the teams’ scoring performance in elite handball close games. Kinesiology 48(1.): 115–123 . Singh et al. [2023] Singh, A., P. Scarf, and R. Baker. 2023. A unified theory for bivariate scores in possessive ball-sports: The case of handball. European Journal of Operational Research 304(3): 1099–1112 . Skellam [1946] Skellam, J. 1946. The frequency distribution of the difference between two Poisson variates belonging to different populations. Journal of the Royal Statistical Society. Series A 109(3): 296–296 . Smiatek and Heuer [2012] Smiatek, J. and A. Heuer. 2012. A statistical view on team handball results: home advantage, team fitness and prediction of match outcomes. arXiv preprint arXiv:1207.0700 . Tomy and Veena [2022] Tomy, L. and G. Veena. 2022. A retrospective study on Skellam and related distributions. Austrian Journal of Statistics 51(1): 102–111 . Van Eetvelde et al. [2023] Van Eetvelde, H., L.M. Hvattum, and C. Ley. 2023. The probabilistic final standing calculator: a fair stochastic tool to handle abruptly stopped football seasons. AStA Advances in Statistical Analysis 107(1-2): 251–269 . Volossovitch and Debanne [2021] Volossovitch, A. and T. Debanne. 2021. Home advantage in handball. Home Advantage in Sport: Causes and the Effect on Performance: 220–227 . Felice, F. 2023. Ranking handball teams from statistical strength estimation. arXiv preprint arXiv:2307.06754 . Felice and Ley [2023] Felice, F. and C. Ley. 2023. Prediction of handball matches with statistically enhanced learning via estimated team strengths. arXiv preprint arXiv:2307.11777 . Groll et al. [2020] Groll, A., J. Heiner, G. Schauberger, and J. Uhrmeister. 2020. Prediction of the 2019 IHF World Men’s Handball Championship–a sparse Gaussian approximation model. Journal of Sports Analytics 6(3): 187–197 . Holmes and McHale [2024] Holmes, B. and I.G. McHale. 2024. Forecasting football match results using a player rating based model. International Journal of Forecasting 40(1): 302–312 . Irwin [1937] Irwin, J.O. 1937. The frequency distribution of the difference between two independent variates following the same Poisson distribution. Journal of the Royal Statistical Society 100(3): 415–416 . Jiang et al. [2014] Jiang, L., K. Mao, and R. Wu. 2014. A Skellam model to identify differential patterns of gene expression induced by environmental signals. BMC Genomics 15(1): 1–9 . Karlis and Mamode Khan [2023] Karlis, D. and N. Mamode Khan. 2023. Models for integer data. Annual Review of Statistics and its Application 10: 297–323 . Karlis and Ntzoufras [2006] Karlis, D. and I. Ntzoufras. 2006. Bayesian analysis of the differences of count data. Statistics in Medicine 25(11): 1885–1905 . Koopman et al. [2017] Koopman, S.J., R. Lit, and A. Lucas. 2017. Intraday stochastic volatility in discrete price changes: the dynamic Skellam model. Journal of the American Statistical Association 112(520): 1490–1503 . Lago-Peñas et al. [2013] Lago-Peñas, C., M.A. Gomez, J. Viaño, and I. González-García. 2013. Home advantage in elite handball: the impact of the quality of opposition on team performance. International Journal of Performance Analysis in Sport 13(3): 724–733 . Maher [1982] Maher, M.J. 1982. Modelling association football scores. Statistica Neerlandica 36(3): 109–118 . McHale and Scarf [2007] McHale, I. and P. Scarf. 2007. Modelling soccer matches using bivariate discrete distributions with general dependence structure. Statistica Neerlandica 61(4): 432–445 . Michels et al. [2023] Michels, R., M. Ötting, and D. Karlis. 2023. Extending the Dixon and Coles model: an application to women’s football data. arXiv preprint arXiv:2307.02139 . Michels et al. [2023] Michels, R., M. Ötting, and R. Langrock. 2023. Bettors’ reaction to match dynamics: Evidence from in-game betting. European Journal of Operational Research 310(3): 1118–1127 . Ntzoufras et al. [2021] Ntzoufras, I., V. Palaskas, and S. Drikos. 2021. Bayesian models for prediction of the set-difference in volleyball. IMA Journal of Management Mathematics 32(4): 491–518 . Ötting et al. [2024] Ötting, M., R. Michels, R. Langrock, and C. Deutscher. 2024. Demand for live betting: An analysis using state-space models. Applied Stochastic Models in Business and Industry . Pelechrinis and Winston [2021] Pelechrinis, K. and W. Winston. 2021. A Skellam regression model for quantifying positional value in soccer. Journal of Quantitative Analysis in Sports 17(3): 187–201 . Prieto et al. [2016] Prieto, J., M.Á. Gómez, A. Volossovitch, and J. Sampaio. 2016. Effects of team timeouts on the teams’ scoring performance in elite handball close games. Kinesiology 48(1.): 115–123 . Singh et al. [2023] Singh, A., P. Scarf, and R. Baker. 2023. A unified theory for bivariate scores in possessive ball-sports: The case of handball. European Journal of Operational Research 304(3): 1099–1112 . Skellam [1946] Skellam, J. 1946. The frequency distribution of the difference between two Poisson variates belonging to different populations. Journal of the Royal Statistical Society. Series A 109(3): 296–296 . Smiatek and Heuer [2012] Smiatek, J. and A. Heuer. 2012. A statistical view on team handball results: home advantage, team fitness and prediction of match outcomes. arXiv preprint arXiv:1207.0700 . Tomy and Veena [2022] Tomy, L. and G. Veena. 2022. A retrospective study on Skellam and related distributions. Austrian Journal of Statistics 51(1): 102–111 . Van Eetvelde et al. [2023] Van Eetvelde, H., L.M. Hvattum, and C. Ley. 2023. The probabilistic final standing calculator: a fair stochastic tool to handle abruptly stopped football seasons. AStA Advances in Statistical Analysis 107(1-2): 251–269 . Volossovitch and Debanne [2021] Volossovitch, A. and T. Debanne. 2021. Home advantage in handball. Home Advantage in Sport: Causes and the Effect on Performance: 220–227 . Felice, F. and C. Ley. 2023. Prediction of handball matches with statistically enhanced learning via estimated team strengths. arXiv preprint arXiv:2307.11777 . Groll et al. [2020] Groll, A., J. Heiner, G. Schauberger, and J. Uhrmeister. 2020. Prediction of the 2019 IHF World Men’s Handball Championship–a sparse Gaussian approximation model. Journal of Sports Analytics 6(3): 187–197 . Holmes and McHale [2024] Holmes, B. and I.G. McHale. 2024. Forecasting football match results using a player rating based model. International Journal of Forecasting 40(1): 302–312 . Irwin [1937] Irwin, J.O. 1937. The frequency distribution of the difference between two independent variates following the same Poisson distribution. Journal of the Royal Statistical Society 100(3): 415–416 . Jiang et al. [2014] Jiang, L., K. Mao, and R. Wu. 2014. A Skellam model to identify differential patterns of gene expression induced by environmental signals. BMC Genomics 15(1): 1–9 . Karlis and Mamode Khan [2023] Karlis, D. and N. Mamode Khan. 2023. Models for integer data. Annual Review of Statistics and its Application 10: 297–323 . Karlis and Ntzoufras [2006] Karlis, D. and I. Ntzoufras. 2006. Bayesian analysis of the differences of count data. Statistics in Medicine 25(11): 1885–1905 . Koopman et al. [2017] Koopman, S.J., R. Lit, and A. Lucas. 2017. Intraday stochastic volatility in discrete price changes: the dynamic Skellam model. Journal of the American Statistical Association 112(520): 1490–1503 . Lago-Peñas et al. [2013] Lago-Peñas, C., M.A. Gomez, J. Viaño, and I. González-García. 2013. Home advantage in elite handball: the impact of the quality of opposition on team performance. International Journal of Performance Analysis in Sport 13(3): 724–733 . Maher [1982] Maher, M.J. 1982. Modelling association football scores. Statistica Neerlandica 36(3): 109–118 . McHale and Scarf [2007] McHale, I. and P. Scarf. 2007. Modelling soccer matches using bivariate discrete distributions with general dependence structure. Statistica Neerlandica 61(4): 432–445 . Michels et al. [2023] Michels, R., M. Ötting, and D. Karlis. 2023. Extending the Dixon and Coles model: an application to women’s football data. arXiv preprint arXiv:2307.02139 . Michels et al. [2023] Michels, R., M. Ötting, and R. Langrock. 2023. Bettors’ reaction to match dynamics: Evidence from in-game betting. European Journal of Operational Research 310(3): 1118–1127 . Ntzoufras et al. [2021] Ntzoufras, I., V. Palaskas, and S. Drikos. 2021. Bayesian models for prediction of the set-difference in volleyball. IMA Journal of Management Mathematics 32(4): 491–518 . Ötting et al. [2024] Ötting, M., R. Michels, R. Langrock, and C. Deutscher. 2024. Demand for live betting: An analysis using state-space models. Applied Stochastic Models in Business and Industry . Pelechrinis and Winston [2021] Pelechrinis, K. and W. Winston. 2021. A Skellam regression model for quantifying positional value in soccer. Journal of Quantitative Analysis in Sports 17(3): 187–201 . Prieto et al. [2016] Prieto, J., M.Á. Gómez, A. Volossovitch, and J. Sampaio. 2016. Effects of team timeouts on the teams’ scoring performance in elite handball close games. Kinesiology 48(1.): 115–123 . Singh et al. [2023] Singh, A., P. Scarf, and R. Baker. 2023. A unified theory for bivariate scores in possessive ball-sports: The case of handball. European Journal of Operational Research 304(3): 1099–1112 . Skellam [1946] Skellam, J. 1946. The frequency distribution of the difference between two Poisson variates belonging to different populations. Journal of the Royal Statistical Society. Series A 109(3): 296–296 . Smiatek and Heuer [2012] Smiatek, J. and A. Heuer. 2012. A statistical view on team handball results: home advantage, team fitness and prediction of match outcomes. arXiv preprint arXiv:1207.0700 . Tomy and Veena [2022] Tomy, L. and G. Veena. 2022. A retrospective study on Skellam and related distributions. Austrian Journal of Statistics 51(1): 102–111 . Van Eetvelde et al. [2023] Van Eetvelde, H., L.M. Hvattum, and C. Ley. 2023. The probabilistic final standing calculator: a fair stochastic tool to handle abruptly stopped football seasons. AStA Advances in Statistical Analysis 107(1-2): 251–269 . Volossovitch and Debanne [2021] Volossovitch, A. and T. Debanne. 2021. Home advantage in handball. Home Advantage in Sport: Causes and the Effect on Performance: 220–227 . Groll, A., J. Heiner, G. Schauberger, and J. Uhrmeister. 2020. Prediction of the 2019 IHF World Men’s Handball Championship–a sparse Gaussian approximation model. Journal of Sports Analytics 6(3): 187–197 . Holmes and McHale [2024] Holmes, B. and I.G. McHale. 2024. Forecasting football match results using a player rating based model. International Journal of Forecasting 40(1): 302–312 . Irwin [1937] Irwin, J.O. 1937. The frequency distribution of the difference between two independent variates following the same Poisson distribution. Journal of the Royal Statistical Society 100(3): 415–416 . Jiang et al. [2014] Jiang, L., K. Mao, and R. Wu. 2014. A Skellam model to identify differential patterns of gene expression induced by environmental signals. BMC Genomics 15(1): 1–9 . Karlis and Mamode Khan [2023] Karlis, D. and N. Mamode Khan. 2023. Models for integer data. Annual Review of Statistics and its Application 10: 297–323 . Karlis and Ntzoufras [2006] Karlis, D. and I. Ntzoufras. 2006. Bayesian analysis of the differences of count data. Statistics in Medicine 25(11): 1885–1905 . Koopman et al. [2017] Koopman, S.J., R. Lit, and A. Lucas. 2017. Intraday stochastic volatility in discrete price changes: the dynamic Skellam model. Journal of the American Statistical Association 112(520): 1490–1503 . Lago-Peñas et al. [2013] Lago-Peñas, C., M.A. Gomez, J. Viaño, and I. González-García. 2013. Home advantage in elite handball: the impact of the quality of opposition on team performance. International Journal of Performance Analysis in Sport 13(3): 724–733 . Maher [1982] Maher, M.J. 1982. Modelling association football scores. Statistica Neerlandica 36(3): 109–118 . McHale and Scarf [2007] McHale, I. and P. Scarf. 2007. Modelling soccer matches using bivariate discrete distributions with general dependence structure. Statistica Neerlandica 61(4): 432–445 . Michels et al. [2023] Michels, R., M. Ötting, and D. Karlis. 2023. Extending the Dixon and Coles model: an application to women’s football data. arXiv preprint arXiv:2307.02139 . Michels et al. [2023] Michels, R., M. Ötting, and R. Langrock. 2023. Bettors’ reaction to match dynamics: Evidence from in-game betting. European Journal of Operational Research 310(3): 1118–1127 . Ntzoufras et al. [2021] Ntzoufras, I., V. Palaskas, and S. Drikos. 2021. Bayesian models for prediction of the set-difference in volleyball. IMA Journal of Management Mathematics 32(4): 491–518 . Ötting et al. [2024] Ötting, M., R. Michels, R. Langrock, and C. Deutscher. 2024. Demand for live betting: An analysis using state-space models. Applied Stochastic Models in Business and Industry . Pelechrinis and Winston [2021] Pelechrinis, K. and W. Winston. 2021. A Skellam regression model for quantifying positional value in soccer. Journal of Quantitative Analysis in Sports 17(3): 187–201 . Prieto et al. [2016] Prieto, J., M.Á. Gómez, A. Volossovitch, and J. Sampaio. 2016. Effects of team timeouts on the teams’ scoring performance in elite handball close games. Kinesiology 48(1.): 115–123 . Singh et al. [2023] Singh, A., P. Scarf, and R. Baker. 2023. A unified theory for bivariate scores in possessive ball-sports: The case of handball. European Journal of Operational Research 304(3): 1099–1112 . Skellam [1946] Skellam, J. 1946. The frequency distribution of the difference between two Poisson variates belonging to different populations. Journal of the Royal Statistical Society. Series A 109(3): 296–296 . Smiatek and Heuer [2012] Smiatek, J. and A. Heuer. 2012. A statistical view on team handball results: home advantage, team fitness and prediction of match outcomes. arXiv preprint arXiv:1207.0700 . Tomy and Veena [2022] Tomy, L. and G. Veena. 2022. A retrospective study on Skellam and related distributions. Austrian Journal of Statistics 51(1): 102–111 . Van Eetvelde et al. [2023] Van Eetvelde, H., L.M. Hvattum, and C. Ley. 2023. The probabilistic final standing calculator: a fair stochastic tool to handle abruptly stopped football seasons. AStA Advances in Statistical Analysis 107(1-2): 251–269 . Volossovitch and Debanne [2021] Volossovitch, A. and T. Debanne. 2021. Home advantage in handball. Home Advantage in Sport: Causes and the Effect on Performance: 220–227 . Holmes, B. and I.G. McHale. 2024. Forecasting football match results using a player rating based model. International Journal of Forecasting 40(1): 302–312 . Irwin [1937] Irwin, J.O. 1937. The frequency distribution of the difference between two independent variates following the same Poisson distribution. Journal of the Royal Statistical Society 100(3): 415–416 . Jiang et al. [2014] Jiang, L., K. Mao, and R. Wu. 2014. A Skellam model to identify differential patterns of gene expression induced by environmental signals. BMC Genomics 15(1): 1–9 . Karlis and Mamode Khan [2023] Karlis, D. and N. Mamode Khan. 2023. Models for integer data. Annual Review of Statistics and its Application 10: 297–323 . Karlis and Ntzoufras [2006] Karlis, D. and I. Ntzoufras. 2006. Bayesian analysis of the differences of count data. Statistics in Medicine 25(11): 1885–1905 . Koopman et al. [2017] Koopman, S.J., R. Lit, and A. Lucas. 2017. Intraday stochastic volatility in discrete price changes: the dynamic Skellam model. Journal of the American Statistical Association 112(520): 1490–1503 . Lago-Peñas et al. [2013] Lago-Peñas, C., M.A. Gomez, J. Viaño, and I. González-García. 2013. Home advantage in elite handball: the impact of the quality of opposition on team performance. International Journal of Performance Analysis in Sport 13(3): 724–733 . Maher [1982] Maher, M.J. 1982. Modelling association football scores. Statistica Neerlandica 36(3): 109–118 . McHale and Scarf [2007] McHale, I. and P. Scarf. 2007. Modelling soccer matches using bivariate discrete distributions with general dependence structure. Statistica Neerlandica 61(4): 432–445 . Michels et al. [2023] Michels, R., M. Ötting, and D. Karlis. 2023. Extending the Dixon and Coles model: an application to women’s football data. arXiv preprint arXiv:2307.02139 . Michels et al. [2023] Michels, R., M. Ötting, and R. Langrock. 2023. Bettors’ reaction to match dynamics: Evidence from in-game betting. European Journal of Operational Research 310(3): 1118–1127 . Ntzoufras et al. [2021] Ntzoufras, I., V. Palaskas, and S. Drikos. 2021. Bayesian models for prediction of the set-difference in volleyball. IMA Journal of Management Mathematics 32(4): 491–518 . Ötting et al. [2024] Ötting, M., R. Michels, R. Langrock, and C. Deutscher. 2024. Demand for live betting: An analysis using state-space models. Applied Stochastic Models in Business and Industry . Pelechrinis and Winston [2021] Pelechrinis, K. and W. Winston. 2021. A Skellam regression model for quantifying positional value in soccer. Journal of Quantitative Analysis in Sports 17(3): 187–201 . Prieto et al. [2016] Prieto, J., M.Á. Gómez, A. Volossovitch, and J. Sampaio. 2016. Effects of team timeouts on the teams’ scoring performance in elite handball close games. Kinesiology 48(1.): 115–123 . Singh et al. [2023] Singh, A., P. Scarf, and R. Baker. 2023. A unified theory for bivariate scores in possessive ball-sports: The case of handball. European Journal of Operational Research 304(3): 1099–1112 . Skellam [1946] Skellam, J. 1946. The frequency distribution of the difference between two Poisson variates belonging to different populations. Journal of the Royal Statistical Society. Series A 109(3): 296–296 . Smiatek and Heuer [2012] Smiatek, J. and A. Heuer. 2012. A statistical view on team handball results: home advantage, team fitness and prediction of match outcomes. arXiv preprint arXiv:1207.0700 . Tomy and Veena [2022] Tomy, L. and G. Veena. 2022. A retrospective study on Skellam and related distributions. Austrian Journal of Statistics 51(1): 102–111 . Van Eetvelde et al. [2023] Van Eetvelde, H., L.M. Hvattum, and C. Ley. 2023. The probabilistic final standing calculator: a fair stochastic tool to handle abruptly stopped football seasons. AStA Advances in Statistical Analysis 107(1-2): 251–269 . Volossovitch and Debanne [2021] Volossovitch, A. and T. Debanne. 2021. Home advantage in handball. Home Advantage in Sport: Causes and the Effect on Performance: 220–227 . Irwin, J.O. 1937. The frequency distribution of the difference between two independent variates following the same Poisson distribution. Journal of the Royal Statistical Society 100(3): 415–416 . Jiang et al. [2014] Jiang, L., K. Mao, and R. Wu. 2014. A Skellam model to identify differential patterns of gene expression induced by environmental signals. BMC Genomics 15(1): 1–9 . Karlis and Mamode Khan [2023] Karlis, D. and N. Mamode Khan. 2023. Models for integer data. Annual Review of Statistics and its Application 10: 297–323 . Karlis and Ntzoufras [2006] Karlis, D. and I. Ntzoufras. 2006. Bayesian analysis of the differences of count data. Statistics in Medicine 25(11): 1885–1905 . Koopman et al. [2017] Koopman, S.J., R. Lit, and A. Lucas. 2017. Intraday stochastic volatility in discrete price changes: the dynamic Skellam model. Journal of the American Statistical Association 112(520): 1490–1503 . Lago-Peñas et al. [2013] Lago-Peñas, C., M.A. Gomez, J. Viaño, and I. González-García. 2013. Home advantage in elite handball: the impact of the quality of opposition on team performance. International Journal of Performance Analysis in Sport 13(3): 724–733 . Maher [1982] Maher, M.J. 1982. Modelling association football scores. Statistica Neerlandica 36(3): 109–118 . McHale and Scarf [2007] McHale, I. and P. Scarf. 2007. Modelling soccer matches using bivariate discrete distributions with general dependence structure. Statistica Neerlandica 61(4): 432–445 . Michels et al. [2023] Michels, R., M. Ötting, and D. Karlis. 2023. Extending the Dixon and Coles model: an application to women’s football data. arXiv preprint arXiv:2307.02139 . Michels et al. [2023] Michels, R., M. Ötting, and R. Langrock. 2023. Bettors’ reaction to match dynamics: Evidence from in-game betting. European Journal of Operational Research 310(3): 1118–1127 . Ntzoufras et al. [2021] Ntzoufras, I., V. Palaskas, and S. Drikos. 2021. Bayesian models for prediction of the set-difference in volleyball. IMA Journal of Management Mathematics 32(4): 491–518 . Ötting et al. [2024] Ötting, M., R. Michels, R. Langrock, and C. Deutscher. 2024. Demand for live betting: An analysis using state-space models. Applied Stochastic Models in Business and Industry . Pelechrinis and Winston [2021] Pelechrinis, K. and W. Winston. 2021. A Skellam regression model for quantifying positional value in soccer. Journal of Quantitative Analysis in Sports 17(3): 187–201 . Prieto et al. [2016] Prieto, J., M.Á. Gómez, A. Volossovitch, and J. Sampaio. 2016. Effects of team timeouts on the teams’ scoring performance in elite handball close games. Kinesiology 48(1.): 115–123 . Singh et al. [2023] Singh, A., P. Scarf, and R. Baker. 2023. A unified theory for bivariate scores in possessive ball-sports: The case of handball. European Journal of Operational Research 304(3): 1099–1112 . Skellam [1946] Skellam, J. 1946. The frequency distribution of the difference between two Poisson variates belonging to different populations. Journal of the Royal Statistical Society. Series A 109(3): 296–296 . Smiatek and Heuer [2012] Smiatek, J. and A. Heuer. 2012. A statistical view on team handball results: home advantage, team fitness and prediction of match outcomes. arXiv preprint arXiv:1207.0700 . Tomy and Veena [2022] Tomy, L. and G. Veena. 2022. A retrospective study on Skellam and related distributions. Austrian Journal of Statistics 51(1): 102–111 . Van Eetvelde et al. [2023] Van Eetvelde, H., L.M. Hvattum, and C. Ley. 2023. The probabilistic final standing calculator: a fair stochastic tool to handle abruptly stopped football seasons. AStA Advances in Statistical Analysis 107(1-2): 251–269 . Volossovitch and Debanne [2021] Volossovitch, A. and T. Debanne. 2021. Home advantage in handball. Home Advantage in Sport: Causes and the Effect on Performance: 220–227 . Jiang, L., K. Mao, and R. Wu. 2014. A Skellam model to identify differential patterns of gene expression induced by environmental signals. BMC Genomics 15(1): 1–9 . Karlis and Mamode Khan [2023] Karlis, D. and N. Mamode Khan. 2023. Models for integer data. Annual Review of Statistics and its Application 10: 297–323 . Karlis and Ntzoufras [2006] Karlis, D. and I. Ntzoufras. 2006. Bayesian analysis of the differences of count data. Statistics in Medicine 25(11): 1885–1905 . Koopman et al. [2017] Koopman, S.J., R. Lit, and A. Lucas. 2017. Intraday stochastic volatility in discrete price changes: the dynamic Skellam model. Journal of the American Statistical Association 112(520): 1490–1503 . Lago-Peñas et al. [2013] Lago-Peñas, C., M.A. Gomez, J. Viaño, and I. González-García. 2013. Home advantage in elite handball: the impact of the quality of opposition on team performance. International Journal of Performance Analysis in Sport 13(3): 724–733 . Maher [1982] Maher, M.J. 1982. Modelling association football scores. Statistica Neerlandica 36(3): 109–118 . McHale and Scarf [2007] McHale, I. and P. Scarf. 2007. Modelling soccer matches using bivariate discrete distributions with general dependence structure. Statistica Neerlandica 61(4): 432–445 . Michels et al. [2023] Michels, R., M. Ötting, and D. Karlis. 2023. Extending the Dixon and Coles model: an application to women’s football data. arXiv preprint arXiv:2307.02139 . Michels et al. [2023] Michels, R., M. Ötting, and R. Langrock. 2023. Bettors’ reaction to match dynamics: Evidence from in-game betting. European Journal of Operational Research 310(3): 1118–1127 . Ntzoufras et al. [2021] Ntzoufras, I., V. Palaskas, and S. Drikos. 2021. Bayesian models for prediction of the set-difference in volleyball. IMA Journal of Management Mathematics 32(4): 491–518 . Ötting et al. [2024] Ötting, M., R. Michels, R. Langrock, and C. Deutscher. 2024. Demand for live betting: An analysis using state-space models. Applied Stochastic Models in Business and Industry . Pelechrinis and Winston [2021] Pelechrinis, K. and W. Winston. 2021. A Skellam regression model for quantifying positional value in soccer. Journal of Quantitative Analysis in Sports 17(3): 187–201 . Prieto et al. [2016] Prieto, J., M.Á. Gómez, A. Volossovitch, and J. Sampaio. 2016. Effects of team timeouts on the teams’ scoring performance in elite handball close games. Kinesiology 48(1.): 115–123 . Singh et al. [2023] Singh, A., P. Scarf, and R. Baker. 2023. A unified theory for bivariate scores in possessive ball-sports: The case of handball. European Journal of Operational Research 304(3): 1099–1112 . Skellam [1946] Skellam, J. 1946. The frequency distribution of the difference between two Poisson variates belonging to different populations. Journal of the Royal Statistical Society. Series A 109(3): 296–296 . Smiatek and Heuer [2012] Smiatek, J. and A. Heuer. 2012. A statistical view on team handball results: home advantage, team fitness and prediction of match outcomes. arXiv preprint arXiv:1207.0700 . Tomy and Veena [2022] Tomy, L. and G. Veena. 2022. A retrospective study on Skellam and related distributions. Austrian Journal of Statistics 51(1): 102–111 . Van Eetvelde et al. [2023] Van Eetvelde, H., L.M. Hvattum, and C. Ley. 2023. The probabilistic final standing calculator: a fair stochastic tool to handle abruptly stopped football seasons. AStA Advances in Statistical Analysis 107(1-2): 251–269 . Volossovitch and Debanne [2021] Volossovitch, A. and T. Debanne. 2021. Home advantage in handball. Home Advantage in Sport: Causes and the Effect on Performance: 220–227 . Karlis, D. and N. Mamode Khan. 2023. Models for integer data. Annual Review of Statistics and its Application 10: 297–323 . Karlis and Ntzoufras [2006] Karlis, D. and I. Ntzoufras. 2006. Bayesian analysis of the differences of count data. Statistics in Medicine 25(11): 1885–1905 . Koopman et al. [2017] Koopman, S.J., R. Lit, and A. Lucas. 2017. Intraday stochastic volatility in discrete price changes: the dynamic Skellam model. Journal of the American Statistical Association 112(520): 1490–1503 . Lago-Peñas et al. [2013] Lago-Peñas, C., M.A. Gomez, J. Viaño, and I. González-García. 2013. Home advantage in elite handball: the impact of the quality of opposition on team performance. International Journal of Performance Analysis in Sport 13(3): 724–733 . Maher [1982] Maher, M.J. 1982. Modelling association football scores. Statistica Neerlandica 36(3): 109–118 . McHale and Scarf [2007] McHale, I. and P. Scarf. 2007. Modelling soccer matches using bivariate discrete distributions with general dependence structure. Statistica Neerlandica 61(4): 432–445 . Michels et al. [2023] Michels, R., M. Ötting, and D. Karlis. 2023. Extending the Dixon and Coles model: an application to women’s football data. arXiv preprint arXiv:2307.02139 . Michels et al. [2023] Michels, R., M. Ötting, and R. Langrock. 2023. Bettors’ reaction to match dynamics: Evidence from in-game betting. European Journal of Operational Research 310(3): 1118–1127 . Ntzoufras et al. [2021] Ntzoufras, I., V. Palaskas, and S. Drikos. 2021. Bayesian models for prediction of the set-difference in volleyball. IMA Journal of Management Mathematics 32(4): 491–518 . Ötting et al. [2024] Ötting, M., R. Michels, R. Langrock, and C. Deutscher. 2024. Demand for live betting: An analysis using state-space models. Applied Stochastic Models in Business and Industry . Pelechrinis and Winston [2021] Pelechrinis, K. and W. Winston. 2021. A Skellam regression model for quantifying positional value in soccer. Journal of Quantitative Analysis in Sports 17(3): 187–201 . Prieto et al. [2016] Prieto, J., M.Á. Gómez, A. Volossovitch, and J. Sampaio. 2016. Effects of team timeouts on the teams’ scoring performance in elite handball close games. Kinesiology 48(1.): 115–123 . Singh et al. [2023] Singh, A., P. Scarf, and R. Baker. 2023. A unified theory for bivariate scores in possessive ball-sports: The case of handball. European Journal of Operational Research 304(3): 1099–1112 . Skellam [1946] Skellam, J. 1946. The frequency distribution of the difference between two Poisson variates belonging to different populations. Journal of the Royal Statistical Society. Series A 109(3): 296–296 . Smiatek and Heuer [2012] Smiatek, J. and A. Heuer. 2012. A statistical view on team handball results: home advantage, team fitness and prediction of match outcomes. arXiv preprint arXiv:1207.0700 . Tomy and Veena [2022] Tomy, L. and G. Veena. 2022. A retrospective study on Skellam and related distributions. Austrian Journal of Statistics 51(1): 102–111 . Van Eetvelde et al. [2023] Van Eetvelde, H., L.M. Hvattum, and C. Ley. 2023. The probabilistic final standing calculator: a fair stochastic tool to handle abruptly stopped football seasons. AStA Advances in Statistical Analysis 107(1-2): 251–269 . Volossovitch and Debanne [2021] Volossovitch, A. and T. Debanne. 2021. Home advantage in handball. Home Advantage in Sport: Causes and the Effect on Performance: 220–227 . Karlis, D. and I. Ntzoufras. 2006. Bayesian analysis of the differences of count data. Statistics in Medicine 25(11): 1885–1905 . Koopman et al. [2017] Koopman, S.J., R. Lit, and A. Lucas. 2017. Intraday stochastic volatility in discrete price changes: the dynamic Skellam model. Journal of the American Statistical Association 112(520): 1490–1503 . Lago-Peñas et al. [2013] Lago-Peñas, C., M.A. Gomez, J. Viaño, and I. González-García. 2013. Home advantage in elite handball: the impact of the quality of opposition on team performance. International Journal of Performance Analysis in Sport 13(3): 724–733 . Maher [1982] Maher, M.J. 1982. Modelling association football scores. Statistica Neerlandica 36(3): 109–118 . McHale and Scarf [2007] McHale, I. and P. Scarf. 2007. Modelling soccer matches using bivariate discrete distributions with general dependence structure. Statistica Neerlandica 61(4): 432–445 . Michels et al. [2023] Michels, R., M. Ötting, and D. Karlis. 2023. Extending the Dixon and Coles model: an application to women’s football data. arXiv preprint arXiv:2307.02139 . Michels et al. [2023] Michels, R., M. Ötting, and R. Langrock. 2023. Bettors’ reaction to match dynamics: Evidence from in-game betting. European Journal of Operational Research 310(3): 1118–1127 . Ntzoufras et al. [2021] Ntzoufras, I., V. Palaskas, and S. Drikos. 2021. Bayesian models for prediction of the set-difference in volleyball. IMA Journal of Management Mathematics 32(4): 491–518 . Ötting et al. [2024] Ötting, M., R. Michels, R. Langrock, and C. Deutscher. 2024. Demand for live betting: An analysis using state-space models. Applied Stochastic Models in Business and Industry . Pelechrinis and Winston [2021] Pelechrinis, K. and W. Winston. 2021. A Skellam regression model for quantifying positional value in soccer. Journal of Quantitative Analysis in Sports 17(3): 187–201 . Prieto et al. [2016] Prieto, J., M.Á. Gómez, A. Volossovitch, and J. Sampaio. 2016. Effects of team timeouts on the teams’ scoring performance in elite handball close games. Kinesiology 48(1.): 115–123 . Singh et al. [2023] Singh, A., P. Scarf, and R. Baker. 2023. A unified theory for bivariate scores in possessive ball-sports: The case of handball. European Journal of Operational Research 304(3): 1099–1112 . Skellam [1946] Skellam, J. 1946. The frequency distribution of the difference between two Poisson variates belonging to different populations. Journal of the Royal Statistical Society. Series A 109(3): 296–296 . Smiatek and Heuer [2012] Smiatek, J. and A. Heuer. 2012. A statistical view on team handball results: home advantage, team fitness and prediction of match outcomes. arXiv preprint arXiv:1207.0700 . Tomy and Veena [2022] Tomy, L. and G. Veena. 2022. A retrospective study on Skellam and related distributions. Austrian Journal of Statistics 51(1): 102–111 . Van Eetvelde et al. [2023] Van Eetvelde, H., L.M. Hvattum, and C. Ley. 2023. The probabilistic final standing calculator: a fair stochastic tool to handle abruptly stopped football seasons. AStA Advances in Statistical Analysis 107(1-2): 251–269 . Volossovitch and Debanne [2021] Volossovitch, A. and T. Debanne. 2021. Home advantage in handball. Home Advantage in Sport: Causes and the Effect on Performance: 220–227 . Koopman, S.J., R. Lit, and A. Lucas. 2017. Intraday stochastic volatility in discrete price changes: the dynamic Skellam model. Journal of the American Statistical Association 112(520): 1490–1503 . Lago-Peñas et al. [2013] Lago-Peñas, C., M.A. Gomez, J. Viaño, and I. González-García. 2013. Home advantage in elite handball: the impact of the quality of opposition on team performance. International Journal of Performance Analysis in Sport 13(3): 724–733 . Maher [1982] Maher, M.J. 1982. Modelling association football scores. Statistica Neerlandica 36(3): 109–118 . McHale and Scarf [2007] McHale, I. and P. Scarf. 2007. Modelling soccer matches using bivariate discrete distributions with general dependence structure. Statistica Neerlandica 61(4): 432–445 . Michels et al. [2023] Michels, R., M. Ötting, and D. Karlis. 2023. Extending the Dixon and Coles model: an application to women’s football data. arXiv preprint arXiv:2307.02139 . Michels et al. [2023] Michels, R., M. Ötting, and R. Langrock. 2023. Bettors’ reaction to match dynamics: Evidence from in-game betting. European Journal of Operational Research 310(3): 1118–1127 . Ntzoufras et al. [2021] Ntzoufras, I., V. Palaskas, and S. Drikos. 2021. Bayesian models for prediction of the set-difference in volleyball. IMA Journal of Management Mathematics 32(4): 491–518 . Ötting et al. [2024] Ötting, M., R. Michels, R. Langrock, and C. Deutscher. 2024. Demand for live betting: An analysis using state-space models. Applied Stochastic Models in Business and Industry . Pelechrinis and Winston [2021] Pelechrinis, K. and W. Winston. 2021. A Skellam regression model for quantifying positional value in soccer. Journal of Quantitative Analysis in Sports 17(3): 187–201 . Prieto et al. [2016] Prieto, J., M.Á. Gómez, A. Volossovitch, and J. Sampaio. 2016. Effects of team timeouts on the teams’ scoring performance in elite handball close games. Kinesiology 48(1.): 115–123 . Singh et al. [2023] Singh, A., P. Scarf, and R. Baker. 2023. A unified theory for bivariate scores in possessive ball-sports: The case of handball. European Journal of Operational Research 304(3): 1099–1112 . Skellam [1946] Skellam, J. 1946. The frequency distribution of the difference between two Poisson variates belonging to different populations. Journal of the Royal Statistical Society. Series A 109(3): 296–296 . Smiatek and Heuer [2012] Smiatek, J. and A. Heuer. 2012. A statistical view on team handball results: home advantage, team fitness and prediction of match outcomes. arXiv preprint arXiv:1207.0700 . Tomy and Veena [2022] Tomy, L. and G. Veena. 2022. A retrospective study on Skellam and related distributions. Austrian Journal of Statistics 51(1): 102–111 . Van Eetvelde et al. [2023] Van Eetvelde, H., L.M. Hvattum, and C. Ley. 2023. The probabilistic final standing calculator: a fair stochastic tool to handle abruptly stopped football seasons. AStA Advances in Statistical Analysis 107(1-2): 251–269 . Volossovitch and Debanne [2021] Volossovitch, A. and T. Debanne. 2021. Home advantage in handball. Home Advantage in Sport: Causes and the Effect on Performance: 220–227 . Lago-Peñas, C., M.A. Gomez, J. Viaño, and I. González-García. 2013. Home advantage in elite handball: the impact of the quality of opposition on team performance. International Journal of Performance Analysis in Sport 13(3): 724–733 . Maher [1982] Maher, M.J. 1982. Modelling association football scores. Statistica Neerlandica 36(3): 109–118 . McHale and Scarf [2007] McHale, I. and P. Scarf. 2007. Modelling soccer matches using bivariate discrete distributions with general dependence structure. Statistica Neerlandica 61(4): 432–445 . Michels et al. [2023] Michels, R., M. Ötting, and D. Karlis. 2023. Extending the Dixon and Coles model: an application to women’s football data. arXiv preprint arXiv:2307.02139 . Michels et al. [2023] Michels, R., M. Ötting, and R. Langrock. 2023. Bettors’ reaction to match dynamics: Evidence from in-game betting. European Journal of Operational Research 310(3): 1118–1127 . Ntzoufras et al. [2021] Ntzoufras, I., V. Palaskas, and S. Drikos. 2021. Bayesian models for prediction of the set-difference in volleyball. IMA Journal of Management Mathematics 32(4): 491–518 . Ötting et al. [2024] Ötting, M., R. Michels, R. Langrock, and C. Deutscher. 2024. Demand for live betting: An analysis using state-space models. Applied Stochastic Models in Business and Industry . Pelechrinis and Winston [2021] Pelechrinis, K. and W. Winston. 2021. A Skellam regression model for quantifying positional value in soccer. Journal of Quantitative Analysis in Sports 17(3): 187–201 . Prieto et al. [2016] Prieto, J., M.Á. Gómez, A. Volossovitch, and J. Sampaio. 2016. Effects of team timeouts on the teams’ scoring performance in elite handball close games. Kinesiology 48(1.): 115–123 . Singh et al. [2023] Singh, A., P. Scarf, and R. Baker. 2023. A unified theory for bivariate scores in possessive ball-sports: The case of handball. European Journal of Operational Research 304(3): 1099–1112 . Skellam [1946] Skellam, J. 1946. The frequency distribution of the difference between two Poisson variates belonging to different populations. Journal of the Royal Statistical Society. Series A 109(3): 296–296 . Smiatek and Heuer [2012] Smiatek, J. and A. Heuer. 2012. A statistical view on team handball results: home advantage, team fitness and prediction of match outcomes. arXiv preprint arXiv:1207.0700 . Tomy and Veena [2022] Tomy, L. and G. Veena. 2022. A retrospective study on Skellam and related distributions. Austrian Journal of Statistics 51(1): 102–111 . Van Eetvelde et al. [2023] Van Eetvelde, H., L.M. Hvattum, and C. Ley. 2023. The probabilistic final standing calculator: a fair stochastic tool to handle abruptly stopped football seasons. AStA Advances in Statistical Analysis 107(1-2): 251–269 . Volossovitch and Debanne [2021] Volossovitch, A. and T. Debanne. 2021. Home advantage in handball. Home Advantage in Sport: Causes and the Effect on Performance: 220–227 . Maher, M.J. 1982. Modelling association football scores. Statistica Neerlandica 36(3): 109–118 . McHale and Scarf [2007] McHale, I. and P. Scarf. 2007. Modelling soccer matches using bivariate discrete distributions with general dependence structure. Statistica Neerlandica 61(4): 432–445 . Michels et al. [2023] Michels, R., M. Ötting, and D. Karlis. 2023. Extending the Dixon and Coles model: an application to women’s football data. arXiv preprint arXiv:2307.02139 . Michels et al. [2023] Michels, R., M. Ötting, and R. Langrock. 2023. Bettors’ reaction to match dynamics: Evidence from in-game betting. European Journal of Operational Research 310(3): 1118–1127 . Ntzoufras et al. [2021] Ntzoufras, I., V. Palaskas, and S. Drikos. 2021. Bayesian models for prediction of the set-difference in volleyball. IMA Journal of Management Mathematics 32(4): 491–518 . Ötting et al. [2024] Ötting, M., R. Michels, R. Langrock, and C. Deutscher. 2024. Demand for live betting: An analysis using state-space models. Applied Stochastic Models in Business and Industry . Pelechrinis and Winston [2021] Pelechrinis, K. and W. Winston. 2021. A Skellam regression model for quantifying positional value in soccer. Journal of Quantitative Analysis in Sports 17(3): 187–201 . Prieto et al. [2016] Prieto, J., M.Á. Gómez, A. Volossovitch, and J. Sampaio. 2016. Effects of team timeouts on the teams’ scoring performance in elite handball close games. Kinesiology 48(1.): 115–123 . Singh et al. [2023] Singh, A., P. Scarf, and R. Baker. 2023. A unified theory for bivariate scores in possessive ball-sports: The case of handball. European Journal of Operational Research 304(3): 1099–1112 . Skellam [1946] Skellam, J. 1946. The frequency distribution of the difference between two Poisson variates belonging to different populations. Journal of the Royal Statistical Society. Series A 109(3): 296–296 . Smiatek and Heuer [2012] Smiatek, J. and A. Heuer. 2012. A statistical view on team handball results: home advantage, team fitness and prediction of match outcomes. arXiv preprint arXiv:1207.0700 . Tomy and Veena [2022] Tomy, L. and G. Veena. 2022. A retrospective study on Skellam and related distributions. Austrian Journal of Statistics 51(1): 102–111 . Van Eetvelde et al. [2023] Van Eetvelde, H., L.M. Hvattum, and C. Ley. 2023. The probabilistic final standing calculator: a fair stochastic tool to handle abruptly stopped football seasons. AStA Advances in Statistical Analysis 107(1-2): 251–269 . Volossovitch and Debanne [2021] Volossovitch, A. and T. Debanne. 2021. Home advantage in handball. Home Advantage in Sport: Causes and the Effect on Performance: 220–227 . McHale, I. and P. Scarf. 2007. Modelling soccer matches using bivariate discrete distributions with general dependence structure. Statistica Neerlandica 61(4): 432–445 . Michels et al. [2023] Michels, R., M. Ötting, and D. Karlis. 2023. Extending the Dixon and Coles model: an application to women’s football data. arXiv preprint arXiv:2307.02139 . Michels et al. [2023] Michels, R., M. Ötting, and R. Langrock. 2023. Bettors’ reaction to match dynamics: Evidence from in-game betting. European Journal of Operational Research 310(3): 1118–1127 . Ntzoufras et al. [2021] Ntzoufras, I., V. Palaskas, and S. Drikos. 2021. Bayesian models for prediction of the set-difference in volleyball. IMA Journal of Management Mathematics 32(4): 491–518 . Ötting et al. [2024] Ötting, M., R. Michels, R. Langrock, and C. Deutscher. 2024. Demand for live betting: An analysis using state-space models. Applied Stochastic Models in Business and Industry . Pelechrinis and Winston [2021] Pelechrinis, K. and W. Winston. 2021. A Skellam regression model for quantifying positional value in soccer. Journal of Quantitative Analysis in Sports 17(3): 187–201 . Prieto et al. [2016] Prieto, J., M.Á. Gómez, A. Volossovitch, and J. Sampaio. 2016. Effects of team timeouts on the teams’ scoring performance in elite handball close games. Kinesiology 48(1.): 115–123 . Singh et al. [2023] Singh, A., P. Scarf, and R. Baker. 2023. A unified theory for bivariate scores in possessive ball-sports: The case of handball. European Journal of Operational Research 304(3): 1099–1112 . Skellam [1946] Skellam, J. 1946. The frequency distribution of the difference between two Poisson variates belonging to different populations. Journal of the Royal Statistical Society. Series A 109(3): 296–296 . Smiatek and Heuer [2012] Smiatek, J. and A. Heuer. 2012. A statistical view on team handball results: home advantage, team fitness and prediction of match outcomes. arXiv preprint arXiv:1207.0700 . Tomy and Veena [2022] Tomy, L. and G. Veena. 2022. A retrospective study on Skellam and related distributions. Austrian Journal of Statistics 51(1): 102–111 . Van Eetvelde et al. [2023] Van Eetvelde, H., L.M. Hvattum, and C. Ley. 2023. The probabilistic final standing calculator: a fair stochastic tool to handle abruptly stopped football seasons. AStA Advances in Statistical Analysis 107(1-2): 251–269 . Volossovitch and Debanne [2021] Volossovitch, A. and T. Debanne. 2021. Home advantage in handball. Home Advantage in Sport: Causes and the Effect on Performance: 220–227 . Michels, R., M. Ötting, and D. Karlis. 2023. Extending the Dixon and Coles model: an application to women’s football data. arXiv preprint arXiv:2307.02139 . Michels et al. [2023] Michels, R., M. Ötting, and R. Langrock. 2023. Bettors’ reaction to match dynamics: Evidence from in-game betting. European Journal of Operational Research 310(3): 1118–1127 . Ntzoufras et al. [2021] Ntzoufras, I., V. Palaskas, and S. Drikos. 2021. Bayesian models for prediction of the set-difference in volleyball. IMA Journal of Management Mathematics 32(4): 491–518 . Ötting et al. [2024] Ötting, M., R. Michels, R. Langrock, and C. Deutscher. 2024. Demand for live betting: An analysis using state-space models. Applied Stochastic Models in Business and Industry . Pelechrinis and Winston [2021] Pelechrinis, K. and W. Winston. 2021. A Skellam regression model for quantifying positional value in soccer. Journal of Quantitative Analysis in Sports 17(3): 187–201 . Prieto et al. [2016] Prieto, J., M.Á. Gómez, A. Volossovitch, and J. Sampaio. 2016. Effects of team timeouts on the teams’ scoring performance in elite handball close games. Kinesiology 48(1.): 115–123 . Singh et al. [2023] Singh, A., P. Scarf, and R. Baker. 2023. A unified theory for bivariate scores in possessive ball-sports: The case of handball. European Journal of Operational Research 304(3): 1099–1112 . Skellam [1946] Skellam, J. 1946. The frequency distribution of the difference between two Poisson variates belonging to different populations. Journal of the Royal Statistical Society. Series A 109(3): 296–296 . Smiatek and Heuer [2012] Smiatek, J. and A. Heuer. 2012. A statistical view on team handball results: home advantage, team fitness and prediction of match outcomes. arXiv preprint arXiv:1207.0700 . Tomy and Veena [2022] Tomy, L. and G. Veena. 2022. A retrospective study on Skellam and related distributions. Austrian Journal of Statistics 51(1): 102–111 . Van Eetvelde et al. [2023] Van Eetvelde, H., L.M. Hvattum, and C. Ley. 2023. The probabilistic final standing calculator: a fair stochastic tool to handle abruptly stopped football seasons. AStA Advances in Statistical Analysis 107(1-2): 251–269 . Volossovitch and Debanne [2021] Volossovitch, A. and T. Debanne. 2021. Home advantage in handball. Home Advantage in Sport: Causes and the Effect on Performance: 220–227 . Michels, R., M. Ötting, and R. Langrock. 2023. Bettors’ reaction to match dynamics: Evidence from in-game betting. European Journal of Operational Research 310(3): 1118–1127 . Ntzoufras et al. [2021] Ntzoufras, I., V. Palaskas, and S. Drikos. 2021. Bayesian models for prediction of the set-difference in volleyball. IMA Journal of Management Mathematics 32(4): 491–518 . Ötting et al. [2024] Ötting, M., R. Michels, R. Langrock, and C. Deutscher. 2024. Demand for live betting: An analysis using state-space models. Applied Stochastic Models in Business and Industry . Pelechrinis and Winston [2021] Pelechrinis, K. and W. Winston. 2021. A Skellam regression model for quantifying positional value in soccer. Journal of Quantitative Analysis in Sports 17(3): 187–201 . Prieto et al. [2016] Prieto, J., M.Á. Gómez, A. Volossovitch, and J. Sampaio. 2016. Effects of team timeouts on the teams’ scoring performance in elite handball close games. Kinesiology 48(1.): 115–123 . Singh et al. [2023] Singh, A., P. Scarf, and R. Baker. 2023. A unified theory for bivariate scores in possessive ball-sports: The case of handball. European Journal of Operational Research 304(3): 1099–1112 . Skellam [1946] Skellam, J. 1946. The frequency distribution of the difference between two Poisson variates belonging to different populations. Journal of the Royal Statistical Society. Series A 109(3): 296–296 . Smiatek and Heuer [2012] Smiatek, J. and A. Heuer. 2012. A statistical view on team handball results: home advantage, team fitness and prediction of match outcomes. arXiv preprint arXiv:1207.0700 . Tomy and Veena [2022] Tomy, L. and G. Veena. 2022. A retrospective study on Skellam and related distributions. Austrian Journal of Statistics 51(1): 102–111 . Van Eetvelde et al. [2023] Van Eetvelde, H., L.M. Hvattum, and C. Ley. 2023. The probabilistic final standing calculator: a fair stochastic tool to handle abruptly stopped football seasons. AStA Advances in Statistical Analysis 107(1-2): 251–269 . Volossovitch and Debanne [2021] Volossovitch, A. and T. Debanne. 2021. Home advantage in handball. Home Advantage in Sport: Causes and the Effect on Performance: 220–227 . Ntzoufras, I., V. Palaskas, and S. Drikos. 2021. Bayesian models for prediction of the set-difference in volleyball. IMA Journal of Management Mathematics 32(4): 491–518 . Ötting et al. [2024] Ötting, M., R. Michels, R. Langrock, and C. Deutscher. 2024. Demand for live betting: An analysis using state-space models. Applied Stochastic Models in Business and Industry . Pelechrinis and Winston [2021] Pelechrinis, K. and W. Winston. 2021. A Skellam regression model for quantifying positional value in soccer. Journal of Quantitative Analysis in Sports 17(3): 187–201 . Prieto et al. [2016] Prieto, J., M.Á. Gómez, A. Volossovitch, and J. Sampaio. 2016. Effects of team timeouts on the teams’ scoring performance in elite handball close games. Kinesiology 48(1.): 115–123 . Singh et al. [2023] Singh, A., P. Scarf, and R. Baker. 2023. A unified theory for bivariate scores in possessive ball-sports: The case of handball. European Journal of Operational Research 304(3): 1099–1112 . Skellam [1946] Skellam, J. 1946. The frequency distribution of the difference between two Poisson variates belonging to different populations. Journal of the Royal Statistical Society. Series A 109(3): 296–296 . Smiatek and Heuer [2012] Smiatek, J. and A. Heuer. 2012. A statistical view on team handball results: home advantage, team fitness and prediction of match outcomes. arXiv preprint arXiv:1207.0700 . Tomy and Veena [2022] Tomy, L. and G. Veena. 2022. A retrospective study on Skellam and related distributions. Austrian Journal of Statistics 51(1): 102–111 . Van Eetvelde et al. [2023] Van Eetvelde, H., L.M. Hvattum, and C. Ley. 2023. The probabilistic final standing calculator: a fair stochastic tool to handle abruptly stopped football seasons. AStA Advances in Statistical Analysis 107(1-2): 251–269 . Volossovitch and Debanne [2021] Volossovitch, A. and T. Debanne. 2021. Home advantage in handball. Home Advantage in Sport: Causes and the Effect on Performance: 220–227 . Ötting, M., R. Michels, R. Langrock, and C. Deutscher. 2024. Demand for live betting: An analysis using state-space models. Applied Stochastic Models in Business and Industry . Pelechrinis and Winston [2021] Pelechrinis, K. and W. Winston. 2021. A Skellam regression model for quantifying positional value in soccer. Journal of Quantitative Analysis in Sports 17(3): 187–201 . Prieto et al. [2016] Prieto, J., M.Á. Gómez, A. Volossovitch, and J. Sampaio. 2016. Effects of team timeouts on the teams’ scoring performance in elite handball close games. Kinesiology 48(1.): 115–123 . Singh et al. [2023] Singh, A., P. Scarf, and R. Baker. 2023. A unified theory for bivariate scores in possessive ball-sports: The case of handball. European Journal of Operational Research 304(3): 1099–1112 . Skellam [1946] Skellam, J. 1946. The frequency distribution of the difference between two Poisson variates belonging to different populations. Journal of the Royal Statistical Society. Series A 109(3): 296–296 . Smiatek and Heuer [2012] Smiatek, J. and A. Heuer. 2012. A statistical view on team handball results: home advantage, team fitness and prediction of match outcomes. arXiv preprint arXiv:1207.0700 . Tomy and Veena [2022] Tomy, L. and G. Veena. 2022. A retrospective study on Skellam and related distributions. Austrian Journal of Statistics 51(1): 102–111 . Van Eetvelde et al. [2023] Van Eetvelde, H., L.M. Hvattum, and C. Ley. 2023. The probabilistic final standing calculator: a fair stochastic tool to handle abruptly stopped football seasons. AStA Advances in Statistical Analysis 107(1-2): 251–269 . Volossovitch and Debanne [2021] Volossovitch, A. and T. Debanne. 2021. Home advantage in handball. Home Advantage in Sport: Causes and the Effect on Performance: 220–227 . Pelechrinis, K. and W. Winston. 2021. A Skellam regression model for quantifying positional value in soccer. Journal of Quantitative Analysis in Sports 17(3): 187–201 . Prieto et al. [2016] Prieto, J., M.Á. Gómez, A. Volossovitch, and J. Sampaio. 2016. Effects of team timeouts on the teams’ scoring performance in elite handball close games. Kinesiology 48(1.): 115–123 . Singh et al. [2023] Singh, A., P. Scarf, and R. Baker. 2023. A unified theory for bivariate scores in possessive ball-sports: The case of handball. European Journal of Operational Research 304(3): 1099–1112 . Skellam [1946] Skellam, J. 1946. The frequency distribution of the difference between two Poisson variates belonging to different populations. Journal of the Royal Statistical Society. Series A 109(3): 296–296 . Smiatek and Heuer [2012] Smiatek, J. and A. Heuer. 2012. A statistical view on team handball results: home advantage, team fitness and prediction of match outcomes. arXiv preprint arXiv:1207.0700 . Tomy and Veena [2022] Tomy, L. and G. Veena. 2022. A retrospective study on Skellam and related distributions. Austrian Journal of Statistics 51(1): 102–111 . Van Eetvelde et al. [2023] Van Eetvelde, H., L.M. Hvattum, and C. Ley. 2023. The probabilistic final standing calculator: a fair stochastic tool to handle abruptly stopped football seasons. AStA Advances in Statistical Analysis 107(1-2): 251–269 . Volossovitch and Debanne [2021] Volossovitch, A. and T. Debanne. 2021. Home advantage in handball. Home Advantage in Sport: Causes and the Effect on Performance: 220–227 . Prieto, J., M.Á. Gómez, A. Volossovitch, and J. Sampaio. 2016. Effects of team timeouts on the teams’ scoring performance in elite handball close games. Kinesiology 48(1.): 115–123 . Singh et al. [2023] Singh, A., P. Scarf, and R. Baker. 2023. A unified theory for bivariate scores in possessive ball-sports: The case of handball. European Journal of Operational Research 304(3): 1099–1112 . Skellam [1946] Skellam, J. 1946. The frequency distribution of the difference between two Poisson variates belonging to different populations. Journal of the Royal Statistical Society. Series A 109(3): 296–296 . Smiatek and Heuer [2012] Smiatek, J. and A. Heuer. 2012. A statistical view on team handball results: home advantage, team fitness and prediction of match outcomes. arXiv preprint arXiv:1207.0700 . Tomy and Veena [2022] Tomy, L. and G. Veena. 2022. A retrospective study on Skellam and related distributions. Austrian Journal of Statistics 51(1): 102–111 . Van Eetvelde et al. [2023] Van Eetvelde, H., L.M. Hvattum, and C. Ley. 2023. The probabilistic final standing calculator: a fair stochastic tool to handle abruptly stopped football seasons. AStA Advances in Statistical Analysis 107(1-2): 251–269 . Volossovitch and Debanne [2021] Volossovitch, A. and T. Debanne. 2021. Home advantage in handball. Home Advantage in Sport: Causes and the Effect on Performance: 220–227 . Singh, A., P. Scarf, and R. Baker. 2023. A unified theory for bivariate scores in possessive ball-sports: The case of handball. European Journal of Operational Research 304(3): 1099–1112 . Skellam [1946] Skellam, J. 1946. The frequency distribution of the difference between two Poisson variates belonging to different populations. Journal of the Royal Statistical Society. Series A 109(3): 296–296 . Smiatek and Heuer [2012] Smiatek, J. and A. Heuer. 2012. A statistical view on team handball results: home advantage, team fitness and prediction of match outcomes. arXiv preprint arXiv:1207.0700 . Tomy and Veena [2022] Tomy, L. and G. Veena. 2022. A retrospective study on Skellam and related distributions. Austrian Journal of Statistics 51(1): 102–111 . Van Eetvelde et al. [2023] Van Eetvelde, H., L.M. Hvattum, and C. Ley. 2023. The probabilistic final standing calculator: a fair stochastic tool to handle abruptly stopped football seasons. AStA Advances in Statistical Analysis 107(1-2): 251–269 . Volossovitch and Debanne [2021] Volossovitch, A. and T. Debanne. 2021. Home advantage in handball. Home Advantage in Sport: Causes and the Effect on Performance: 220–227 . Skellam, J. 1946. The frequency distribution of the difference between two Poisson variates belonging to different populations. Journal of the Royal Statistical Society. Series A 109(3): 296–296 . Smiatek and Heuer [2012] Smiatek, J. and A. Heuer. 2012. A statistical view on team handball results: home advantage, team fitness and prediction of match outcomes. arXiv preprint arXiv:1207.0700 . Tomy and Veena [2022] Tomy, L. and G. Veena. 2022. A retrospective study on Skellam and related distributions. Austrian Journal of Statistics 51(1): 102–111 . Van Eetvelde et al. [2023] Van Eetvelde, H., L.M. Hvattum, and C. Ley. 2023. The probabilistic final standing calculator: a fair stochastic tool to handle abruptly stopped football seasons. AStA Advances in Statistical Analysis 107(1-2): 251–269 . Volossovitch and Debanne [2021] Volossovitch, A. and T. Debanne. 2021. Home advantage in handball. Home Advantage in Sport: Causes and the Effect on Performance: 220–227 . Smiatek, J. and A. Heuer. 2012. A statistical view on team handball results: home advantage, team fitness and prediction of match outcomes. arXiv preprint arXiv:1207.0700 . Tomy and Veena [2022] Tomy, L. and G. Veena. 2022. A retrospective study on Skellam and related distributions. Austrian Journal of Statistics 51(1): 102–111 . Van Eetvelde et al. [2023] Van Eetvelde, H., L.M. Hvattum, and C. Ley. 2023. The probabilistic final standing calculator: a fair stochastic tool to handle abruptly stopped football seasons. AStA Advances in Statistical Analysis 107(1-2): 251–269 . Volossovitch and Debanne [2021] Volossovitch, A. and T. Debanne. 2021. Home advantage in handball. Home Advantage in Sport: Causes and the Effect on Performance: 220–227 . Tomy, L. and G. Veena. 2022. A retrospective study on Skellam and related distributions. Austrian Journal of Statistics 51(1): 102–111 . Van Eetvelde et al. [2023] Van Eetvelde, H., L.M. Hvattum, and C. Ley. 2023. The probabilistic final standing calculator: a fair stochastic tool to handle abruptly stopped football seasons. AStA Advances in Statistical Analysis 107(1-2): 251–269 . Volossovitch and Debanne [2021] Volossovitch, A. and T. Debanne. 2021. Home advantage in handball. Home Advantage in Sport: Causes and the Effect on Performance: 220–227 . Van Eetvelde, H., L.M. Hvattum, and C. Ley. 2023. The probabilistic final standing calculator: a fair stochastic tool to handle abruptly stopped football seasons. AStA Advances in Statistical Analysis 107(1-2): 251–269 . Volossovitch and Debanne [2021] Volossovitch, A. and T. Debanne. 2021. Home advantage in handball. Home Advantage in Sport: Causes and the Effect on Performance: 220–227 . Volossovitch, A. and T. Debanne. 2021. Home advantage in handball. Home Advantage in Sport: Causes and the Effect on Performance: 220–227 .
- Dixon, M.J. and S.G. Coles. 1997. Modelling association football scores and inefficiencies in the football betting market. Journal of the Royal Statistical Society: Series C (Applied Statistics) 46(2): 265–280 . Dumangane et al. [2009] Dumangane, M., N. Rosati, and A. Volossovitch. 2009. Departure from independence and stationarity in a handball match. Journal of Applied Statistics 36(7): 723–741 . Felice [2023] Felice, F. 2023. Ranking handball teams from statistical strength estimation. arXiv preprint arXiv:2307.06754 . Felice and Ley [2023] Felice, F. and C. Ley. 2023. Prediction of handball matches with statistically enhanced learning via estimated team strengths. arXiv preprint arXiv:2307.11777 . Groll et al. [2020] Groll, A., J. Heiner, G. Schauberger, and J. Uhrmeister. 2020. Prediction of the 2019 IHF World Men’s Handball Championship–a sparse Gaussian approximation model. Journal of Sports Analytics 6(3): 187–197 . Holmes and McHale [2024] Holmes, B. and I.G. McHale. 2024. Forecasting football match results using a player rating based model. International Journal of Forecasting 40(1): 302–312 . Irwin [1937] Irwin, J.O. 1937. The frequency distribution of the difference between two independent variates following the same Poisson distribution. Journal of the Royal Statistical Society 100(3): 415–416 . Jiang et al. [2014] Jiang, L., K. Mao, and R. Wu. 2014. A Skellam model to identify differential patterns of gene expression induced by environmental signals. BMC Genomics 15(1): 1–9 . Karlis and Mamode Khan [2023] Karlis, D. and N. Mamode Khan. 2023. Models for integer data. Annual Review of Statistics and its Application 10: 297–323 . Karlis and Ntzoufras [2006] Karlis, D. and I. Ntzoufras. 2006. Bayesian analysis of the differences of count data. Statistics in Medicine 25(11): 1885–1905 . Koopman et al. [2017] Koopman, S.J., R. Lit, and A. Lucas. 2017. Intraday stochastic volatility in discrete price changes: the dynamic Skellam model. Journal of the American Statistical Association 112(520): 1490–1503 . Lago-Peñas et al. [2013] Lago-Peñas, C., M.A. Gomez, J. Viaño, and I. González-García. 2013. Home advantage in elite handball: the impact of the quality of opposition on team performance. International Journal of Performance Analysis in Sport 13(3): 724–733 . Maher [1982] Maher, M.J. 1982. Modelling association football scores. Statistica Neerlandica 36(3): 109–118 . McHale and Scarf [2007] McHale, I. and P. Scarf. 2007. Modelling soccer matches using bivariate discrete distributions with general dependence structure. Statistica Neerlandica 61(4): 432–445 . Michels et al. [2023] Michels, R., M. Ötting, and D. Karlis. 2023. Extending the Dixon and Coles model: an application to women’s football data. arXiv preprint arXiv:2307.02139 . Michels et al. [2023] Michels, R., M. Ötting, and R. Langrock. 2023. Bettors’ reaction to match dynamics: Evidence from in-game betting. European Journal of Operational Research 310(3): 1118–1127 . Ntzoufras et al. [2021] Ntzoufras, I., V. Palaskas, and S. Drikos. 2021. Bayesian models for prediction of the set-difference in volleyball. IMA Journal of Management Mathematics 32(4): 491–518 . Ötting et al. [2024] Ötting, M., R. Michels, R. Langrock, and C. Deutscher. 2024. Demand for live betting: An analysis using state-space models. Applied Stochastic Models in Business and Industry . Pelechrinis and Winston [2021] Pelechrinis, K. and W. Winston. 2021. A Skellam regression model for quantifying positional value in soccer. Journal of Quantitative Analysis in Sports 17(3): 187–201 . Prieto et al. [2016] Prieto, J., M.Á. Gómez, A. Volossovitch, and J. Sampaio. 2016. Effects of team timeouts on the teams’ scoring performance in elite handball close games. Kinesiology 48(1.): 115–123 . Singh et al. [2023] Singh, A., P. Scarf, and R. Baker. 2023. A unified theory for bivariate scores in possessive ball-sports: The case of handball. European Journal of Operational Research 304(3): 1099–1112 . Skellam [1946] Skellam, J. 1946. The frequency distribution of the difference between two Poisson variates belonging to different populations. Journal of the Royal Statistical Society. Series A 109(3): 296–296 . Smiatek and Heuer [2012] Smiatek, J. and A. Heuer. 2012. A statistical view on team handball results: home advantage, team fitness and prediction of match outcomes. arXiv preprint arXiv:1207.0700 . Tomy and Veena [2022] Tomy, L. and G. Veena. 2022. A retrospective study on Skellam and related distributions. Austrian Journal of Statistics 51(1): 102–111 . Van Eetvelde et al. [2023] Van Eetvelde, H., L.M. Hvattum, and C. Ley. 2023. The probabilistic final standing calculator: a fair stochastic tool to handle abruptly stopped football seasons. AStA Advances in Statistical Analysis 107(1-2): 251–269 . Volossovitch and Debanne [2021] Volossovitch, A. and T. Debanne. 2021. Home advantage in handball. Home Advantage in Sport: Causes and the Effect on Performance: 220–227 . Dumangane, M., N. Rosati, and A. Volossovitch. 2009. Departure from independence and stationarity in a handball match. Journal of Applied Statistics 36(7): 723–741 . Felice [2023] Felice, F. 2023. Ranking handball teams from statistical strength estimation. arXiv preprint arXiv:2307.06754 . Felice and Ley [2023] Felice, F. and C. Ley. 2023. Prediction of handball matches with statistically enhanced learning via estimated team strengths. arXiv preprint arXiv:2307.11777 . Groll et al. [2020] Groll, A., J. Heiner, G. Schauberger, and J. Uhrmeister. 2020. Prediction of the 2019 IHF World Men’s Handball Championship–a sparse Gaussian approximation model. Journal of Sports Analytics 6(3): 187–197 . Holmes and McHale [2024] Holmes, B. and I.G. McHale. 2024. Forecasting football match results using a player rating based model. International Journal of Forecasting 40(1): 302–312 . Irwin [1937] Irwin, J.O. 1937. The frequency distribution of the difference between two independent variates following the same Poisson distribution. Journal of the Royal Statistical Society 100(3): 415–416 . Jiang et al. [2014] Jiang, L., K. Mao, and R. Wu. 2014. A Skellam model to identify differential patterns of gene expression induced by environmental signals. BMC Genomics 15(1): 1–9 . Karlis and Mamode Khan [2023] Karlis, D. and N. Mamode Khan. 2023. Models for integer data. Annual Review of Statistics and its Application 10: 297–323 . Karlis and Ntzoufras [2006] Karlis, D. and I. Ntzoufras. 2006. Bayesian analysis of the differences of count data. Statistics in Medicine 25(11): 1885–1905 . Koopman et al. [2017] Koopman, S.J., R. Lit, and A. Lucas. 2017. Intraday stochastic volatility in discrete price changes: the dynamic Skellam model. Journal of the American Statistical Association 112(520): 1490–1503 . Lago-Peñas et al. [2013] Lago-Peñas, C., M.A. Gomez, J. Viaño, and I. González-García. 2013. Home advantage in elite handball: the impact of the quality of opposition on team performance. International Journal of Performance Analysis in Sport 13(3): 724–733 . Maher [1982] Maher, M.J. 1982. Modelling association football scores. Statistica Neerlandica 36(3): 109–118 . McHale and Scarf [2007] McHale, I. and P. Scarf. 2007. Modelling soccer matches using bivariate discrete distributions with general dependence structure. Statistica Neerlandica 61(4): 432–445 . Michels et al. [2023] Michels, R., M. Ötting, and D. Karlis. 2023. Extending the Dixon and Coles model: an application to women’s football data. arXiv preprint arXiv:2307.02139 . Michels et al. [2023] Michels, R., M. Ötting, and R. Langrock. 2023. Bettors’ reaction to match dynamics: Evidence from in-game betting. European Journal of Operational Research 310(3): 1118–1127 . Ntzoufras et al. [2021] Ntzoufras, I., V. Palaskas, and S. Drikos. 2021. Bayesian models for prediction of the set-difference in volleyball. IMA Journal of Management Mathematics 32(4): 491–518 . Ötting et al. [2024] Ötting, M., R. Michels, R. Langrock, and C. Deutscher. 2024. Demand for live betting: An analysis using state-space models. Applied Stochastic Models in Business and Industry . Pelechrinis and Winston [2021] Pelechrinis, K. and W. Winston. 2021. A Skellam regression model for quantifying positional value in soccer. Journal of Quantitative Analysis in Sports 17(3): 187–201 . Prieto et al. [2016] Prieto, J., M.Á. Gómez, A. Volossovitch, and J. Sampaio. 2016. Effects of team timeouts on the teams’ scoring performance in elite handball close games. Kinesiology 48(1.): 115–123 . Singh et al. [2023] Singh, A., P. Scarf, and R. Baker. 2023. A unified theory for bivariate scores in possessive ball-sports: The case of handball. European Journal of Operational Research 304(3): 1099–1112 . Skellam [1946] Skellam, J. 1946. The frequency distribution of the difference between two Poisson variates belonging to different populations. Journal of the Royal Statistical Society. Series A 109(3): 296–296 . Smiatek and Heuer [2012] Smiatek, J. and A. Heuer. 2012. A statistical view on team handball results: home advantage, team fitness and prediction of match outcomes. arXiv preprint arXiv:1207.0700 . Tomy and Veena [2022] Tomy, L. and G. Veena. 2022. A retrospective study on Skellam and related distributions. Austrian Journal of Statistics 51(1): 102–111 . Van Eetvelde et al. [2023] Van Eetvelde, H., L.M. Hvattum, and C. Ley. 2023. The probabilistic final standing calculator: a fair stochastic tool to handle abruptly stopped football seasons. AStA Advances in Statistical Analysis 107(1-2): 251–269 . Volossovitch and Debanne [2021] Volossovitch, A. and T. Debanne. 2021. Home advantage in handball. Home Advantage in Sport: Causes and the Effect on Performance: 220–227 . Felice, F. 2023. Ranking handball teams from statistical strength estimation. arXiv preprint arXiv:2307.06754 . Felice and Ley [2023] Felice, F. and C. Ley. 2023. Prediction of handball matches with statistically enhanced learning via estimated team strengths. arXiv preprint arXiv:2307.11777 . Groll et al. [2020] Groll, A., J. Heiner, G. Schauberger, and J. Uhrmeister. 2020. Prediction of the 2019 IHF World Men’s Handball Championship–a sparse Gaussian approximation model. Journal of Sports Analytics 6(3): 187–197 . Holmes and McHale [2024] Holmes, B. and I.G. McHale. 2024. Forecasting football match results using a player rating based model. International Journal of Forecasting 40(1): 302–312 . Irwin [1937] Irwin, J.O. 1937. The frequency distribution of the difference between two independent variates following the same Poisson distribution. Journal of the Royal Statistical Society 100(3): 415–416 . Jiang et al. [2014] Jiang, L., K. Mao, and R. Wu. 2014. A Skellam model to identify differential patterns of gene expression induced by environmental signals. BMC Genomics 15(1): 1–9 . Karlis and Mamode Khan [2023] Karlis, D. and N. Mamode Khan. 2023. Models for integer data. Annual Review of Statistics and its Application 10: 297–323 . Karlis and Ntzoufras [2006] Karlis, D. and I. Ntzoufras. 2006. Bayesian analysis of the differences of count data. Statistics in Medicine 25(11): 1885–1905 . Koopman et al. [2017] Koopman, S.J., R. Lit, and A. Lucas. 2017. Intraday stochastic volatility in discrete price changes: the dynamic Skellam model. Journal of the American Statistical Association 112(520): 1490–1503 . Lago-Peñas et al. [2013] Lago-Peñas, C., M.A. Gomez, J. Viaño, and I. González-García. 2013. Home advantage in elite handball: the impact of the quality of opposition on team performance. International Journal of Performance Analysis in Sport 13(3): 724–733 . Maher [1982] Maher, M.J. 1982. Modelling association football scores. Statistica Neerlandica 36(3): 109–118 . McHale and Scarf [2007] McHale, I. and P. Scarf. 2007. Modelling soccer matches using bivariate discrete distributions with general dependence structure. Statistica Neerlandica 61(4): 432–445 . Michels et al. [2023] Michels, R., M. Ötting, and D. Karlis. 2023. Extending the Dixon and Coles model: an application to women’s football data. arXiv preprint arXiv:2307.02139 . Michels et al. [2023] Michels, R., M. Ötting, and R. Langrock. 2023. Bettors’ reaction to match dynamics: Evidence from in-game betting. European Journal of Operational Research 310(3): 1118–1127 . Ntzoufras et al. [2021] Ntzoufras, I., V. Palaskas, and S. Drikos. 2021. Bayesian models for prediction of the set-difference in volleyball. IMA Journal of Management Mathematics 32(4): 491–518 . Ötting et al. [2024] Ötting, M., R. Michels, R. Langrock, and C. Deutscher. 2024. Demand for live betting: An analysis using state-space models. Applied Stochastic Models in Business and Industry . Pelechrinis and Winston [2021] Pelechrinis, K. and W. Winston. 2021. A Skellam regression model for quantifying positional value in soccer. Journal of Quantitative Analysis in Sports 17(3): 187–201 . Prieto et al. [2016] Prieto, J., M.Á. Gómez, A. Volossovitch, and J. Sampaio. 2016. Effects of team timeouts on the teams’ scoring performance in elite handball close games. Kinesiology 48(1.): 115–123 . Singh et al. [2023] Singh, A., P. Scarf, and R. Baker. 2023. A unified theory for bivariate scores in possessive ball-sports: The case of handball. European Journal of Operational Research 304(3): 1099–1112 . Skellam [1946] Skellam, J. 1946. The frequency distribution of the difference between two Poisson variates belonging to different populations. Journal of the Royal Statistical Society. Series A 109(3): 296–296 . Smiatek and Heuer [2012] Smiatek, J. and A. Heuer. 2012. A statistical view on team handball results: home advantage, team fitness and prediction of match outcomes. arXiv preprint arXiv:1207.0700 . Tomy and Veena [2022] Tomy, L. and G. Veena. 2022. A retrospective study on Skellam and related distributions. Austrian Journal of Statistics 51(1): 102–111 . Van Eetvelde et al. [2023] Van Eetvelde, H., L.M. Hvattum, and C. Ley. 2023. The probabilistic final standing calculator: a fair stochastic tool to handle abruptly stopped football seasons. AStA Advances in Statistical Analysis 107(1-2): 251–269 . Volossovitch and Debanne [2021] Volossovitch, A. and T. Debanne. 2021. Home advantage in handball. Home Advantage in Sport: Causes and the Effect on Performance: 220–227 . Felice, F. and C. Ley. 2023. Prediction of handball matches with statistically enhanced learning via estimated team strengths. arXiv preprint arXiv:2307.11777 . Groll et al. [2020] Groll, A., J. Heiner, G. Schauberger, and J. Uhrmeister. 2020. Prediction of the 2019 IHF World Men’s Handball Championship–a sparse Gaussian approximation model. Journal of Sports Analytics 6(3): 187–197 . Holmes and McHale [2024] Holmes, B. and I.G. McHale. 2024. Forecasting football match results using a player rating based model. International Journal of Forecasting 40(1): 302–312 . Irwin [1937] Irwin, J.O. 1937. The frequency distribution of the difference between two independent variates following the same Poisson distribution. Journal of the Royal Statistical Society 100(3): 415–416 . Jiang et al. [2014] Jiang, L., K. Mao, and R. Wu. 2014. A Skellam model to identify differential patterns of gene expression induced by environmental signals. BMC Genomics 15(1): 1–9 . Karlis and Mamode Khan [2023] Karlis, D. and N. Mamode Khan. 2023. Models for integer data. Annual Review of Statistics and its Application 10: 297–323 . Karlis and Ntzoufras [2006] Karlis, D. and I. Ntzoufras. 2006. Bayesian analysis of the differences of count data. Statistics in Medicine 25(11): 1885–1905 . Koopman et al. [2017] Koopman, S.J., R. Lit, and A. Lucas. 2017. Intraday stochastic volatility in discrete price changes: the dynamic Skellam model. Journal of the American Statistical Association 112(520): 1490–1503 . Lago-Peñas et al. [2013] Lago-Peñas, C., M.A. Gomez, J. Viaño, and I. González-García. 2013. Home advantage in elite handball: the impact of the quality of opposition on team performance. International Journal of Performance Analysis in Sport 13(3): 724–733 . Maher [1982] Maher, M.J. 1982. Modelling association football scores. Statistica Neerlandica 36(3): 109–118 . McHale and Scarf [2007] McHale, I. and P. Scarf. 2007. Modelling soccer matches using bivariate discrete distributions with general dependence structure. Statistica Neerlandica 61(4): 432–445 . Michels et al. [2023] Michels, R., M. Ötting, and D. Karlis. 2023. Extending the Dixon and Coles model: an application to women’s football data. arXiv preprint arXiv:2307.02139 . Michels et al. [2023] Michels, R., M. Ötting, and R. Langrock. 2023. Bettors’ reaction to match dynamics: Evidence from in-game betting. European Journal of Operational Research 310(3): 1118–1127 . Ntzoufras et al. [2021] Ntzoufras, I., V. Palaskas, and S. Drikos. 2021. Bayesian models for prediction of the set-difference in volleyball. IMA Journal of Management Mathematics 32(4): 491–518 . Ötting et al. [2024] Ötting, M., R. Michels, R. Langrock, and C. Deutscher. 2024. Demand for live betting: An analysis using state-space models. Applied Stochastic Models in Business and Industry . Pelechrinis and Winston [2021] Pelechrinis, K. and W. Winston. 2021. A Skellam regression model for quantifying positional value in soccer. Journal of Quantitative Analysis in Sports 17(3): 187–201 . Prieto et al. [2016] Prieto, J., M.Á. Gómez, A. Volossovitch, and J. Sampaio. 2016. Effects of team timeouts on the teams’ scoring performance in elite handball close games. Kinesiology 48(1.): 115–123 . Singh et al. [2023] Singh, A., P. Scarf, and R. Baker. 2023. A unified theory for bivariate scores in possessive ball-sports: The case of handball. European Journal of Operational Research 304(3): 1099–1112 . Skellam [1946] Skellam, J. 1946. The frequency distribution of the difference between two Poisson variates belonging to different populations. Journal of the Royal Statistical Society. Series A 109(3): 296–296 . Smiatek and Heuer [2012] Smiatek, J. and A. Heuer. 2012. A statistical view on team handball results: home advantage, team fitness and prediction of match outcomes. arXiv preprint arXiv:1207.0700 . Tomy and Veena [2022] Tomy, L. and G. Veena. 2022. A retrospective study on Skellam and related distributions. Austrian Journal of Statistics 51(1): 102–111 . Van Eetvelde et al. [2023] Van Eetvelde, H., L.M. Hvattum, and C. Ley. 2023. The probabilistic final standing calculator: a fair stochastic tool to handle abruptly stopped football seasons. AStA Advances in Statistical Analysis 107(1-2): 251–269 . Volossovitch and Debanne [2021] Volossovitch, A. and T. Debanne. 2021. Home advantage in handball. Home Advantage in Sport: Causes and the Effect on Performance: 220–227 . Groll, A., J. Heiner, G. Schauberger, and J. Uhrmeister. 2020. Prediction of the 2019 IHF World Men’s Handball Championship–a sparse Gaussian approximation model. Journal of Sports Analytics 6(3): 187–197 . Holmes and McHale [2024] Holmes, B. and I.G. McHale. 2024. Forecasting football match results using a player rating based model. International Journal of Forecasting 40(1): 302–312 . Irwin [1937] Irwin, J.O. 1937. The frequency distribution of the difference between two independent variates following the same Poisson distribution. Journal of the Royal Statistical Society 100(3): 415–416 . Jiang et al. [2014] Jiang, L., K. Mao, and R. Wu. 2014. A Skellam model to identify differential patterns of gene expression induced by environmental signals. BMC Genomics 15(1): 1–9 . Karlis and Mamode Khan [2023] Karlis, D. and N. Mamode Khan. 2023. Models for integer data. Annual Review of Statistics and its Application 10: 297–323 . Karlis and Ntzoufras [2006] Karlis, D. and I. Ntzoufras. 2006. Bayesian analysis of the differences of count data. Statistics in Medicine 25(11): 1885–1905 . Koopman et al. [2017] Koopman, S.J., R. Lit, and A. Lucas. 2017. Intraday stochastic volatility in discrete price changes: the dynamic Skellam model. Journal of the American Statistical Association 112(520): 1490–1503 . Lago-Peñas et al. [2013] Lago-Peñas, C., M.A. Gomez, J. Viaño, and I. González-García. 2013. Home advantage in elite handball: the impact of the quality of opposition on team performance. International Journal of Performance Analysis in Sport 13(3): 724–733 . Maher [1982] Maher, M.J. 1982. Modelling association football scores. Statistica Neerlandica 36(3): 109–118 . McHale and Scarf [2007] McHale, I. and P. Scarf. 2007. Modelling soccer matches using bivariate discrete distributions with general dependence structure. Statistica Neerlandica 61(4): 432–445 . Michels et al. [2023] Michels, R., M. Ötting, and D. Karlis. 2023. Extending the Dixon and Coles model: an application to women’s football data. arXiv preprint arXiv:2307.02139 . Michels et al. [2023] Michels, R., M. Ötting, and R. Langrock. 2023. Bettors’ reaction to match dynamics: Evidence from in-game betting. European Journal of Operational Research 310(3): 1118–1127 . Ntzoufras et al. [2021] Ntzoufras, I., V. Palaskas, and S. Drikos. 2021. Bayesian models for prediction of the set-difference in volleyball. IMA Journal of Management Mathematics 32(4): 491–518 . Ötting et al. [2024] Ötting, M., R. Michels, R. Langrock, and C. Deutscher. 2024. Demand for live betting: An analysis using state-space models. Applied Stochastic Models in Business and Industry . Pelechrinis and Winston [2021] Pelechrinis, K. and W. Winston. 2021. A Skellam regression model for quantifying positional value in soccer. Journal of Quantitative Analysis in Sports 17(3): 187–201 . Prieto et al. [2016] Prieto, J., M.Á. Gómez, A. Volossovitch, and J. Sampaio. 2016. Effects of team timeouts on the teams’ scoring performance in elite handball close games. Kinesiology 48(1.): 115–123 . Singh et al. [2023] Singh, A., P. Scarf, and R. Baker. 2023. A unified theory for bivariate scores in possessive ball-sports: The case of handball. European Journal of Operational Research 304(3): 1099–1112 . Skellam [1946] Skellam, J. 1946. The frequency distribution of the difference between two Poisson variates belonging to different populations. Journal of the Royal Statistical Society. Series A 109(3): 296–296 . Smiatek and Heuer [2012] Smiatek, J. and A. Heuer. 2012. A statistical view on team handball results: home advantage, team fitness and prediction of match outcomes. arXiv preprint arXiv:1207.0700 . Tomy and Veena [2022] Tomy, L. and G. Veena. 2022. A retrospective study on Skellam and related distributions. Austrian Journal of Statistics 51(1): 102–111 . Van Eetvelde et al. [2023] Van Eetvelde, H., L.M. Hvattum, and C. Ley. 2023. The probabilistic final standing calculator: a fair stochastic tool to handle abruptly stopped football seasons. AStA Advances in Statistical Analysis 107(1-2): 251–269 . Volossovitch and Debanne [2021] Volossovitch, A. and T. Debanne. 2021. Home advantage in handball. Home Advantage in Sport: Causes and the Effect on Performance: 220–227 . Holmes, B. and I.G. McHale. 2024. Forecasting football match results using a player rating based model. International Journal of Forecasting 40(1): 302–312 . Irwin [1937] Irwin, J.O. 1937. The frequency distribution of the difference between two independent variates following the same Poisson distribution. Journal of the Royal Statistical Society 100(3): 415–416 . Jiang et al. [2014] Jiang, L., K. Mao, and R. Wu. 2014. A Skellam model to identify differential patterns of gene expression induced by environmental signals. BMC Genomics 15(1): 1–9 . Karlis and Mamode Khan [2023] Karlis, D. and N. Mamode Khan. 2023. Models for integer data. Annual Review of Statistics and its Application 10: 297–323 . Karlis and Ntzoufras [2006] Karlis, D. and I. Ntzoufras. 2006. Bayesian analysis of the differences of count data. Statistics in Medicine 25(11): 1885–1905 . Koopman et al. [2017] Koopman, S.J., R. Lit, and A. Lucas. 2017. Intraday stochastic volatility in discrete price changes: the dynamic Skellam model. Journal of the American Statistical Association 112(520): 1490–1503 . Lago-Peñas et al. [2013] Lago-Peñas, C., M.A. Gomez, J. Viaño, and I. González-García. 2013. Home advantage in elite handball: the impact of the quality of opposition on team performance. International Journal of Performance Analysis in Sport 13(3): 724–733 . Maher [1982] Maher, M.J. 1982. Modelling association football scores. Statistica Neerlandica 36(3): 109–118 . McHale and Scarf [2007] McHale, I. and P. Scarf. 2007. Modelling soccer matches using bivariate discrete distributions with general dependence structure. Statistica Neerlandica 61(4): 432–445 . Michels et al. [2023] Michels, R., M. Ötting, and D. Karlis. 2023. Extending the Dixon and Coles model: an application to women’s football data. arXiv preprint arXiv:2307.02139 . Michels et al. [2023] Michels, R., M. Ötting, and R. Langrock. 2023. Bettors’ reaction to match dynamics: Evidence from in-game betting. European Journal of Operational Research 310(3): 1118–1127 . Ntzoufras et al. [2021] Ntzoufras, I., V. Palaskas, and S. Drikos. 2021. Bayesian models for prediction of the set-difference in volleyball. IMA Journal of Management Mathematics 32(4): 491–518 . Ötting et al. [2024] Ötting, M., R. Michels, R. Langrock, and C. Deutscher. 2024. Demand for live betting: An analysis using state-space models. Applied Stochastic Models in Business and Industry . Pelechrinis and Winston [2021] Pelechrinis, K. and W. Winston. 2021. A Skellam regression model for quantifying positional value in soccer. Journal of Quantitative Analysis in Sports 17(3): 187–201 . Prieto et al. [2016] Prieto, J., M.Á. Gómez, A. Volossovitch, and J. Sampaio. 2016. Effects of team timeouts on the teams’ scoring performance in elite handball close games. Kinesiology 48(1.): 115–123 . Singh et al. [2023] Singh, A., P. Scarf, and R. Baker. 2023. A unified theory for bivariate scores in possessive ball-sports: The case of handball. European Journal of Operational Research 304(3): 1099–1112 . Skellam [1946] Skellam, J. 1946. The frequency distribution of the difference between two Poisson variates belonging to different populations. Journal of the Royal Statistical Society. Series A 109(3): 296–296 . Smiatek and Heuer [2012] Smiatek, J. and A. Heuer. 2012. A statistical view on team handball results: home advantage, team fitness and prediction of match outcomes. arXiv preprint arXiv:1207.0700 . Tomy and Veena [2022] Tomy, L. and G. Veena. 2022. A retrospective study on Skellam and related distributions. Austrian Journal of Statistics 51(1): 102–111 . Van Eetvelde et al. [2023] Van Eetvelde, H., L.M. Hvattum, and C. Ley. 2023. The probabilistic final standing calculator: a fair stochastic tool to handle abruptly stopped football seasons. AStA Advances in Statistical Analysis 107(1-2): 251–269 . Volossovitch and Debanne [2021] Volossovitch, A. and T. Debanne. 2021. Home advantage in handball. Home Advantage in Sport: Causes and the Effect on Performance: 220–227 . Irwin, J.O. 1937. The frequency distribution of the difference between two independent variates following the same Poisson distribution. Journal of the Royal Statistical Society 100(3): 415–416 . Jiang et al. [2014] Jiang, L., K. Mao, and R. Wu. 2014. A Skellam model to identify differential patterns of gene expression induced by environmental signals. BMC Genomics 15(1): 1–9 . Karlis and Mamode Khan [2023] Karlis, D. and N. Mamode Khan. 2023. Models for integer data. Annual Review of Statistics and its Application 10: 297–323 . Karlis and Ntzoufras [2006] Karlis, D. and I. Ntzoufras. 2006. Bayesian analysis of the differences of count data. Statistics in Medicine 25(11): 1885–1905 . Koopman et al. [2017] Koopman, S.J., R. Lit, and A. Lucas. 2017. Intraday stochastic volatility in discrete price changes: the dynamic Skellam model. Journal of the American Statistical Association 112(520): 1490–1503 . Lago-Peñas et al. [2013] Lago-Peñas, C., M.A. Gomez, J. Viaño, and I. González-García. 2013. Home advantage in elite handball: the impact of the quality of opposition on team performance. International Journal of Performance Analysis in Sport 13(3): 724–733 . Maher [1982] Maher, M.J. 1982. Modelling association football scores. Statistica Neerlandica 36(3): 109–118 . McHale and Scarf [2007] McHale, I. and P. Scarf. 2007. Modelling soccer matches using bivariate discrete distributions with general dependence structure. Statistica Neerlandica 61(4): 432–445 . Michels et al. [2023] Michels, R., M. Ötting, and D. Karlis. 2023. Extending the Dixon and Coles model: an application to women’s football data. arXiv preprint arXiv:2307.02139 . Michels et al. [2023] Michels, R., M. Ötting, and R. Langrock. 2023. Bettors’ reaction to match dynamics: Evidence from in-game betting. European Journal of Operational Research 310(3): 1118–1127 . Ntzoufras et al. [2021] Ntzoufras, I., V. Palaskas, and S. Drikos. 2021. Bayesian models for prediction of the set-difference in volleyball. IMA Journal of Management Mathematics 32(4): 491–518 . Ötting et al. [2024] Ötting, M., R. Michels, R. Langrock, and C. Deutscher. 2024. Demand for live betting: An analysis using state-space models. Applied Stochastic Models in Business and Industry . Pelechrinis and Winston [2021] Pelechrinis, K. and W. Winston. 2021. A Skellam regression model for quantifying positional value in soccer. Journal of Quantitative Analysis in Sports 17(3): 187–201 . Prieto et al. [2016] Prieto, J., M.Á. Gómez, A. Volossovitch, and J. Sampaio. 2016. Effects of team timeouts on the teams’ scoring performance in elite handball close games. Kinesiology 48(1.): 115–123 . Singh et al. [2023] Singh, A., P. Scarf, and R. Baker. 2023. A unified theory for bivariate scores in possessive ball-sports: The case of handball. European Journal of Operational Research 304(3): 1099–1112 . Skellam [1946] Skellam, J. 1946. The frequency distribution of the difference between two Poisson variates belonging to different populations. Journal of the Royal Statistical Society. Series A 109(3): 296–296 . Smiatek and Heuer [2012] Smiatek, J. and A. Heuer. 2012. A statistical view on team handball results: home advantage, team fitness and prediction of match outcomes. arXiv preprint arXiv:1207.0700 . Tomy and Veena [2022] Tomy, L. and G. Veena. 2022. A retrospective study on Skellam and related distributions. Austrian Journal of Statistics 51(1): 102–111 . Van Eetvelde et al. [2023] Van Eetvelde, H., L.M. Hvattum, and C. Ley. 2023. The probabilistic final standing calculator: a fair stochastic tool to handle abruptly stopped football seasons. AStA Advances in Statistical Analysis 107(1-2): 251–269 . Volossovitch and Debanne [2021] Volossovitch, A. and T. Debanne. 2021. Home advantage in handball. Home Advantage in Sport: Causes and the Effect on Performance: 220–227 . Jiang, L., K. Mao, and R. Wu. 2014. A Skellam model to identify differential patterns of gene expression induced by environmental signals. BMC Genomics 15(1): 1–9 . Karlis and Mamode Khan [2023] Karlis, D. and N. Mamode Khan. 2023. Models for integer data. Annual Review of Statistics and its Application 10: 297–323 . Karlis and Ntzoufras [2006] Karlis, D. and I. Ntzoufras. 2006. Bayesian analysis of the differences of count data. Statistics in Medicine 25(11): 1885–1905 . Koopman et al. [2017] Koopman, S.J., R. Lit, and A. Lucas. 2017. Intraday stochastic volatility in discrete price changes: the dynamic Skellam model. Journal of the American Statistical Association 112(520): 1490–1503 . Lago-Peñas et al. [2013] Lago-Peñas, C., M.A. Gomez, J. Viaño, and I. González-García. 2013. Home advantage in elite handball: the impact of the quality of opposition on team performance. International Journal of Performance Analysis in Sport 13(3): 724–733 . Maher [1982] Maher, M.J. 1982. Modelling association football scores. Statistica Neerlandica 36(3): 109–118 . McHale and Scarf [2007] McHale, I. and P. Scarf. 2007. Modelling soccer matches using bivariate discrete distributions with general dependence structure. Statistica Neerlandica 61(4): 432–445 . Michels et al. [2023] Michels, R., M. Ötting, and D. Karlis. 2023. Extending the Dixon and Coles model: an application to women’s football data. arXiv preprint arXiv:2307.02139 . Michels et al. [2023] Michels, R., M. Ötting, and R. Langrock. 2023. Bettors’ reaction to match dynamics: Evidence from in-game betting. European Journal of Operational Research 310(3): 1118–1127 . Ntzoufras et al. [2021] Ntzoufras, I., V. Palaskas, and S. Drikos. 2021. Bayesian models for prediction of the set-difference in volleyball. IMA Journal of Management Mathematics 32(4): 491–518 . Ötting et al. [2024] Ötting, M., R. Michels, R. Langrock, and C. Deutscher. 2024. Demand for live betting: An analysis using state-space models. Applied Stochastic Models in Business and Industry . Pelechrinis and Winston [2021] Pelechrinis, K. and W. Winston. 2021. A Skellam regression model for quantifying positional value in soccer. Journal of Quantitative Analysis in Sports 17(3): 187–201 . Prieto et al. [2016] Prieto, J., M.Á. Gómez, A. Volossovitch, and J. Sampaio. 2016. Effects of team timeouts on the teams’ scoring performance in elite handball close games. Kinesiology 48(1.): 115–123 . Singh et al. [2023] Singh, A., P. Scarf, and R. Baker. 2023. A unified theory for bivariate scores in possessive ball-sports: The case of handball. European Journal of Operational Research 304(3): 1099–1112 . Skellam [1946] Skellam, J. 1946. The frequency distribution of the difference between two Poisson variates belonging to different populations. Journal of the Royal Statistical Society. Series A 109(3): 296–296 . Smiatek and Heuer [2012] Smiatek, J. and A. Heuer. 2012. A statistical view on team handball results: home advantage, team fitness and prediction of match outcomes. arXiv preprint arXiv:1207.0700 . Tomy and Veena [2022] Tomy, L. and G. Veena. 2022. A retrospective study on Skellam and related distributions. Austrian Journal of Statistics 51(1): 102–111 . Van Eetvelde et al. [2023] Van Eetvelde, H., L.M. Hvattum, and C. Ley. 2023. The probabilistic final standing calculator: a fair stochastic tool to handle abruptly stopped football seasons. AStA Advances in Statistical Analysis 107(1-2): 251–269 . Volossovitch and Debanne [2021] Volossovitch, A. and T. Debanne. 2021. Home advantage in handball. Home Advantage in Sport: Causes and the Effect on Performance: 220–227 . Karlis, D. and N. Mamode Khan. 2023. Models for integer data. Annual Review of Statistics and its Application 10: 297–323 . Karlis and Ntzoufras [2006] Karlis, D. and I. Ntzoufras. 2006. Bayesian analysis of the differences of count data. Statistics in Medicine 25(11): 1885–1905 . Koopman et al. [2017] Koopman, S.J., R. Lit, and A. Lucas. 2017. Intraday stochastic volatility in discrete price changes: the dynamic Skellam model. Journal of the American Statistical Association 112(520): 1490–1503 . Lago-Peñas et al. [2013] Lago-Peñas, C., M.A. Gomez, J. Viaño, and I. González-García. 2013. Home advantage in elite handball: the impact of the quality of opposition on team performance. International Journal of Performance Analysis in Sport 13(3): 724–733 . Maher [1982] Maher, M.J. 1982. Modelling association football scores. Statistica Neerlandica 36(3): 109–118 . McHale and Scarf [2007] McHale, I. and P. Scarf. 2007. Modelling soccer matches using bivariate discrete distributions with general dependence structure. Statistica Neerlandica 61(4): 432–445 . Michels et al. [2023] Michels, R., M. Ötting, and D. Karlis. 2023. Extending the Dixon and Coles model: an application to women’s football data. arXiv preprint arXiv:2307.02139 . Michels et al. [2023] Michels, R., M. Ötting, and R. Langrock. 2023. Bettors’ reaction to match dynamics: Evidence from in-game betting. European Journal of Operational Research 310(3): 1118–1127 . Ntzoufras et al. [2021] Ntzoufras, I., V. Palaskas, and S. Drikos. 2021. Bayesian models for prediction of the set-difference in volleyball. IMA Journal of Management Mathematics 32(4): 491–518 . Ötting et al. [2024] Ötting, M., R. Michels, R. Langrock, and C. Deutscher. 2024. Demand for live betting: An analysis using state-space models. Applied Stochastic Models in Business and Industry . Pelechrinis and Winston [2021] Pelechrinis, K. and W. Winston. 2021. A Skellam regression model for quantifying positional value in soccer. Journal of Quantitative Analysis in Sports 17(3): 187–201 . Prieto et al. [2016] Prieto, J., M.Á. Gómez, A. Volossovitch, and J. Sampaio. 2016. Effects of team timeouts on the teams’ scoring performance in elite handball close games. Kinesiology 48(1.): 115–123 . Singh et al. [2023] Singh, A., P. Scarf, and R. Baker. 2023. A unified theory for bivariate scores in possessive ball-sports: The case of handball. European Journal of Operational Research 304(3): 1099–1112 . Skellam [1946] Skellam, J. 1946. The frequency distribution of the difference between two Poisson variates belonging to different populations. Journal of the Royal Statistical Society. Series A 109(3): 296–296 . Smiatek and Heuer [2012] Smiatek, J. and A. Heuer. 2012. A statistical view on team handball results: home advantage, team fitness and prediction of match outcomes. arXiv preprint arXiv:1207.0700 . Tomy and Veena [2022] Tomy, L. and G. Veena. 2022. A retrospective study on Skellam and related distributions. Austrian Journal of Statistics 51(1): 102–111 . Van Eetvelde et al. [2023] Van Eetvelde, H., L.M. Hvattum, and C. Ley. 2023. The probabilistic final standing calculator: a fair stochastic tool to handle abruptly stopped football seasons. AStA Advances in Statistical Analysis 107(1-2): 251–269 . Volossovitch and Debanne [2021] Volossovitch, A. and T. Debanne. 2021. Home advantage in handball. Home Advantage in Sport: Causes and the Effect on Performance: 220–227 . Karlis, D. and I. Ntzoufras. 2006. Bayesian analysis of the differences of count data. Statistics in Medicine 25(11): 1885–1905 . Koopman et al. [2017] Koopman, S.J., R. Lit, and A. Lucas. 2017. Intraday stochastic volatility in discrete price changes: the dynamic Skellam model. Journal of the American Statistical Association 112(520): 1490–1503 . Lago-Peñas et al. [2013] Lago-Peñas, C., M.A. Gomez, J. Viaño, and I. González-García. 2013. Home advantage in elite handball: the impact of the quality of opposition on team performance. International Journal of Performance Analysis in Sport 13(3): 724–733 . Maher [1982] Maher, M.J. 1982. Modelling association football scores. Statistica Neerlandica 36(3): 109–118 . McHale and Scarf [2007] McHale, I. and P. Scarf. 2007. Modelling soccer matches using bivariate discrete distributions with general dependence structure. Statistica Neerlandica 61(4): 432–445 . Michels et al. [2023] Michels, R., M. Ötting, and D. Karlis. 2023. Extending the Dixon and Coles model: an application to women’s football data. arXiv preprint arXiv:2307.02139 . Michels et al. [2023] Michels, R., M. Ötting, and R. Langrock. 2023. Bettors’ reaction to match dynamics: Evidence from in-game betting. European Journal of Operational Research 310(3): 1118–1127 . Ntzoufras et al. [2021] Ntzoufras, I., V. Palaskas, and S. Drikos. 2021. Bayesian models for prediction of the set-difference in volleyball. IMA Journal of Management Mathematics 32(4): 491–518 . Ötting et al. [2024] Ötting, M., R. Michels, R. Langrock, and C. Deutscher. 2024. Demand for live betting: An analysis using state-space models. Applied Stochastic Models in Business and Industry . Pelechrinis and Winston [2021] Pelechrinis, K. and W. Winston. 2021. A Skellam regression model for quantifying positional value in soccer. Journal of Quantitative Analysis in Sports 17(3): 187–201 . Prieto et al. [2016] Prieto, J., M.Á. Gómez, A. Volossovitch, and J. Sampaio. 2016. Effects of team timeouts on the teams’ scoring performance in elite handball close games. Kinesiology 48(1.): 115–123 . Singh et al. [2023] Singh, A., P. Scarf, and R. Baker. 2023. A unified theory for bivariate scores in possessive ball-sports: The case of handball. European Journal of Operational Research 304(3): 1099–1112 . Skellam [1946] Skellam, J. 1946. The frequency distribution of the difference between two Poisson variates belonging to different populations. Journal of the Royal Statistical Society. Series A 109(3): 296–296 . Smiatek and Heuer [2012] Smiatek, J. and A. Heuer. 2012. A statistical view on team handball results: home advantage, team fitness and prediction of match outcomes. arXiv preprint arXiv:1207.0700 . Tomy and Veena [2022] Tomy, L. and G. Veena. 2022. A retrospective study on Skellam and related distributions. Austrian Journal of Statistics 51(1): 102–111 . Van Eetvelde et al. [2023] Van Eetvelde, H., L.M. Hvattum, and C. Ley. 2023. The probabilistic final standing calculator: a fair stochastic tool to handle abruptly stopped football seasons. AStA Advances in Statistical Analysis 107(1-2): 251–269 . Volossovitch and Debanne [2021] Volossovitch, A. and T. Debanne. 2021. Home advantage in handball. Home Advantage in Sport: Causes and the Effect on Performance: 220–227 . Koopman, S.J., R. Lit, and A. Lucas. 2017. Intraday stochastic volatility in discrete price changes: the dynamic Skellam model. Journal of the American Statistical Association 112(520): 1490–1503 . Lago-Peñas et al. [2013] Lago-Peñas, C., M.A. Gomez, J. Viaño, and I. González-García. 2013. Home advantage in elite handball: the impact of the quality of opposition on team performance. International Journal of Performance Analysis in Sport 13(3): 724–733 . Maher [1982] Maher, M.J. 1982. Modelling association football scores. Statistica Neerlandica 36(3): 109–118 . McHale and Scarf [2007] McHale, I. and P. Scarf. 2007. Modelling soccer matches using bivariate discrete distributions with general dependence structure. Statistica Neerlandica 61(4): 432–445 . Michels et al. [2023] Michels, R., M. Ötting, and D. Karlis. 2023. Extending the Dixon and Coles model: an application to women’s football data. arXiv preprint arXiv:2307.02139 . Michels et al. [2023] Michels, R., M. Ötting, and R. Langrock. 2023. Bettors’ reaction to match dynamics: Evidence from in-game betting. European Journal of Operational Research 310(3): 1118–1127 . Ntzoufras et al. [2021] Ntzoufras, I., V. Palaskas, and S. Drikos. 2021. Bayesian models for prediction of the set-difference in volleyball. IMA Journal of Management Mathematics 32(4): 491–518 . Ötting et al. [2024] Ötting, M., R. Michels, R. Langrock, and C. Deutscher. 2024. Demand for live betting: An analysis using state-space models. Applied Stochastic Models in Business and Industry . Pelechrinis and Winston [2021] Pelechrinis, K. and W. Winston. 2021. A Skellam regression model for quantifying positional value in soccer. Journal of Quantitative Analysis in Sports 17(3): 187–201 . Prieto et al. [2016] Prieto, J., M.Á. Gómez, A. Volossovitch, and J. Sampaio. 2016. Effects of team timeouts on the teams’ scoring performance in elite handball close games. Kinesiology 48(1.): 115–123 . Singh et al. [2023] Singh, A., P. Scarf, and R. Baker. 2023. A unified theory for bivariate scores in possessive ball-sports: The case of handball. European Journal of Operational Research 304(3): 1099–1112 . Skellam [1946] Skellam, J. 1946. The frequency distribution of the difference between two Poisson variates belonging to different populations. Journal of the Royal Statistical Society. Series A 109(3): 296–296 . Smiatek and Heuer [2012] Smiatek, J. and A. Heuer. 2012. A statistical view on team handball results: home advantage, team fitness and prediction of match outcomes. arXiv preprint arXiv:1207.0700 . Tomy and Veena [2022] Tomy, L. and G. Veena. 2022. A retrospective study on Skellam and related distributions. Austrian Journal of Statistics 51(1): 102–111 . Van Eetvelde et al. [2023] Van Eetvelde, H., L.M. Hvattum, and C. Ley. 2023. The probabilistic final standing calculator: a fair stochastic tool to handle abruptly stopped football seasons. AStA Advances in Statistical Analysis 107(1-2): 251–269 . Volossovitch and Debanne [2021] Volossovitch, A. and T. Debanne. 2021. Home advantage in handball. Home Advantage in Sport: Causes and the Effect on Performance: 220–227 . Lago-Peñas, C., M.A. Gomez, J. Viaño, and I. González-García. 2013. Home advantage in elite handball: the impact of the quality of opposition on team performance. International Journal of Performance Analysis in Sport 13(3): 724–733 . Maher [1982] Maher, M.J. 1982. Modelling association football scores. Statistica Neerlandica 36(3): 109–118 . McHale and Scarf [2007] McHale, I. and P. Scarf. 2007. Modelling soccer matches using bivariate discrete distributions with general dependence structure. Statistica Neerlandica 61(4): 432–445 . Michels et al. [2023] Michels, R., M. Ötting, and D. Karlis. 2023. Extending the Dixon and Coles model: an application to women’s football data. arXiv preprint arXiv:2307.02139 . Michels et al. [2023] Michels, R., M. Ötting, and R. Langrock. 2023. Bettors’ reaction to match dynamics: Evidence from in-game betting. European Journal of Operational Research 310(3): 1118–1127 . Ntzoufras et al. [2021] Ntzoufras, I., V. Palaskas, and S. Drikos. 2021. Bayesian models for prediction of the set-difference in volleyball. IMA Journal of Management Mathematics 32(4): 491–518 . Ötting et al. [2024] Ötting, M., R. Michels, R. Langrock, and C. Deutscher. 2024. Demand for live betting: An analysis using state-space models. Applied Stochastic Models in Business and Industry . Pelechrinis and Winston [2021] Pelechrinis, K. and W. Winston. 2021. A Skellam regression model for quantifying positional value in soccer. Journal of Quantitative Analysis in Sports 17(3): 187–201 . Prieto et al. [2016] Prieto, J., M.Á. Gómez, A. Volossovitch, and J. Sampaio. 2016. Effects of team timeouts on the teams’ scoring performance in elite handball close games. Kinesiology 48(1.): 115–123 . Singh et al. [2023] Singh, A., P. Scarf, and R. Baker. 2023. A unified theory for bivariate scores in possessive ball-sports: The case of handball. European Journal of Operational Research 304(3): 1099–1112 . Skellam [1946] Skellam, J. 1946. The frequency distribution of the difference between two Poisson variates belonging to different populations. Journal of the Royal Statistical Society. Series A 109(3): 296–296 . Smiatek and Heuer [2012] Smiatek, J. and A. Heuer. 2012. A statistical view on team handball results: home advantage, team fitness and prediction of match outcomes. arXiv preprint arXiv:1207.0700 . Tomy and Veena [2022] Tomy, L. and G. Veena. 2022. A retrospective study on Skellam and related distributions. Austrian Journal of Statistics 51(1): 102–111 . Van Eetvelde et al. [2023] Van Eetvelde, H., L.M. Hvattum, and C. Ley. 2023. The probabilistic final standing calculator: a fair stochastic tool to handle abruptly stopped football seasons. AStA Advances in Statistical Analysis 107(1-2): 251–269 . Volossovitch and Debanne [2021] Volossovitch, A. and T. Debanne. 2021. Home advantage in handball. Home Advantage in Sport: Causes and the Effect on Performance: 220–227 . Maher, M.J. 1982. Modelling association football scores. Statistica Neerlandica 36(3): 109–118 . McHale and Scarf [2007] McHale, I. and P. Scarf. 2007. Modelling soccer matches using bivariate discrete distributions with general dependence structure. Statistica Neerlandica 61(4): 432–445 . Michels et al. [2023] Michels, R., M. Ötting, and D. Karlis. 2023. Extending the Dixon and Coles model: an application to women’s football data. arXiv preprint arXiv:2307.02139 . Michels et al. [2023] Michels, R., M. Ötting, and R. Langrock. 2023. Bettors’ reaction to match dynamics: Evidence from in-game betting. European Journal of Operational Research 310(3): 1118–1127 . Ntzoufras et al. [2021] Ntzoufras, I., V. Palaskas, and S. Drikos. 2021. Bayesian models for prediction of the set-difference in volleyball. IMA Journal of Management Mathematics 32(4): 491–518 . Ötting et al. [2024] Ötting, M., R. Michels, R. Langrock, and C. Deutscher. 2024. Demand for live betting: An analysis using state-space models. Applied Stochastic Models in Business and Industry . Pelechrinis and Winston [2021] Pelechrinis, K. and W. Winston. 2021. A Skellam regression model for quantifying positional value in soccer. Journal of Quantitative Analysis in Sports 17(3): 187–201 . Prieto et al. [2016] Prieto, J., M.Á. Gómez, A. Volossovitch, and J. Sampaio. 2016. Effects of team timeouts on the teams’ scoring performance in elite handball close games. Kinesiology 48(1.): 115–123 . Singh et al. [2023] Singh, A., P. Scarf, and R. Baker. 2023. A unified theory for bivariate scores in possessive ball-sports: The case of handball. European Journal of Operational Research 304(3): 1099–1112 . Skellam [1946] Skellam, J. 1946. The frequency distribution of the difference between two Poisson variates belonging to different populations. Journal of the Royal Statistical Society. Series A 109(3): 296–296 . Smiatek and Heuer [2012] Smiatek, J. and A. Heuer. 2012. A statistical view on team handball results: home advantage, team fitness and prediction of match outcomes. arXiv preprint arXiv:1207.0700 . Tomy and Veena [2022] Tomy, L. and G. Veena. 2022. A retrospective study on Skellam and related distributions. Austrian Journal of Statistics 51(1): 102–111 . Van Eetvelde et al. [2023] Van Eetvelde, H., L.M. Hvattum, and C. Ley. 2023. The probabilistic final standing calculator: a fair stochastic tool to handle abruptly stopped football seasons. AStA Advances in Statistical Analysis 107(1-2): 251–269 . Volossovitch and Debanne [2021] Volossovitch, A. and T. Debanne. 2021. Home advantage in handball. Home Advantage in Sport: Causes and the Effect on Performance: 220–227 . McHale, I. and P. Scarf. 2007. Modelling soccer matches using bivariate discrete distributions with general dependence structure. Statistica Neerlandica 61(4): 432–445 . Michels et al. [2023] Michels, R., M. Ötting, and D. Karlis. 2023. Extending the Dixon and Coles model: an application to women’s football data. arXiv preprint arXiv:2307.02139 . Michels et al. [2023] Michels, R., M. Ötting, and R. Langrock. 2023. Bettors’ reaction to match dynamics: Evidence from in-game betting. European Journal of Operational Research 310(3): 1118–1127 . Ntzoufras et al. [2021] Ntzoufras, I., V. Palaskas, and S. Drikos. 2021. Bayesian models for prediction of the set-difference in volleyball. IMA Journal of Management Mathematics 32(4): 491–518 . Ötting et al. [2024] Ötting, M., R. Michels, R. Langrock, and C. Deutscher. 2024. Demand for live betting: An analysis using state-space models. Applied Stochastic Models in Business and Industry . Pelechrinis and Winston [2021] Pelechrinis, K. and W. Winston. 2021. A Skellam regression model for quantifying positional value in soccer. Journal of Quantitative Analysis in Sports 17(3): 187–201 . Prieto et al. [2016] Prieto, J., M.Á. Gómez, A. Volossovitch, and J. Sampaio. 2016. Effects of team timeouts on the teams’ scoring performance in elite handball close games. Kinesiology 48(1.): 115–123 . Singh et al. [2023] Singh, A., P. Scarf, and R. Baker. 2023. A unified theory for bivariate scores in possessive ball-sports: The case of handball. European Journal of Operational Research 304(3): 1099–1112 . Skellam [1946] Skellam, J. 1946. The frequency distribution of the difference between two Poisson variates belonging to different populations. Journal of the Royal Statistical Society. Series A 109(3): 296–296 . Smiatek and Heuer [2012] Smiatek, J. and A. Heuer. 2012. A statistical view on team handball results: home advantage, team fitness and prediction of match outcomes. arXiv preprint arXiv:1207.0700 . Tomy and Veena [2022] Tomy, L. and G. Veena. 2022. A retrospective study on Skellam and related distributions. Austrian Journal of Statistics 51(1): 102–111 . Van Eetvelde et al. [2023] Van Eetvelde, H., L.M. Hvattum, and C. Ley. 2023. The probabilistic final standing calculator: a fair stochastic tool to handle abruptly stopped football seasons. AStA Advances in Statistical Analysis 107(1-2): 251–269 . Volossovitch and Debanne [2021] Volossovitch, A. and T. Debanne. 2021. Home advantage in handball. Home Advantage in Sport: Causes and the Effect on Performance: 220–227 . Michels, R., M. Ötting, and D. Karlis. 2023. Extending the Dixon and Coles model: an application to women’s football data. arXiv preprint arXiv:2307.02139 . Michels et al. [2023] Michels, R., M. Ötting, and R. Langrock. 2023. Bettors’ reaction to match dynamics: Evidence from in-game betting. European Journal of Operational Research 310(3): 1118–1127 . Ntzoufras et al. [2021] Ntzoufras, I., V. Palaskas, and S. Drikos. 2021. Bayesian models for prediction of the set-difference in volleyball. IMA Journal of Management Mathematics 32(4): 491–518 . Ötting et al. [2024] Ötting, M., R. Michels, R. Langrock, and C. Deutscher. 2024. Demand for live betting: An analysis using state-space models. Applied Stochastic Models in Business and Industry . Pelechrinis and Winston [2021] Pelechrinis, K. and W. Winston. 2021. A Skellam regression model for quantifying positional value in soccer. Journal of Quantitative Analysis in Sports 17(3): 187–201 . Prieto et al. [2016] Prieto, J., M.Á. Gómez, A. Volossovitch, and J. Sampaio. 2016. Effects of team timeouts on the teams’ scoring performance in elite handball close games. Kinesiology 48(1.): 115–123 . Singh et al. [2023] Singh, A., P. Scarf, and R. Baker. 2023. A unified theory for bivariate scores in possessive ball-sports: The case of handball. European Journal of Operational Research 304(3): 1099–1112 . Skellam [1946] Skellam, J. 1946. The frequency distribution of the difference between two Poisson variates belonging to different populations. Journal of the Royal Statistical Society. Series A 109(3): 296–296 . Smiatek and Heuer [2012] Smiatek, J. and A. Heuer. 2012. A statistical view on team handball results: home advantage, team fitness and prediction of match outcomes. arXiv preprint arXiv:1207.0700 . Tomy and Veena [2022] Tomy, L. and G. Veena. 2022. A retrospective study on Skellam and related distributions. Austrian Journal of Statistics 51(1): 102–111 . Van Eetvelde et al. [2023] Van Eetvelde, H., L.M. Hvattum, and C. Ley. 2023. The probabilistic final standing calculator: a fair stochastic tool to handle abruptly stopped football seasons. AStA Advances in Statistical Analysis 107(1-2): 251–269 . Volossovitch and Debanne [2021] Volossovitch, A. and T. Debanne. 2021. Home advantage in handball. Home Advantage in Sport: Causes and the Effect on Performance: 220–227 . Michels, R., M. Ötting, and R. Langrock. 2023. Bettors’ reaction to match dynamics: Evidence from in-game betting. European Journal of Operational Research 310(3): 1118–1127 . Ntzoufras et al. [2021] Ntzoufras, I., V. Palaskas, and S. Drikos. 2021. Bayesian models for prediction of the set-difference in volleyball. IMA Journal of Management Mathematics 32(4): 491–518 . Ötting et al. [2024] Ötting, M., R. Michels, R. Langrock, and C. Deutscher. 2024. Demand for live betting: An analysis using state-space models. Applied Stochastic Models in Business and Industry . Pelechrinis and Winston [2021] Pelechrinis, K. and W. Winston. 2021. A Skellam regression model for quantifying positional value in soccer. Journal of Quantitative Analysis in Sports 17(3): 187–201 . Prieto et al. [2016] Prieto, J., M.Á. Gómez, A. Volossovitch, and J. Sampaio. 2016. Effects of team timeouts on the teams’ scoring performance in elite handball close games. Kinesiology 48(1.): 115–123 . Singh et al. [2023] Singh, A., P. Scarf, and R. Baker. 2023. A unified theory for bivariate scores in possessive ball-sports: The case of handball. European Journal of Operational Research 304(3): 1099–1112 . Skellam [1946] Skellam, J. 1946. The frequency distribution of the difference between two Poisson variates belonging to different populations. Journal of the Royal Statistical Society. Series A 109(3): 296–296 . Smiatek and Heuer [2012] Smiatek, J. and A. Heuer. 2012. A statistical view on team handball results: home advantage, team fitness and prediction of match outcomes. arXiv preprint arXiv:1207.0700 . Tomy and Veena [2022] Tomy, L. and G. Veena. 2022. A retrospective study on Skellam and related distributions. Austrian Journal of Statistics 51(1): 102–111 . Van Eetvelde et al. [2023] Van Eetvelde, H., L.M. Hvattum, and C. Ley. 2023. The probabilistic final standing calculator: a fair stochastic tool to handle abruptly stopped football seasons. AStA Advances in Statistical Analysis 107(1-2): 251–269 . Volossovitch and Debanne [2021] Volossovitch, A. and T. Debanne. 2021. Home advantage in handball. Home Advantage in Sport: Causes and the Effect on Performance: 220–227 . Ntzoufras, I., V. Palaskas, and S. Drikos. 2021. Bayesian models for prediction of the set-difference in volleyball. IMA Journal of Management Mathematics 32(4): 491–518 . Ötting et al. [2024] Ötting, M., R. Michels, R. Langrock, and C. Deutscher. 2024. Demand for live betting: An analysis using state-space models. Applied Stochastic Models in Business and Industry . Pelechrinis and Winston [2021] Pelechrinis, K. and W. Winston. 2021. A Skellam regression model for quantifying positional value in soccer. Journal of Quantitative Analysis in Sports 17(3): 187–201 . Prieto et al. [2016] Prieto, J., M.Á. Gómez, A. Volossovitch, and J. Sampaio. 2016. Effects of team timeouts on the teams’ scoring performance in elite handball close games. Kinesiology 48(1.): 115–123 . Singh et al. [2023] Singh, A., P. Scarf, and R. Baker. 2023. A unified theory for bivariate scores in possessive ball-sports: The case of handball. European Journal of Operational Research 304(3): 1099–1112 . Skellam [1946] Skellam, J. 1946. The frequency distribution of the difference between two Poisson variates belonging to different populations. Journal of the Royal Statistical Society. Series A 109(3): 296–296 . Smiatek and Heuer [2012] Smiatek, J. and A. Heuer. 2012. A statistical view on team handball results: home advantage, team fitness and prediction of match outcomes. arXiv preprint arXiv:1207.0700 . Tomy and Veena [2022] Tomy, L. and G. Veena. 2022. A retrospective study on Skellam and related distributions. Austrian Journal of Statistics 51(1): 102–111 . Van Eetvelde et al. [2023] Van Eetvelde, H., L.M. Hvattum, and C. Ley. 2023. The probabilistic final standing calculator: a fair stochastic tool to handle abruptly stopped football seasons. AStA Advances in Statistical Analysis 107(1-2): 251–269 . Volossovitch and Debanne [2021] Volossovitch, A. and T. Debanne. 2021. Home advantage in handball. Home Advantage in Sport: Causes and the Effect on Performance: 220–227 . Ötting, M., R. Michels, R. Langrock, and C. Deutscher. 2024. Demand for live betting: An analysis using state-space models. Applied Stochastic Models in Business and Industry . Pelechrinis and Winston [2021] Pelechrinis, K. and W. Winston. 2021. A Skellam regression model for quantifying positional value in soccer. Journal of Quantitative Analysis in Sports 17(3): 187–201 . Prieto et al. [2016] Prieto, J., M.Á. Gómez, A. Volossovitch, and J. Sampaio. 2016. Effects of team timeouts on the teams’ scoring performance in elite handball close games. Kinesiology 48(1.): 115–123 . Singh et al. [2023] Singh, A., P. Scarf, and R. Baker. 2023. A unified theory for bivariate scores in possessive ball-sports: The case of handball. European Journal of Operational Research 304(3): 1099–1112 . Skellam [1946] Skellam, J. 1946. The frequency distribution of the difference between two Poisson variates belonging to different populations. Journal of the Royal Statistical Society. Series A 109(3): 296–296 . Smiatek and Heuer [2012] Smiatek, J. and A. Heuer. 2012. A statistical view on team handball results: home advantage, team fitness and prediction of match outcomes. arXiv preprint arXiv:1207.0700 . Tomy and Veena [2022] Tomy, L. and G. Veena. 2022. A retrospective study on Skellam and related distributions. Austrian Journal of Statistics 51(1): 102–111 . Van Eetvelde et al. [2023] Van Eetvelde, H., L.M. Hvattum, and C. Ley. 2023. The probabilistic final standing calculator: a fair stochastic tool to handle abruptly stopped football seasons. AStA Advances in Statistical Analysis 107(1-2): 251–269 . Volossovitch and Debanne [2021] Volossovitch, A. and T. Debanne. 2021. Home advantage in handball. Home Advantage in Sport: Causes and the Effect on Performance: 220–227 . Pelechrinis, K. and W. Winston. 2021. A Skellam regression model for quantifying positional value in soccer. Journal of Quantitative Analysis in Sports 17(3): 187–201 . Prieto et al. [2016] Prieto, J., M.Á. Gómez, A. Volossovitch, and J. Sampaio. 2016. Effects of team timeouts on the teams’ scoring performance in elite handball close games. Kinesiology 48(1.): 115–123 . Singh et al. [2023] Singh, A., P. Scarf, and R. Baker. 2023. A unified theory for bivariate scores in possessive ball-sports: The case of handball. European Journal of Operational Research 304(3): 1099–1112 . Skellam [1946] Skellam, J. 1946. The frequency distribution of the difference between two Poisson variates belonging to different populations. Journal of the Royal Statistical Society. Series A 109(3): 296–296 . Smiatek and Heuer [2012] Smiatek, J. and A. Heuer. 2012. A statistical view on team handball results: home advantage, team fitness and prediction of match outcomes. arXiv preprint arXiv:1207.0700 . Tomy and Veena [2022] Tomy, L. and G. Veena. 2022. A retrospective study on Skellam and related distributions. Austrian Journal of Statistics 51(1): 102–111 . Van Eetvelde et al. [2023] Van Eetvelde, H., L.M. Hvattum, and C. Ley. 2023. The probabilistic final standing calculator: a fair stochastic tool to handle abruptly stopped football seasons. AStA Advances in Statistical Analysis 107(1-2): 251–269 . Volossovitch and Debanne [2021] Volossovitch, A. and T. Debanne. 2021. Home advantage in handball. Home Advantage in Sport: Causes and the Effect on Performance: 220–227 . Prieto, J., M.Á. Gómez, A. Volossovitch, and J. Sampaio. 2016. Effects of team timeouts on the teams’ scoring performance in elite handball close games. Kinesiology 48(1.): 115–123 . Singh et al. [2023] Singh, A., P. Scarf, and R. Baker. 2023. A unified theory for bivariate scores in possessive ball-sports: The case of handball. European Journal of Operational Research 304(3): 1099–1112 . Skellam [1946] Skellam, J. 1946. The frequency distribution of the difference between two Poisson variates belonging to different populations. Journal of the Royal Statistical Society. Series A 109(3): 296–296 . Smiatek and Heuer [2012] Smiatek, J. and A. Heuer. 2012. A statistical view on team handball results: home advantage, team fitness and prediction of match outcomes. arXiv preprint arXiv:1207.0700 . Tomy and Veena [2022] Tomy, L. and G. Veena. 2022. A retrospective study on Skellam and related distributions. Austrian Journal of Statistics 51(1): 102–111 . Van Eetvelde et al. [2023] Van Eetvelde, H., L.M. Hvattum, and C. Ley. 2023. The probabilistic final standing calculator: a fair stochastic tool to handle abruptly stopped football seasons. AStA Advances in Statistical Analysis 107(1-2): 251–269 . Volossovitch and Debanne [2021] Volossovitch, A. and T. Debanne. 2021. Home advantage in handball. Home Advantage in Sport: Causes and the Effect on Performance: 220–227 . Singh, A., P. Scarf, and R. Baker. 2023. A unified theory for bivariate scores in possessive ball-sports: The case of handball. European Journal of Operational Research 304(3): 1099–1112 . Skellam [1946] Skellam, J. 1946. The frequency distribution of the difference between two Poisson variates belonging to different populations. Journal of the Royal Statistical Society. Series A 109(3): 296–296 . Smiatek and Heuer [2012] Smiatek, J. and A. Heuer. 2012. A statistical view on team handball results: home advantage, team fitness and prediction of match outcomes. arXiv preprint arXiv:1207.0700 . Tomy and Veena [2022] Tomy, L. and G. Veena. 2022. A retrospective study on Skellam and related distributions. Austrian Journal of Statistics 51(1): 102–111 . Van Eetvelde et al. [2023] Van Eetvelde, H., L.M. Hvattum, and C. Ley. 2023. The probabilistic final standing calculator: a fair stochastic tool to handle abruptly stopped football seasons. AStA Advances in Statistical Analysis 107(1-2): 251–269 . Volossovitch and Debanne [2021] Volossovitch, A. and T. Debanne. 2021. Home advantage in handball. Home Advantage in Sport: Causes and the Effect on Performance: 220–227 . Skellam, J. 1946. The frequency distribution of the difference between two Poisson variates belonging to different populations. Journal of the Royal Statistical Society. Series A 109(3): 296–296 . Smiatek and Heuer [2012] Smiatek, J. and A. Heuer. 2012. A statistical view on team handball results: home advantage, team fitness and prediction of match outcomes. arXiv preprint arXiv:1207.0700 . Tomy and Veena [2022] Tomy, L. and G. Veena. 2022. A retrospective study on Skellam and related distributions. Austrian Journal of Statistics 51(1): 102–111 . Van Eetvelde et al. [2023] Van Eetvelde, H., L.M. Hvattum, and C. Ley. 2023. The probabilistic final standing calculator: a fair stochastic tool to handle abruptly stopped football seasons. AStA Advances in Statistical Analysis 107(1-2): 251–269 . Volossovitch and Debanne [2021] Volossovitch, A. and T. Debanne. 2021. Home advantage in handball. Home Advantage in Sport: Causes and the Effect on Performance: 220–227 . Smiatek, J. and A. Heuer. 2012. A statistical view on team handball results: home advantage, team fitness and prediction of match outcomes. arXiv preprint arXiv:1207.0700 . Tomy and Veena [2022] Tomy, L. and G. Veena. 2022. A retrospective study on Skellam and related distributions. Austrian Journal of Statistics 51(1): 102–111 . Van Eetvelde et al. [2023] Van Eetvelde, H., L.M. Hvattum, and C. Ley. 2023. The probabilistic final standing calculator: a fair stochastic tool to handle abruptly stopped football seasons. AStA Advances in Statistical Analysis 107(1-2): 251–269 . Volossovitch and Debanne [2021] Volossovitch, A. and T. Debanne. 2021. Home advantage in handball. Home Advantage in Sport: Causes and the Effect on Performance: 220–227 . Tomy, L. and G. Veena. 2022. A retrospective study on Skellam and related distributions. Austrian Journal of Statistics 51(1): 102–111 . Van Eetvelde et al. [2023] Van Eetvelde, H., L.M. Hvattum, and C. Ley. 2023. The probabilistic final standing calculator: a fair stochastic tool to handle abruptly stopped football seasons. AStA Advances in Statistical Analysis 107(1-2): 251–269 . Volossovitch and Debanne [2021] Volossovitch, A. and T. Debanne. 2021. Home advantage in handball. Home Advantage in Sport: Causes and the Effect on Performance: 220–227 . Van Eetvelde, H., L.M. Hvattum, and C. Ley. 2023. The probabilistic final standing calculator: a fair stochastic tool to handle abruptly stopped football seasons. AStA Advances in Statistical Analysis 107(1-2): 251–269 . Volossovitch and Debanne [2021] Volossovitch, A. and T. Debanne. 2021. Home advantage in handball. Home Advantage in Sport: Causes and the Effect on Performance: 220–227 . Volossovitch, A. and T. Debanne. 2021. Home advantage in handball. Home Advantage in Sport: Causes and the Effect on Performance: 220–227 .
- Departure from independence and stationarity in a handball match. Journal of Applied Statistics 36(7): 723–741 . Felice [2023] Felice, F. 2023. Ranking handball teams from statistical strength estimation. arXiv preprint arXiv:2307.06754 . Felice and Ley [2023] Felice, F. and C. Ley. 2023. Prediction of handball matches with statistically enhanced learning via estimated team strengths. arXiv preprint arXiv:2307.11777 . Groll et al. [2020] Groll, A., J. Heiner, G. Schauberger, and J. Uhrmeister. 2020. Prediction of the 2019 IHF World Men’s Handball Championship–a sparse Gaussian approximation model. Journal of Sports Analytics 6(3): 187–197 . Holmes and McHale [2024] Holmes, B. and I.G. McHale. 2024. Forecasting football match results using a player rating based model. International Journal of Forecasting 40(1): 302–312 . Irwin [1937] Irwin, J.O. 1937. The frequency distribution of the difference between two independent variates following the same Poisson distribution. Journal of the Royal Statistical Society 100(3): 415–416 . Jiang et al. [2014] Jiang, L., K. Mao, and R. Wu. 2014. A Skellam model to identify differential patterns of gene expression induced by environmental signals. BMC Genomics 15(1): 1–9 . Karlis and Mamode Khan [2023] Karlis, D. and N. Mamode Khan. 2023. Models for integer data. Annual Review of Statistics and its Application 10: 297–323 . Karlis and Ntzoufras [2006] Karlis, D. and I. Ntzoufras. 2006. Bayesian analysis of the differences of count data. Statistics in Medicine 25(11): 1885–1905 . Koopman et al. [2017] Koopman, S.J., R. Lit, and A. Lucas. 2017. Intraday stochastic volatility in discrete price changes: the dynamic Skellam model. Journal of the American Statistical Association 112(520): 1490–1503 . Lago-Peñas et al. [2013] Lago-Peñas, C., M.A. Gomez, J. Viaño, and I. González-García. 2013. Home advantage in elite handball: the impact of the quality of opposition on team performance. International Journal of Performance Analysis in Sport 13(3): 724–733 . Maher [1982] Maher, M.J. 1982. Modelling association football scores. Statistica Neerlandica 36(3): 109–118 . McHale and Scarf [2007] McHale, I. and P. Scarf. 2007. Modelling soccer matches using bivariate discrete distributions with general dependence structure. Statistica Neerlandica 61(4): 432–445 . Michels et al. [2023] Michels, R., M. Ötting, and D. Karlis. 2023. Extending the Dixon and Coles model: an application to women’s football data. arXiv preprint arXiv:2307.02139 . Michels et al. [2023] Michels, R., M. Ötting, and R. Langrock. 2023. Bettors’ reaction to match dynamics: Evidence from in-game betting. European Journal of Operational Research 310(3): 1118–1127 . Ntzoufras et al. [2021] Ntzoufras, I., V. Palaskas, and S. Drikos. 2021. Bayesian models for prediction of the set-difference in volleyball. IMA Journal of Management Mathematics 32(4): 491–518 . Ötting et al. [2024] Ötting, M., R. Michels, R. Langrock, and C. Deutscher. 2024. Demand for live betting: An analysis using state-space models. Applied Stochastic Models in Business and Industry . Pelechrinis and Winston [2021] Pelechrinis, K. and W. Winston. 2021. A Skellam regression model for quantifying positional value in soccer. Journal of Quantitative Analysis in Sports 17(3): 187–201 . Prieto et al. [2016] Prieto, J., M.Á. Gómez, A. Volossovitch, and J. Sampaio. 2016. Effects of team timeouts on the teams’ scoring performance in elite handball close games. Kinesiology 48(1.): 115–123 . Singh et al. [2023] Singh, A., P. Scarf, and R. Baker. 2023. A unified theory for bivariate scores in possessive ball-sports: The case of handball. European Journal of Operational Research 304(3): 1099–1112 . Skellam [1946] Skellam, J. 1946. The frequency distribution of the difference between two Poisson variates belonging to different populations. Journal of the Royal Statistical Society. Series A 109(3): 296–296 . Smiatek and Heuer [2012] Smiatek, J. and A. Heuer. 2012. A statistical view on team handball results: home advantage, team fitness and prediction of match outcomes. arXiv preprint arXiv:1207.0700 . Tomy and Veena [2022] Tomy, L. and G. Veena. 2022. A retrospective study on Skellam and related distributions. Austrian Journal of Statistics 51(1): 102–111 . Van Eetvelde et al. [2023] Van Eetvelde, H., L.M. Hvattum, and C. Ley. 2023. The probabilistic final standing calculator: a fair stochastic tool to handle abruptly stopped football seasons. AStA Advances in Statistical Analysis 107(1-2): 251–269 . Volossovitch and Debanne [2021] Volossovitch, A. and T. Debanne. 2021. Home advantage in handball. Home Advantage in Sport: Causes and the Effect on Performance: 220–227 . Felice, F. 2023. Ranking handball teams from statistical strength estimation. arXiv preprint arXiv:2307.06754 . Felice and Ley [2023] Felice, F. and C. Ley. 2023. Prediction of handball matches with statistically enhanced learning via estimated team strengths. arXiv preprint arXiv:2307.11777 . Groll et al. [2020] Groll, A., J. Heiner, G. Schauberger, and J. Uhrmeister. 2020. Prediction of the 2019 IHF World Men’s Handball Championship–a sparse Gaussian approximation model. Journal of Sports Analytics 6(3): 187–197 . Holmes and McHale [2024] Holmes, B. and I.G. McHale. 2024. Forecasting football match results using a player rating based model. International Journal of Forecasting 40(1): 302–312 . Irwin [1937] Irwin, J.O. 1937. The frequency distribution of the difference between two independent variates following the same Poisson distribution. Journal of the Royal Statistical Society 100(3): 415–416 . Jiang et al. [2014] Jiang, L., K. Mao, and R. Wu. 2014. A Skellam model to identify differential patterns of gene expression induced by environmental signals. BMC Genomics 15(1): 1–9 . Karlis and Mamode Khan [2023] Karlis, D. and N. Mamode Khan. 2023. Models for integer data. Annual Review of Statistics and its Application 10: 297–323 . Karlis and Ntzoufras [2006] Karlis, D. and I. Ntzoufras. 2006. Bayesian analysis of the differences of count data. Statistics in Medicine 25(11): 1885–1905 . Koopman et al. [2017] Koopman, S.J., R. Lit, and A. Lucas. 2017. Intraday stochastic volatility in discrete price changes: the dynamic Skellam model. Journal of the American Statistical Association 112(520): 1490–1503 . Lago-Peñas et al. [2013] Lago-Peñas, C., M.A. Gomez, J. Viaño, and I. González-García. 2013. Home advantage in elite handball: the impact of the quality of opposition on team performance. International Journal of Performance Analysis in Sport 13(3): 724–733 . Maher [1982] Maher, M.J. 1982. Modelling association football scores. Statistica Neerlandica 36(3): 109–118 . McHale and Scarf [2007] McHale, I. and P. Scarf. 2007. Modelling soccer matches using bivariate discrete distributions with general dependence structure. Statistica Neerlandica 61(4): 432–445 . Michels et al. [2023] Michels, R., M. Ötting, and D. Karlis. 2023. Extending the Dixon and Coles model: an application to women’s football data. arXiv preprint arXiv:2307.02139 . Michels et al. [2023] Michels, R., M. Ötting, and R. Langrock. 2023. Bettors’ reaction to match dynamics: Evidence from in-game betting. European Journal of Operational Research 310(3): 1118–1127 . Ntzoufras et al. [2021] Ntzoufras, I., V. Palaskas, and S. Drikos. 2021. Bayesian models for prediction of the set-difference in volleyball. IMA Journal of Management Mathematics 32(4): 491–518 . Ötting et al. [2024] Ötting, M., R. Michels, R. Langrock, and C. Deutscher. 2024. Demand for live betting: An analysis using state-space models. Applied Stochastic Models in Business and Industry . Pelechrinis and Winston [2021] Pelechrinis, K. and W. Winston. 2021. A Skellam regression model for quantifying positional value in soccer. Journal of Quantitative Analysis in Sports 17(3): 187–201 . Prieto et al. [2016] Prieto, J., M.Á. Gómez, A. Volossovitch, and J. Sampaio. 2016. Effects of team timeouts on the teams’ scoring performance in elite handball close games. Kinesiology 48(1.): 115–123 . Singh et al. [2023] Singh, A., P. Scarf, and R. Baker. 2023. A unified theory for bivariate scores in possessive ball-sports: The case of handball. European Journal of Operational Research 304(3): 1099–1112 . Skellam [1946] Skellam, J. 1946. The frequency distribution of the difference between two Poisson variates belonging to different populations. Journal of the Royal Statistical Society. Series A 109(3): 296–296 . Smiatek and Heuer [2012] Smiatek, J. and A. Heuer. 2012. A statistical view on team handball results: home advantage, team fitness and prediction of match outcomes. arXiv preprint arXiv:1207.0700 . Tomy and Veena [2022] Tomy, L. and G. Veena. 2022. A retrospective study on Skellam and related distributions. Austrian Journal of Statistics 51(1): 102–111 . Van Eetvelde et al. [2023] Van Eetvelde, H., L.M. Hvattum, and C. Ley. 2023. The probabilistic final standing calculator: a fair stochastic tool to handle abruptly stopped football seasons. AStA Advances in Statistical Analysis 107(1-2): 251–269 . Volossovitch and Debanne [2021] Volossovitch, A. and T. Debanne. 2021. Home advantage in handball. Home Advantage in Sport: Causes and the Effect on Performance: 220–227 . Felice, F. and C. Ley. 2023. Prediction of handball matches with statistically enhanced learning via estimated team strengths. arXiv preprint arXiv:2307.11777 . Groll et al. [2020] Groll, A., J. Heiner, G. Schauberger, and J. Uhrmeister. 2020. Prediction of the 2019 IHF World Men’s Handball Championship–a sparse Gaussian approximation model. Journal of Sports Analytics 6(3): 187–197 . Holmes and McHale [2024] Holmes, B. and I.G. McHale. 2024. Forecasting football match results using a player rating based model. International Journal of Forecasting 40(1): 302–312 . Irwin [1937] Irwin, J.O. 1937. The frequency distribution of the difference between two independent variates following the same Poisson distribution. Journal of the Royal Statistical Society 100(3): 415–416 . Jiang et al. [2014] Jiang, L., K. Mao, and R. Wu. 2014. A Skellam model to identify differential patterns of gene expression induced by environmental signals. BMC Genomics 15(1): 1–9 . Karlis and Mamode Khan [2023] Karlis, D. and N. Mamode Khan. 2023. Models for integer data. Annual Review of Statistics and its Application 10: 297–323 . Karlis and Ntzoufras [2006] Karlis, D. and I. Ntzoufras. 2006. Bayesian analysis of the differences of count data. Statistics in Medicine 25(11): 1885–1905 . Koopman et al. [2017] Koopman, S.J., R. Lit, and A. Lucas. 2017. Intraday stochastic volatility in discrete price changes: the dynamic Skellam model. Journal of the American Statistical Association 112(520): 1490–1503 . Lago-Peñas et al. [2013] Lago-Peñas, C., M.A. Gomez, J. Viaño, and I. González-García. 2013. Home advantage in elite handball: the impact of the quality of opposition on team performance. International Journal of Performance Analysis in Sport 13(3): 724–733 . Maher [1982] Maher, M.J. 1982. Modelling association football scores. Statistica Neerlandica 36(3): 109–118 . McHale and Scarf [2007] McHale, I. and P. Scarf. 2007. Modelling soccer matches using bivariate discrete distributions with general dependence structure. Statistica Neerlandica 61(4): 432–445 . Michels et al. [2023] Michels, R., M. Ötting, and D. Karlis. 2023. Extending the Dixon and Coles model: an application to women’s football data. arXiv preprint arXiv:2307.02139 . Michels et al. [2023] Michels, R., M. Ötting, and R. Langrock. 2023. Bettors’ reaction to match dynamics: Evidence from in-game betting. European Journal of Operational Research 310(3): 1118–1127 . Ntzoufras et al. [2021] Ntzoufras, I., V. Palaskas, and S. Drikos. 2021. Bayesian models for prediction of the set-difference in volleyball. IMA Journal of Management Mathematics 32(4): 491–518 . Ötting et al. [2024] Ötting, M., R. Michels, R. Langrock, and C. Deutscher. 2024. Demand for live betting: An analysis using state-space models. Applied Stochastic Models in Business and Industry . Pelechrinis and Winston [2021] Pelechrinis, K. and W. Winston. 2021. A Skellam regression model for quantifying positional value in soccer. Journal of Quantitative Analysis in Sports 17(3): 187–201 . Prieto et al. [2016] Prieto, J., M.Á. Gómez, A. Volossovitch, and J. Sampaio. 2016. Effects of team timeouts on the teams’ scoring performance in elite handball close games. Kinesiology 48(1.): 115–123 . Singh et al. [2023] Singh, A., P. Scarf, and R. Baker. 2023. A unified theory for bivariate scores in possessive ball-sports: The case of handball. European Journal of Operational Research 304(3): 1099–1112 . Skellam [1946] Skellam, J. 1946. The frequency distribution of the difference between two Poisson variates belonging to different populations. Journal of the Royal Statistical Society. Series A 109(3): 296–296 . Smiatek and Heuer [2012] Smiatek, J. and A. Heuer. 2012. A statistical view on team handball results: home advantage, team fitness and prediction of match outcomes. arXiv preprint arXiv:1207.0700 . Tomy and Veena [2022] Tomy, L. and G. Veena. 2022. A retrospective study on Skellam and related distributions. Austrian Journal of Statistics 51(1): 102–111 . Van Eetvelde et al. [2023] Van Eetvelde, H., L.M. Hvattum, and C. Ley. 2023. The probabilistic final standing calculator: a fair stochastic tool to handle abruptly stopped football seasons. AStA Advances in Statistical Analysis 107(1-2): 251–269 . Volossovitch and Debanne [2021] Volossovitch, A. and T. Debanne. 2021. Home advantage in handball. Home Advantage in Sport: Causes and the Effect on Performance: 220–227 . Groll, A., J. Heiner, G. Schauberger, and J. Uhrmeister. 2020. Prediction of the 2019 IHF World Men’s Handball Championship–a sparse Gaussian approximation model. Journal of Sports Analytics 6(3): 187–197 . Holmes and McHale [2024] Holmes, B. and I.G. McHale. 2024. Forecasting football match results using a player rating based model. International Journal of Forecasting 40(1): 302–312 . Irwin [1937] Irwin, J.O. 1937. The frequency distribution of the difference between two independent variates following the same Poisson distribution. Journal of the Royal Statistical Society 100(3): 415–416 . Jiang et al. [2014] Jiang, L., K. Mao, and R. Wu. 2014. A Skellam model to identify differential patterns of gene expression induced by environmental signals. BMC Genomics 15(1): 1–9 . Karlis and Mamode Khan [2023] Karlis, D. and N. Mamode Khan. 2023. Models for integer data. Annual Review of Statistics and its Application 10: 297–323 . Karlis and Ntzoufras [2006] Karlis, D. and I. Ntzoufras. 2006. Bayesian analysis of the differences of count data. Statistics in Medicine 25(11): 1885–1905 . Koopman et al. [2017] Koopman, S.J., R. Lit, and A. Lucas. 2017. Intraday stochastic volatility in discrete price changes: the dynamic Skellam model. Journal of the American Statistical Association 112(520): 1490–1503 . Lago-Peñas et al. [2013] Lago-Peñas, C., M.A. Gomez, J. Viaño, and I. González-García. 2013. Home advantage in elite handball: the impact of the quality of opposition on team performance. International Journal of Performance Analysis in Sport 13(3): 724–733 . Maher [1982] Maher, M.J. 1982. Modelling association football scores. Statistica Neerlandica 36(3): 109–118 . McHale and Scarf [2007] McHale, I. and P. Scarf. 2007. Modelling soccer matches using bivariate discrete distributions with general dependence structure. Statistica Neerlandica 61(4): 432–445 . Michels et al. [2023] Michels, R., M. Ötting, and D. Karlis. 2023. Extending the Dixon and Coles model: an application to women’s football data. arXiv preprint arXiv:2307.02139 . Michels et al. [2023] Michels, R., M. Ötting, and R. Langrock. 2023. Bettors’ reaction to match dynamics: Evidence from in-game betting. European Journal of Operational Research 310(3): 1118–1127 . Ntzoufras et al. [2021] Ntzoufras, I., V. Palaskas, and S. Drikos. 2021. Bayesian models for prediction of the set-difference in volleyball. IMA Journal of Management Mathematics 32(4): 491–518 . Ötting et al. [2024] Ötting, M., R. Michels, R. Langrock, and C. Deutscher. 2024. Demand for live betting: An analysis using state-space models. Applied Stochastic Models in Business and Industry . Pelechrinis and Winston [2021] Pelechrinis, K. and W. Winston. 2021. A Skellam regression model for quantifying positional value in soccer. Journal of Quantitative Analysis in Sports 17(3): 187–201 . Prieto et al. [2016] Prieto, J., M.Á. Gómez, A. Volossovitch, and J. Sampaio. 2016. Effects of team timeouts on the teams’ scoring performance in elite handball close games. Kinesiology 48(1.): 115–123 . Singh et al. [2023] Singh, A., P. Scarf, and R. Baker. 2023. A unified theory for bivariate scores in possessive ball-sports: The case of handball. European Journal of Operational Research 304(3): 1099–1112 . Skellam [1946] Skellam, J. 1946. The frequency distribution of the difference between two Poisson variates belonging to different populations. Journal of the Royal Statistical Society. Series A 109(3): 296–296 . Smiatek and Heuer [2012] Smiatek, J. and A. Heuer. 2012. A statistical view on team handball results: home advantage, team fitness and prediction of match outcomes. arXiv preprint arXiv:1207.0700 . Tomy and Veena [2022] Tomy, L. and G. Veena. 2022. A retrospective study on Skellam and related distributions. Austrian Journal of Statistics 51(1): 102–111 . Van Eetvelde et al. [2023] Van Eetvelde, H., L.M. Hvattum, and C. Ley. 2023. The probabilistic final standing calculator: a fair stochastic tool to handle abruptly stopped football seasons. AStA Advances in Statistical Analysis 107(1-2): 251–269 . Volossovitch and Debanne [2021] Volossovitch, A. and T. Debanne. 2021. Home advantage in handball. Home Advantage in Sport: Causes and the Effect on Performance: 220–227 . Holmes, B. and I.G. McHale. 2024. Forecasting football match results using a player rating based model. International Journal of Forecasting 40(1): 302–312 . Irwin [1937] Irwin, J.O. 1937. The frequency distribution of the difference between two independent variates following the same Poisson distribution. Journal of the Royal Statistical Society 100(3): 415–416 . Jiang et al. [2014] Jiang, L., K. Mao, and R. Wu. 2014. A Skellam model to identify differential patterns of gene expression induced by environmental signals. BMC Genomics 15(1): 1–9 . Karlis and Mamode Khan [2023] Karlis, D. and N. Mamode Khan. 2023. Models for integer data. Annual Review of Statistics and its Application 10: 297–323 . Karlis and Ntzoufras [2006] Karlis, D. and I. Ntzoufras. 2006. Bayesian analysis of the differences of count data. Statistics in Medicine 25(11): 1885–1905 . Koopman et al. [2017] Koopman, S.J., R. Lit, and A. Lucas. 2017. Intraday stochastic volatility in discrete price changes: the dynamic Skellam model. Journal of the American Statistical Association 112(520): 1490–1503 . Lago-Peñas et al. [2013] Lago-Peñas, C., M.A. Gomez, J. Viaño, and I. González-García. 2013. Home advantage in elite handball: the impact of the quality of opposition on team performance. International Journal of Performance Analysis in Sport 13(3): 724–733 . Maher [1982] Maher, M.J. 1982. Modelling association football scores. Statistica Neerlandica 36(3): 109–118 . McHale and Scarf [2007] McHale, I. and P. Scarf. 2007. Modelling soccer matches using bivariate discrete distributions with general dependence structure. Statistica Neerlandica 61(4): 432–445 . Michels et al. [2023] Michels, R., M. Ötting, and D. Karlis. 2023. Extending the Dixon and Coles model: an application to women’s football data. arXiv preprint arXiv:2307.02139 . Michels et al. [2023] Michels, R., M. Ötting, and R. Langrock. 2023. Bettors’ reaction to match dynamics: Evidence from in-game betting. European Journal of Operational Research 310(3): 1118–1127 . Ntzoufras et al. [2021] Ntzoufras, I., V. Palaskas, and S. Drikos. 2021. Bayesian models for prediction of the set-difference in volleyball. IMA Journal of Management Mathematics 32(4): 491–518 . Ötting et al. [2024] Ötting, M., R. Michels, R. Langrock, and C. Deutscher. 2024. Demand for live betting: An analysis using state-space models. Applied Stochastic Models in Business and Industry . Pelechrinis and Winston [2021] Pelechrinis, K. and W. Winston. 2021. A Skellam regression model for quantifying positional value in soccer. Journal of Quantitative Analysis in Sports 17(3): 187–201 . Prieto et al. [2016] Prieto, J., M.Á. Gómez, A. Volossovitch, and J. Sampaio. 2016. Effects of team timeouts on the teams’ scoring performance in elite handball close games. Kinesiology 48(1.): 115–123 . Singh et al. [2023] Singh, A., P. Scarf, and R. Baker. 2023. A unified theory for bivariate scores in possessive ball-sports: The case of handball. European Journal of Operational Research 304(3): 1099–1112 . Skellam [1946] Skellam, J. 1946. The frequency distribution of the difference between two Poisson variates belonging to different populations. Journal of the Royal Statistical Society. Series A 109(3): 296–296 . Smiatek and Heuer [2012] Smiatek, J. and A. Heuer. 2012. A statistical view on team handball results: home advantage, team fitness and prediction of match outcomes. arXiv preprint arXiv:1207.0700 . Tomy and Veena [2022] Tomy, L. and G. Veena. 2022. A retrospective study on Skellam and related distributions. Austrian Journal of Statistics 51(1): 102–111 . Van Eetvelde et al. [2023] Van Eetvelde, H., L.M. Hvattum, and C. Ley. 2023. The probabilistic final standing calculator: a fair stochastic tool to handle abruptly stopped football seasons. AStA Advances in Statistical Analysis 107(1-2): 251–269 . Volossovitch and Debanne [2021] Volossovitch, A. and T. Debanne. 2021. Home advantage in handball. Home Advantage in Sport: Causes and the Effect on Performance: 220–227 . Irwin, J.O. 1937. The frequency distribution of the difference between two independent variates following the same Poisson distribution. Journal of the Royal Statistical Society 100(3): 415–416 . Jiang et al. [2014] Jiang, L., K. Mao, and R. Wu. 2014. A Skellam model to identify differential patterns of gene expression induced by environmental signals. BMC Genomics 15(1): 1–9 . Karlis and Mamode Khan [2023] Karlis, D. and N. Mamode Khan. 2023. Models for integer data. Annual Review of Statistics and its Application 10: 297–323 . Karlis and Ntzoufras [2006] Karlis, D. and I. Ntzoufras. 2006. Bayesian analysis of the differences of count data. Statistics in Medicine 25(11): 1885–1905 . Koopman et al. [2017] Koopman, S.J., R. Lit, and A. Lucas. 2017. Intraday stochastic volatility in discrete price changes: the dynamic Skellam model. Journal of the American Statistical Association 112(520): 1490–1503 . Lago-Peñas et al. [2013] Lago-Peñas, C., M.A. Gomez, J. Viaño, and I. González-García. 2013. Home advantage in elite handball: the impact of the quality of opposition on team performance. International Journal of Performance Analysis in Sport 13(3): 724–733 . Maher [1982] Maher, M.J. 1982. Modelling association football scores. Statistica Neerlandica 36(3): 109–118 . McHale and Scarf [2007] McHale, I. and P. Scarf. 2007. Modelling soccer matches using bivariate discrete distributions with general dependence structure. Statistica Neerlandica 61(4): 432–445 . Michels et al. [2023] Michels, R., M. Ötting, and D. Karlis. 2023. Extending the Dixon and Coles model: an application to women’s football data. arXiv preprint arXiv:2307.02139 . Michels et al. [2023] Michels, R., M. Ötting, and R. Langrock. 2023. Bettors’ reaction to match dynamics: Evidence from in-game betting. European Journal of Operational Research 310(3): 1118–1127 . Ntzoufras et al. [2021] Ntzoufras, I., V. Palaskas, and S. Drikos. 2021. Bayesian models for prediction of the set-difference in volleyball. IMA Journal of Management Mathematics 32(4): 491–518 . Ötting et al. [2024] Ötting, M., R. Michels, R. Langrock, and C. Deutscher. 2024. Demand for live betting: An analysis using state-space models. Applied Stochastic Models in Business and Industry . Pelechrinis and Winston [2021] Pelechrinis, K. and W. Winston. 2021. A Skellam regression model for quantifying positional value in soccer. Journal of Quantitative Analysis in Sports 17(3): 187–201 . Prieto et al. [2016] Prieto, J., M.Á. Gómez, A. Volossovitch, and J. Sampaio. 2016. Effects of team timeouts on the teams’ scoring performance in elite handball close games. Kinesiology 48(1.): 115–123 . Singh et al. [2023] Singh, A., P. Scarf, and R. Baker. 2023. A unified theory for bivariate scores in possessive ball-sports: The case of handball. European Journal of Operational Research 304(3): 1099–1112 . Skellam [1946] Skellam, J. 1946. The frequency distribution of the difference between two Poisson variates belonging to different populations. Journal of the Royal Statistical Society. Series A 109(3): 296–296 . Smiatek and Heuer [2012] Smiatek, J. and A. Heuer. 2012. A statistical view on team handball results: home advantage, team fitness and prediction of match outcomes. arXiv preprint arXiv:1207.0700 . Tomy and Veena [2022] Tomy, L. and G. Veena. 2022. A retrospective study on Skellam and related distributions. Austrian Journal of Statistics 51(1): 102–111 . Van Eetvelde et al. [2023] Van Eetvelde, H., L.M. Hvattum, and C. Ley. 2023. The probabilistic final standing calculator: a fair stochastic tool to handle abruptly stopped football seasons. AStA Advances in Statistical Analysis 107(1-2): 251–269 . Volossovitch and Debanne [2021] Volossovitch, A. and T. Debanne. 2021. Home advantage in handball. Home Advantage in Sport: Causes and the Effect on Performance: 220–227 . Jiang, L., K. Mao, and R. Wu. 2014. A Skellam model to identify differential patterns of gene expression induced by environmental signals. BMC Genomics 15(1): 1–9 . Karlis and Mamode Khan [2023] Karlis, D. and N. Mamode Khan. 2023. Models for integer data. Annual Review of Statistics and its Application 10: 297–323 . Karlis and Ntzoufras [2006] Karlis, D. and I. Ntzoufras. 2006. Bayesian analysis of the differences of count data. Statistics in Medicine 25(11): 1885–1905 . Koopman et al. [2017] Koopman, S.J., R. Lit, and A. Lucas. 2017. Intraday stochastic volatility in discrete price changes: the dynamic Skellam model. Journal of the American Statistical Association 112(520): 1490–1503 . Lago-Peñas et al. [2013] Lago-Peñas, C., M.A. Gomez, J. Viaño, and I. González-García. 2013. Home advantage in elite handball: the impact of the quality of opposition on team performance. International Journal of Performance Analysis in Sport 13(3): 724–733 . Maher [1982] Maher, M.J. 1982. Modelling association football scores. Statistica Neerlandica 36(3): 109–118 . McHale and Scarf [2007] McHale, I. and P. Scarf. 2007. Modelling soccer matches using bivariate discrete distributions with general dependence structure. Statistica Neerlandica 61(4): 432–445 . Michels et al. [2023] Michels, R., M. Ötting, and D. Karlis. 2023. Extending the Dixon and Coles model: an application to women’s football data. arXiv preprint arXiv:2307.02139 . Michels et al. [2023] Michels, R., M. Ötting, and R. Langrock. 2023. Bettors’ reaction to match dynamics: Evidence from in-game betting. European Journal of Operational Research 310(3): 1118–1127 . Ntzoufras et al. [2021] Ntzoufras, I., V. Palaskas, and S. Drikos. 2021. Bayesian models for prediction of the set-difference in volleyball. IMA Journal of Management Mathematics 32(4): 491–518 . Ötting et al. [2024] Ötting, M., R. Michels, R. Langrock, and C. Deutscher. 2024. Demand for live betting: An analysis using state-space models. Applied Stochastic Models in Business and Industry . Pelechrinis and Winston [2021] Pelechrinis, K. and W. Winston. 2021. A Skellam regression model for quantifying positional value in soccer. Journal of Quantitative Analysis in Sports 17(3): 187–201 . Prieto et al. [2016] Prieto, J., M.Á. Gómez, A. Volossovitch, and J. Sampaio. 2016. Effects of team timeouts on the teams’ scoring performance in elite handball close games. Kinesiology 48(1.): 115–123 . Singh et al. [2023] Singh, A., P. Scarf, and R. Baker. 2023. A unified theory for bivariate scores in possessive ball-sports: The case of handball. European Journal of Operational Research 304(3): 1099–1112 . Skellam [1946] Skellam, J. 1946. The frequency distribution of the difference between two Poisson variates belonging to different populations. Journal of the Royal Statistical Society. Series A 109(3): 296–296 . Smiatek and Heuer [2012] Smiatek, J. and A. Heuer. 2012. A statistical view on team handball results: home advantage, team fitness and prediction of match outcomes. arXiv preprint arXiv:1207.0700 . Tomy and Veena [2022] Tomy, L. and G. Veena. 2022. A retrospective study on Skellam and related distributions. Austrian Journal of Statistics 51(1): 102–111 . Van Eetvelde et al. [2023] Van Eetvelde, H., L.M. Hvattum, and C. Ley. 2023. The probabilistic final standing calculator: a fair stochastic tool to handle abruptly stopped football seasons. AStA Advances in Statistical Analysis 107(1-2): 251–269 . Volossovitch and Debanne [2021] Volossovitch, A. and T. Debanne. 2021. Home advantage in handball. Home Advantage in Sport: Causes and the Effect on Performance: 220–227 . Karlis, D. and N. Mamode Khan. 2023. Models for integer data. Annual Review of Statistics and its Application 10: 297–323 . Karlis and Ntzoufras [2006] Karlis, D. and I. Ntzoufras. 2006. Bayesian analysis of the differences of count data. Statistics in Medicine 25(11): 1885–1905 . Koopman et al. [2017] Koopman, S.J., R. Lit, and A. Lucas. 2017. Intraday stochastic volatility in discrete price changes: the dynamic Skellam model. Journal of the American Statistical Association 112(520): 1490–1503 . Lago-Peñas et al. [2013] Lago-Peñas, C., M.A. Gomez, J. Viaño, and I. González-García. 2013. Home advantage in elite handball: the impact of the quality of opposition on team performance. International Journal of Performance Analysis in Sport 13(3): 724–733 . Maher [1982] Maher, M.J. 1982. Modelling association football scores. Statistica Neerlandica 36(3): 109–118 . McHale and Scarf [2007] McHale, I. and P. Scarf. 2007. Modelling soccer matches using bivariate discrete distributions with general dependence structure. Statistica Neerlandica 61(4): 432–445 . Michels et al. [2023] Michels, R., M. Ötting, and D. Karlis. 2023. Extending the Dixon and Coles model: an application to women’s football data. arXiv preprint arXiv:2307.02139 . Michels et al. [2023] Michels, R., M. Ötting, and R. Langrock. 2023. Bettors’ reaction to match dynamics: Evidence from in-game betting. European Journal of Operational Research 310(3): 1118–1127 . Ntzoufras et al. [2021] Ntzoufras, I., V. Palaskas, and S. Drikos. 2021. Bayesian models for prediction of the set-difference in volleyball. IMA Journal of Management Mathematics 32(4): 491–518 . Ötting et al. [2024] Ötting, M., R. Michels, R. Langrock, and C. Deutscher. 2024. Demand for live betting: An analysis using state-space models. Applied Stochastic Models in Business and Industry . Pelechrinis and Winston [2021] Pelechrinis, K. and W. Winston. 2021. A Skellam regression model for quantifying positional value in soccer. Journal of Quantitative Analysis in Sports 17(3): 187–201 . Prieto et al. [2016] Prieto, J., M.Á. Gómez, A. Volossovitch, and J. Sampaio. 2016. Effects of team timeouts on the teams’ scoring performance in elite handball close games. Kinesiology 48(1.): 115–123 . Singh et al. [2023] Singh, A., P. Scarf, and R. Baker. 2023. A unified theory for bivariate scores in possessive ball-sports: The case of handball. European Journal of Operational Research 304(3): 1099–1112 . Skellam [1946] Skellam, J. 1946. The frequency distribution of the difference between two Poisson variates belonging to different populations. Journal of the Royal Statistical Society. Series A 109(3): 296–296 . Smiatek and Heuer [2012] Smiatek, J. and A. Heuer. 2012. A statistical view on team handball results: home advantage, team fitness and prediction of match outcomes. arXiv preprint arXiv:1207.0700 . Tomy and Veena [2022] Tomy, L. and G. Veena. 2022. A retrospective study on Skellam and related distributions. Austrian Journal of Statistics 51(1): 102–111 . Van Eetvelde et al. [2023] Van Eetvelde, H., L.M. Hvattum, and C. Ley. 2023. The probabilistic final standing calculator: a fair stochastic tool to handle abruptly stopped football seasons. AStA Advances in Statistical Analysis 107(1-2): 251–269 . Volossovitch and Debanne [2021] Volossovitch, A. and T. Debanne. 2021. Home advantage in handball. Home Advantage in Sport: Causes and the Effect on Performance: 220–227 . Karlis, D. and I. Ntzoufras. 2006. Bayesian analysis of the differences of count data. Statistics in Medicine 25(11): 1885–1905 . Koopman et al. [2017] Koopman, S.J., R. Lit, and A. Lucas. 2017. Intraday stochastic volatility in discrete price changes: the dynamic Skellam model. Journal of the American Statistical Association 112(520): 1490–1503 . Lago-Peñas et al. [2013] Lago-Peñas, C., M.A. Gomez, J. Viaño, and I. González-García. 2013. Home advantage in elite handball: the impact of the quality of opposition on team performance. International Journal of Performance Analysis in Sport 13(3): 724–733 . Maher [1982] Maher, M.J. 1982. Modelling association football scores. Statistica Neerlandica 36(3): 109–118 . McHale and Scarf [2007] McHale, I. and P. Scarf. 2007. Modelling soccer matches using bivariate discrete distributions with general dependence structure. Statistica Neerlandica 61(4): 432–445 . Michels et al. [2023] Michels, R., M. Ötting, and D. Karlis. 2023. Extending the Dixon and Coles model: an application to women’s football data. arXiv preprint arXiv:2307.02139 . Michels et al. [2023] Michels, R., M. Ötting, and R. Langrock. 2023. Bettors’ reaction to match dynamics: Evidence from in-game betting. European Journal of Operational Research 310(3): 1118–1127 . Ntzoufras et al. [2021] Ntzoufras, I., V. Palaskas, and S. Drikos. 2021. Bayesian models for prediction of the set-difference in volleyball. IMA Journal of Management Mathematics 32(4): 491–518 . Ötting et al. [2024] Ötting, M., R. Michels, R. Langrock, and C. Deutscher. 2024. Demand for live betting: An analysis using state-space models. Applied Stochastic Models in Business and Industry . Pelechrinis and Winston [2021] Pelechrinis, K. and W. Winston. 2021. A Skellam regression model for quantifying positional value in soccer. Journal of Quantitative Analysis in Sports 17(3): 187–201 . Prieto et al. [2016] Prieto, J., M.Á. Gómez, A. Volossovitch, and J. Sampaio. 2016. Effects of team timeouts on the teams’ scoring performance in elite handball close games. Kinesiology 48(1.): 115–123 . Singh et al. [2023] Singh, A., P. Scarf, and R. Baker. 2023. A unified theory for bivariate scores in possessive ball-sports: The case of handball. European Journal of Operational Research 304(3): 1099–1112 . Skellam [1946] Skellam, J. 1946. The frequency distribution of the difference between two Poisson variates belonging to different populations. Journal of the Royal Statistical Society. Series A 109(3): 296–296 . Smiatek and Heuer [2012] Smiatek, J. and A. Heuer. 2012. A statistical view on team handball results: home advantage, team fitness and prediction of match outcomes. arXiv preprint arXiv:1207.0700 . Tomy and Veena [2022] Tomy, L. and G. Veena. 2022. A retrospective study on Skellam and related distributions. Austrian Journal of Statistics 51(1): 102–111 . Van Eetvelde et al. [2023] Van Eetvelde, H., L.M. Hvattum, and C. Ley. 2023. The probabilistic final standing calculator: a fair stochastic tool to handle abruptly stopped football seasons. AStA Advances in Statistical Analysis 107(1-2): 251–269 . Volossovitch and Debanne [2021] Volossovitch, A. and T. Debanne. 2021. Home advantage in handball. Home Advantage in Sport: Causes and the Effect on Performance: 220–227 . Koopman, S.J., R. Lit, and A. Lucas. 2017. Intraday stochastic volatility in discrete price changes: the dynamic Skellam model. Journal of the American Statistical Association 112(520): 1490–1503 . Lago-Peñas et al. [2013] Lago-Peñas, C., M.A. Gomez, J. Viaño, and I. González-García. 2013. Home advantage in elite handball: the impact of the quality of opposition on team performance. International Journal of Performance Analysis in Sport 13(3): 724–733 . Maher [1982] Maher, M.J. 1982. Modelling association football scores. Statistica Neerlandica 36(3): 109–118 . McHale and Scarf [2007] McHale, I. and P. Scarf. 2007. Modelling soccer matches using bivariate discrete distributions with general dependence structure. Statistica Neerlandica 61(4): 432–445 . Michels et al. [2023] Michels, R., M. Ötting, and D. Karlis. 2023. Extending the Dixon and Coles model: an application to women’s football data. arXiv preprint arXiv:2307.02139 . Michels et al. [2023] Michels, R., M. Ötting, and R. Langrock. 2023. Bettors’ reaction to match dynamics: Evidence from in-game betting. European Journal of Operational Research 310(3): 1118–1127 . Ntzoufras et al. [2021] Ntzoufras, I., V. Palaskas, and S. Drikos. 2021. Bayesian models for prediction of the set-difference in volleyball. IMA Journal of Management Mathematics 32(4): 491–518 . Ötting et al. [2024] Ötting, M., R. Michels, R. Langrock, and C. Deutscher. 2024. Demand for live betting: An analysis using state-space models. Applied Stochastic Models in Business and Industry . Pelechrinis and Winston [2021] Pelechrinis, K. and W. Winston. 2021. A Skellam regression model for quantifying positional value in soccer. Journal of Quantitative Analysis in Sports 17(3): 187–201 . Prieto et al. [2016] Prieto, J., M.Á. Gómez, A. Volossovitch, and J. Sampaio. 2016. Effects of team timeouts on the teams’ scoring performance in elite handball close games. Kinesiology 48(1.): 115–123 . Singh et al. [2023] Singh, A., P. Scarf, and R. Baker. 2023. A unified theory for bivariate scores in possessive ball-sports: The case of handball. European Journal of Operational Research 304(3): 1099–1112 . Skellam [1946] Skellam, J. 1946. The frequency distribution of the difference between two Poisson variates belonging to different populations. Journal of the Royal Statistical Society. Series A 109(3): 296–296 . Smiatek and Heuer [2012] Smiatek, J. and A. Heuer. 2012. A statistical view on team handball results: home advantage, team fitness and prediction of match outcomes. arXiv preprint arXiv:1207.0700 . Tomy and Veena [2022] Tomy, L. and G. Veena. 2022. A retrospective study on Skellam and related distributions. Austrian Journal of Statistics 51(1): 102–111 . Van Eetvelde et al. [2023] Van Eetvelde, H., L.M. Hvattum, and C. Ley. 2023. The probabilistic final standing calculator: a fair stochastic tool to handle abruptly stopped football seasons. AStA Advances in Statistical Analysis 107(1-2): 251–269 . Volossovitch and Debanne [2021] Volossovitch, A. and T. Debanne. 2021. Home advantage in handball. Home Advantage in Sport: Causes and the Effect on Performance: 220–227 . Lago-Peñas, C., M.A. Gomez, J. Viaño, and I. González-García. 2013. Home advantage in elite handball: the impact of the quality of opposition on team performance. International Journal of Performance Analysis in Sport 13(3): 724–733 . Maher [1982] Maher, M.J. 1982. Modelling association football scores. Statistica Neerlandica 36(3): 109–118 . McHale and Scarf [2007] McHale, I. and P. Scarf. 2007. Modelling soccer matches using bivariate discrete distributions with general dependence structure. Statistica Neerlandica 61(4): 432–445 . Michels et al. [2023] Michels, R., M. Ötting, and D. Karlis. 2023. Extending the Dixon and Coles model: an application to women’s football data. arXiv preprint arXiv:2307.02139 . Michels et al. [2023] Michels, R., M. Ötting, and R. Langrock. 2023. Bettors’ reaction to match dynamics: Evidence from in-game betting. European Journal of Operational Research 310(3): 1118–1127 . Ntzoufras et al. [2021] Ntzoufras, I., V. Palaskas, and S. Drikos. 2021. Bayesian models for prediction of the set-difference in volleyball. IMA Journal of Management Mathematics 32(4): 491–518 . Ötting et al. [2024] Ötting, M., R. Michels, R. Langrock, and C. Deutscher. 2024. Demand for live betting: An analysis using state-space models. Applied Stochastic Models in Business and Industry . Pelechrinis and Winston [2021] Pelechrinis, K. and W. Winston. 2021. A Skellam regression model for quantifying positional value in soccer. Journal of Quantitative Analysis in Sports 17(3): 187–201 . Prieto et al. [2016] Prieto, J., M.Á. Gómez, A. Volossovitch, and J. Sampaio. 2016. Effects of team timeouts on the teams’ scoring performance in elite handball close games. Kinesiology 48(1.): 115–123 . Singh et al. [2023] Singh, A., P. Scarf, and R. Baker. 2023. A unified theory for bivariate scores in possessive ball-sports: The case of handball. European Journal of Operational Research 304(3): 1099–1112 . Skellam [1946] Skellam, J. 1946. The frequency distribution of the difference between two Poisson variates belonging to different populations. Journal of the Royal Statistical Society. Series A 109(3): 296–296 . Smiatek and Heuer [2012] Smiatek, J. and A. Heuer. 2012. A statistical view on team handball results: home advantage, team fitness and prediction of match outcomes. arXiv preprint arXiv:1207.0700 . Tomy and Veena [2022] Tomy, L. and G. Veena. 2022. A retrospective study on Skellam and related distributions. Austrian Journal of Statistics 51(1): 102–111 . Van Eetvelde et al. [2023] Van Eetvelde, H., L.M. Hvattum, and C. Ley. 2023. The probabilistic final standing calculator: a fair stochastic tool to handle abruptly stopped football seasons. AStA Advances in Statistical Analysis 107(1-2): 251–269 . Volossovitch and Debanne [2021] Volossovitch, A. and T. Debanne. 2021. Home advantage in handball. Home Advantage in Sport: Causes and the Effect on Performance: 220–227 . Maher, M.J. 1982. Modelling association football scores. Statistica Neerlandica 36(3): 109–118 . McHale and Scarf [2007] McHale, I. and P. Scarf. 2007. Modelling soccer matches using bivariate discrete distributions with general dependence structure. Statistica Neerlandica 61(4): 432–445 . Michels et al. [2023] Michels, R., M. Ötting, and D. Karlis. 2023. Extending the Dixon and Coles model: an application to women’s football data. arXiv preprint arXiv:2307.02139 . Michels et al. [2023] Michels, R., M. Ötting, and R. Langrock. 2023. Bettors’ reaction to match dynamics: Evidence from in-game betting. European Journal of Operational Research 310(3): 1118–1127 . Ntzoufras et al. [2021] Ntzoufras, I., V. Palaskas, and S. Drikos. 2021. Bayesian models for prediction of the set-difference in volleyball. IMA Journal of Management Mathematics 32(4): 491–518 . Ötting et al. [2024] Ötting, M., R. Michels, R. Langrock, and C. Deutscher. 2024. Demand for live betting: An analysis using state-space models. Applied Stochastic Models in Business and Industry . Pelechrinis and Winston [2021] Pelechrinis, K. and W. Winston. 2021. A Skellam regression model for quantifying positional value in soccer. Journal of Quantitative Analysis in Sports 17(3): 187–201 . Prieto et al. [2016] Prieto, J., M.Á. Gómez, A. Volossovitch, and J. Sampaio. 2016. Effects of team timeouts on the teams’ scoring performance in elite handball close games. Kinesiology 48(1.): 115–123 . Singh et al. [2023] Singh, A., P. Scarf, and R. Baker. 2023. A unified theory for bivariate scores in possessive ball-sports: The case of handball. European Journal of Operational Research 304(3): 1099–1112 . Skellam [1946] Skellam, J. 1946. The frequency distribution of the difference between two Poisson variates belonging to different populations. Journal of the Royal Statistical Society. Series A 109(3): 296–296 . Smiatek and Heuer [2012] Smiatek, J. and A. Heuer. 2012. A statistical view on team handball results: home advantage, team fitness and prediction of match outcomes. arXiv preprint arXiv:1207.0700 . Tomy and Veena [2022] Tomy, L. and G. Veena. 2022. A retrospective study on Skellam and related distributions. Austrian Journal of Statistics 51(1): 102–111 . Van Eetvelde et al. [2023] Van Eetvelde, H., L.M. Hvattum, and C. Ley. 2023. The probabilistic final standing calculator: a fair stochastic tool to handle abruptly stopped football seasons. AStA Advances in Statistical Analysis 107(1-2): 251–269 . Volossovitch and Debanne [2021] Volossovitch, A. and T. Debanne. 2021. Home advantage in handball. Home Advantage in Sport: Causes and the Effect on Performance: 220–227 . McHale, I. and P. Scarf. 2007. Modelling soccer matches using bivariate discrete distributions with general dependence structure. Statistica Neerlandica 61(4): 432–445 . Michels et al. [2023] Michels, R., M. Ötting, and D. Karlis. 2023. Extending the Dixon and Coles model: an application to women’s football data. arXiv preprint arXiv:2307.02139 . Michels et al. [2023] Michels, R., M. Ötting, and R. Langrock. 2023. Bettors’ reaction to match dynamics: Evidence from in-game betting. European Journal of Operational Research 310(3): 1118–1127 . Ntzoufras et al. [2021] Ntzoufras, I., V. Palaskas, and S. Drikos. 2021. Bayesian models for prediction of the set-difference in volleyball. IMA Journal of Management Mathematics 32(4): 491–518 . Ötting et al. [2024] Ötting, M., R. Michels, R. Langrock, and C. Deutscher. 2024. Demand for live betting: An analysis using state-space models. Applied Stochastic Models in Business and Industry . Pelechrinis and Winston [2021] Pelechrinis, K. and W. Winston. 2021. A Skellam regression model for quantifying positional value in soccer. Journal of Quantitative Analysis in Sports 17(3): 187–201 . Prieto et al. [2016] Prieto, J., M.Á. Gómez, A. Volossovitch, and J. Sampaio. 2016. Effects of team timeouts on the teams’ scoring performance in elite handball close games. Kinesiology 48(1.): 115–123 . Singh et al. [2023] Singh, A., P. Scarf, and R. Baker. 2023. A unified theory for bivariate scores in possessive ball-sports: The case of handball. European Journal of Operational Research 304(3): 1099–1112 . Skellam [1946] Skellam, J. 1946. The frequency distribution of the difference between two Poisson variates belonging to different populations. Journal of the Royal Statistical Society. Series A 109(3): 296–296 . Smiatek and Heuer [2012] Smiatek, J. and A. Heuer. 2012. A statistical view on team handball results: home advantage, team fitness and prediction of match outcomes. arXiv preprint arXiv:1207.0700 . Tomy and Veena [2022] Tomy, L. and G. Veena. 2022. A retrospective study on Skellam and related distributions. Austrian Journal of Statistics 51(1): 102–111 . Van Eetvelde et al. [2023] Van Eetvelde, H., L.M. Hvattum, and C. Ley. 2023. The probabilistic final standing calculator: a fair stochastic tool to handle abruptly stopped football seasons. AStA Advances in Statistical Analysis 107(1-2): 251–269 . Volossovitch and Debanne [2021] Volossovitch, A. and T. Debanne. 2021. Home advantage in handball. Home Advantage in Sport: Causes and the Effect on Performance: 220–227 . Michels, R., M. Ötting, and D. Karlis. 2023. Extending the Dixon and Coles model: an application to women’s football data. arXiv preprint arXiv:2307.02139 . Michels et al. [2023] Michels, R., M. Ötting, and R. Langrock. 2023. Bettors’ reaction to match dynamics: Evidence from in-game betting. European Journal of Operational Research 310(3): 1118–1127 . Ntzoufras et al. [2021] Ntzoufras, I., V. Palaskas, and S. Drikos. 2021. Bayesian models for prediction of the set-difference in volleyball. IMA Journal of Management Mathematics 32(4): 491–518 . Ötting et al. [2024] Ötting, M., R. Michels, R. Langrock, and C. Deutscher. 2024. Demand for live betting: An analysis using state-space models. Applied Stochastic Models in Business and Industry . Pelechrinis and Winston [2021] Pelechrinis, K. and W. Winston. 2021. A Skellam regression model for quantifying positional value in soccer. Journal of Quantitative Analysis in Sports 17(3): 187–201 . Prieto et al. [2016] Prieto, J., M.Á. Gómez, A. Volossovitch, and J. Sampaio. 2016. Effects of team timeouts on the teams’ scoring performance in elite handball close games. Kinesiology 48(1.): 115–123 . Singh et al. [2023] Singh, A., P. Scarf, and R. Baker. 2023. A unified theory for bivariate scores in possessive ball-sports: The case of handball. European Journal of Operational Research 304(3): 1099–1112 . Skellam [1946] Skellam, J. 1946. The frequency distribution of the difference between two Poisson variates belonging to different populations. Journal of the Royal Statistical Society. Series A 109(3): 296–296 . Smiatek and Heuer [2012] Smiatek, J. and A. Heuer. 2012. A statistical view on team handball results: home advantage, team fitness and prediction of match outcomes. arXiv preprint arXiv:1207.0700 . Tomy and Veena [2022] Tomy, L. and G. Veena. 2022. A retrospective study on Skellam and related distributions. Austrian Journal of Statistics 51(1): 102–111 . Van Eetvelde et al. [2023] Van Eetvelde, H., L.M. Hvattum, and C. Ley. 2023. The probabilistic final standing calculator: a fair stochastic tool to handle abruptly stopped football seasons. AStA Advances in Statistical Analysis 107(1-2): 251–269 . Volossovitch and Debanne [2021] Volossovitch, A. and T. Debanne. 2021. Home advantage in handball. Home Advantage in Sport: Causes and the Effect on Performance: 220–227 . Michels, R., M. Ötting, and R. Langrock. 2023. Bettors’ reaction to match dynamics: Evidence from in-game betting. European Journal of Operational Research 310(3): 1118–1127 . Ntzoufras et al. [2021] Ntzoufras, I., V. Palaskas, and S. Drikos. 2021. Bayesian models for prediction of the set-difference in volleyball. IMA Journal of Management Mathematics 32(4): 491–518 . Ötting et al. [2024] Ötting, M., R. Michels, R. Langrock, and C. Deutscher. 2024. Demand for live betting: An analysis using state-space models. Applied Stochastic Models in Business and Industry . Pelechrinis and Winston [2021] Pelechrinis, K. and W. Winston. 2021. A Skellam regression model for quantifying positional value in soccer. Journal of Quantitative Analysis in Sports 17(3): 187–201 . Prieto et al. [2016] Prieto, J., M.Á. Gómez, A. Volossovitch, and J. Sampaio. 2016. Effects of team timeouts on the teams’ scoring performance in elite handball close games. Kinesiology 48(1.): 115–123 . Singh et al. [2023] Singh, A., P. Scarf, and R. Baker. 2023. A unified theory for bivariate scores in possessive ball-sports: The case of handball. European Journal of Operational Research 304(3): 1099–1112 . Skellam [1946] Skellam, J. 1946. The frequency distribution of the difference between two Poisson variates belonging to different populations. Journal of the Royal Statistical Society. Series A 109(3): 296–296 . Smiatek and Heuer [2012] Smiatek, J. and A. Heuer. 2012. A statistical view on team handball results: home advantage, team fitness and prediction of match outcomes. arXiv preprint arXiv:1207.0700 . Tomy and Veena [2022] Tomy, L. and G. Veena. 2022. A retrospective study on Skellam and related distributions. Austrian Journal of Statistics 51(1): 102–111 . Van Eetvelde et al. [2023] Van Eetvelde, H., L.M. Hvattum, and C. Ley. 2023. The probabilistic final standing calculator: a fair stochastic tool to handle abruptly stopped football seasons. AStA Advances in Statistical Analysis 107(1-2): 251–269 . Volossovitch and Debanne [2021] Volossovitch, A. and T. Debanne. 2021. Home advantage in handball. Home Advantage in Sport: Causes and the Effect on Performance: 220–227 . Ntzoufras, I., V. Palaskas, and S. Drikos. 2021. Bayesian models for prediction of the set-difference in volleyball. IMA Journal of Management Mathematics 32(4): 491–518 . Ötting et al. [2024] Ötting, M., R. Michels, R. Langrock, and C. Deutscher. 2024. Demand for live betting: An analysis using state-space models. Applied Stochastic Models in Business and Industry . Pelechrinis and Winston [2021] Pelechrinis, K. and W. Winston. 2021. A Skellam regression model for quantifying positional value in soccer. Journal of Quantitative Analysis in Sports 17(3): 187–201 . Prieto et al. [2016] Prieto, J., M.Á. Gómez, A. Volossovitch, and J. Sampaio. 2016. Effects of team timeouts on the teams’ scoring performance in elite handball close games. Kinesiology 48(1.): 115–123 . Singh et al. [2023] Singh, A., P. Scarf, and R. Baker. 2023. A unified theory for bivariate scores in possessive ball-sports: The case of handball. European Journal of Operational Research 304(3): 1099–1112 . Skellam [1946] Skellam, J. 1946. The frequency distribution of the difference between two Poisson variates belonging to different populations. Journal of the Royal Statistical Society. Series A 109(3): 296–296 . Smiatek and Heuer [2012] Smiatek, J. and A. Heuer. 2012. A statistical view on team handball results: home advantage, team fitness and prediction of match outcomes. arXiv preprint arXiv:1207.0700 . Tomy and Veena [2022] Tomy, L. and G. Veena. 2022. A retrospective study on Skellam and related distributions. Austrian Journal of Statistics 51(1): 102–111 . Van Eetvelde et al. [2023] Van Eetvelde, H., L.M. Hvattum, and C. Ley. 2023. The probabilistic final standing calculator: a fair stochastic tool to handle abruptly stopped football seasons. AStA Advances in Statistical Analysis 107(1-2): 251–269 . Volossovitch and Debanne [2021] Volossovitch, A. and T. Debanne. 2021. Home advantage in handball. Home Advantage in Sport: Causes and the Effect on Performance: 220–227 . Ötting, M., R. Michels, R. Langrock, and C. Deutscher. 2024. Demand for live betting: An analysis using state-space models. Applied Stochastic Models in Business and Industry . Pelechrinis and Winston [2021] Pelechrinis, K. and W. Winston. 2021. A Skellam regression model for quantifying positional value in soccer. Journal of Quantitative Analysis in Sports 17(3): 187–201 . Prieto et al. [2016] Prieto, J., M.Á. Gómez, A. Volossovitch, and J. Sampaio. 2016. Effects of team timeouts on the teams’ scoring performance in elite handball close games. Kinesiology 48(1.): 115–123 . Singh et al. [2023] Singh, A., P. Scarf, and R. Baker. 2023. A unified theory for bivariate scores in possessive ball-sports: The case of handball. European Journal of Operational Research 304(3): 1099–1112 . Skellam [1946] Skellam, J. 1946. The frequency distribution of the difference between two Poisson variates belonging to different populations. Journal of the Royal Statistical Society. Series A 109(3): 296–296 . Smiatek and Heuer [2012] Smiatek, J. and A. Heuer. 2012. A statistical view on team handball results: home advantage, team fitness and prediction of match outcomes. arXiv preprint arXiv:1207.0700 . Tomy and Veena [2022] Tomy, L. and G. Veena. 2022. A retrospective study on Skellam and related distributions. Austrian Journal of Statistics 51(1): 102–111 . Van Eetvelde et al. [2023] Van Eetvelde, H., L.M. Hvattum, and C. Ley. 2023. The probabilistic final standing calculator: a fair stochastic tool to handle abruptly stopped football seasons. AStA Advances in Statistical Analysis 107(1-2): 251–269 . Volossovitch and Debanne [2021] Volossovitch, A. and T. Debanne. 2021. Home advantage in handball. Home Advantage in Sport: Causes and the Effect on Performance: 220–227 . Pelechrinis, K. and W. Winston. 2021. A Skellam regression model for quantifying positional value in soccer. Journal of Quantitative Analysis in Sports 17(3): 187–201 . Prieto et al. [2016] Prieto, J., M.Á. Gómez, A. Volossovitch, and J. Sampaio. 2016. Effects of team timeouts on the teams’ scoring performance in elite handball close games. Kinesiology 48(1.): 115–123 . Singh et al. [2023] Singh, A., P. Scarf, and R. Baker. 2023. A unified theory for bivariate scores in possessive ball-sports: The case of handball. European Journal of Operational Research 304(3): 1099–1112 . Skellam [1946] Skellam, J. 1946. The frequency distribution of the difference between two Poisson variates belonging to different populations. Journal of the Royal Statistical Society. Series A 109(3): 296–296 . Smiatek and Heuer [2012] Smiatek, J. and A. Heuer. 2012. A statistical view on team handball results: home advantage, team fitness and prediction of match outcomes. arXiv preprint arXiv:1207.0700 . Tomy and Veena [2022] Tomy, L. and G. Veena. 2022. A retrospective study on Skellam and related distributions. Austrian Journal of Statistics 51(1): 102–111 . Van Eetvelde et al. [2023] Van Eetvelde, H., L.M. Hvattum, and C. Ley. 2023. The probabilistic final standing calculator: a fair stochastic tool to handle abruptly stopped football seasons. AStA Advances in Statistical Analysis 107(1-2): 251–269 . Volossovitch and Debanne [2021] Volossovitch, A. and T. Debanne. 2021. Home advantage in handball. Home Advantage in Sport: Causes and the Effect on Performance: 220–227 . Prieto, J., M.Á. Gómez, A. Volossovitch, and J. Sampaio. 2016. Effects of team timeouts on the teams’ scoring performance in elite handball close games. Kinesiology 48(1.): 115–123 . Singh et al. [2023] Singh, A., P. Scarf, and R. Baker. 2023. A unified theory for bivariate scores in possessive ball-sports: The case of handball. European Journal of Operational Research 304(3): 1099–1112 . Skellam [1946] Skellam, J. 1946. The frequency distribution of the difference between two Poisson variates belonging to different populations. Journal of the Royal Statistical Society. Series A 109(3): 296–296 . Smiatek and Heuer [2012] Smiatek, J. and A. Heuer. 2012. A statistical view on team handball results: home advantage, team fitness and prediction of match outcomes. arXiv preprint arXiv:1207.0700 . Tomy and Veena [2022] Tomy, L. and G. Veena. 2022. A retrospective study on Skellam and related distributions. Austrian Journal of Statistics 51(1): 102–111 . Van Eetvelde et al. [2023] Van Eetvelde, H., L.M. Hvattum, and C. Ley. 2023. The probabilistic final standing calculator: a fair stochastic tool to handle abruptly stopped football seasons. AStA Advances in Statistical Analysis 107(1-2): 251–269 . Volossovitch and Debanne [2021] Volossovitch, A. and T. Debanne. 2021. Home advantage in handball. Home Advantage in Sport: Causes and the Effect on Performance: 220–227 . Singh, A., P. Scarf, and R. Baker. 2023. A unified theory for bivariate scores in possessive ball-sports: The case of handball. European Journal of Operational Research 304(3): 1099–1112 . Skellam [1946] Skellam, J. 1946. The frequency distribution of the difference between two Poisson variates belonging to different populations. Journal of the Royal Statistical Society. Series A 109(3): 296–296 . Smiatek and Heuer [2012] Smiatek, J. and A. Heuer. 2012. A statistical view on team handball results: home advantage, team fitness and prediction of match outcomes. arXiv preprint arXiv:1207.0700 . Tomy and Veena [2022] Tomy, L. and G. Veena. 2022. A retrospective study on Skellam and related distributions. Austrian Journal of Statistics 51(1): 102–111 . Van Eetvelde et al. [2023] Van Eetvelde, H., L.M. Hvattum, and C. Ley. 2023. The probabilistic final standing calculator: a fair stochastic tool to handle abruptly stopped football seasons. AStA Advances in Statistical Analysis 107(1-2): 251–269 . Volossovitch and Debanne [2021] Volossovitch, A. and T. Debanne. 2021. Home advantage in handball. Home Advantage in Sport: Causes and the Effect on Performance: 220–227 . Skellam, J. 1946. The frequency distribution of the difference between two Poisson variates belonging to different populations. Journal of the Royal Statistical Society. Series A 109(3): 296–296 . Smiatek and Heuer [2012] Smiatek, J. and A. Heuer. 2012. A statistical view on team handball results: home advantage, team fitness and prediction of match outcomes. arXiv preprint arXiv:1207.0700 . Tomy and Veena [2022] Tomy, L. and G. Veena. 2022. A retrospective study on Skellam and related distributions. Austrian Journal of Statistics 51(1): 102–111 . Van Eetvelde et al. [2023] Van Eetvelde, H., L.M. Hvattum, and C. Ley. 2023. The probabilistic final standing calculator: a fair stochastic tool to handle abruptly stopped football seasons. AStA Advances in Statistical Analysis 107(1-2): 251–269 . Volossovitch and Debanne [2021] Volossovitch, A. and T. Debanne. 2021. Home advantage in handball. Home Advantage in Sport: Causes and the Effect on Performance: 220–227 . Smiatek, J. and A. Heuer. 2012. A statistical view on team handball results: home advantage, team fitness and prediction of match outcomes. arXiv preprint arXiv:1207.0700 . Tomy and Veena [2022] Tomy, L. and G. Veena. 2022. A retrospective study on Skellam and related distributions. Austrian Journal of Statistics 51(1): 102–111 . Van Eetvelde et al. [2023] Van Eetvelde, H., L.M. Hvattum, and C. Ley. 2023. The probabilistic final standing calculator: a fair stochastic tool to handle abruptly stopped football seasons. AStA Advances in Statistical Analysis 107(1-2): 251–269 . Volossovitch and Debanne [2021] Volossovitch, A. and T. Debanne. 2021. Home advantage in handball. Home Advantage in Sport: Causes and the Effect on Performance: 220–227 . Tomy, L. and G. Veena. 2022. A retrospective study on Skellam and related distributions. Austrian Journal of Statistics 51(1): 102–111 . Van Eetvelde et al. [2023] Van Eetvelde, H., L.M. Hvattum, and C. Ley. 2023. The probabilistic final standing calculator: a fair stochastic tool to handle abruptly stopped football seasons. AStA Advances in Statistical Analysis 107(1-2): 251–269 . Volossovitch and Debanne [2021] Volossovitch, A. and T. Debanne. 2021. Home advantage in handball. Home Advantage in Sport: Causes and the Effect on Performance: 220–227 . Van Eetvelde, H., L.M. Hvattum, and C. Ley. 2023. The probabilistic final standing calculator: a fair stochastic tool to handle abruptly stopped football seasons. AStA Advances in Statistical Analysis 107(1-2): 251–269 . Volossovitch and Debanne [2021] Volossovitch, A. and T. Debanne. 2021. Home advantage in handball. Home Advantage in Sport: Causes and the Effect on Performance: 220–227 . Volossovitch, A. and T. Debanne. 2021. Home advantage in handball. Home Advantage in Sport: Causes and the Effect on Performance: 220–227 .
- Felice, F. 2023. Ranking handball teams from statistical strength estimation. arXiv preprint arXiv:2307.06754 . Felice and Ley [2023] Felice, F. and C. Ley. 2023. Prediction of handball matches with statistically enhanced learning via estimated team strengths. arXiv preprint arXiv:2307.11777 . Groll et al. [2020] Groll, A., J. Heiner, G. Schauberger, and J. Uhrmeister. 2020. Prediction of the 2019 IHF World Men’s Handball Championship–a sparse Gaussian approximation model. Journal of Sports Analytics 6(3): 187–197 . Holmes and McHale [2024] Holmes, B. and I.G. McHale. 2024. Forecasting football match results using a player rating based model. International Journal of Forecasting 40(1): 302–312 . Irwin [1937] Irwin, J.O. 1937. The frequency distribution of the difference between two independent variates following the same Poisson distribution. Journal of the Royal Statistical Society 100(3): 415–416 . Jiang et al. [2014] Jiang, L., K. Mao, and R. Wu. 2014. A Skellam model to identify differential patterns of gene expression induced by environmental signals. BMC Genomics 15(1): 1–9 . Karlis and Mamode Khan [2023] Karlis, D. and N. Mamode Khan. 2023. Models for integer data. Annual Review of Statistics and its Application 10: 297–323 . Karlis and Ntzoufras [2006] Karlis, D. and I. Ntzoufras. 2006. Bayesian analysis of the differences of count data. Statistics in Medicine 25(11): 1885–1905 . Koopman et al. [2017] Koopman, S.J., R. Lit, and A. Lucas. 2017. Intraday stochastic volatility in discrete price changes: the dynamic Skellam model. Journal of the American Statistical Association 112(520): 1490–1503 . Lago-Peñas et al. [2013] Lago-Peñas, C., M.A. Gomez, J. Viaño, and I. González-García. 2013. Home advantage in elite handball: the impact of the quality of opposition on team performance. International Journal of Performance Analysis in Sport 13(3): 724–733 . Maher [1982] Maher, M.J. 1982. Modelling association football scores. Statistica Neerlandica 36(3): 109–118 . McHale and Scarf [2007] McHale, I. and P. Scarf. 2007. Modelling soccer matches using bivariate discrete distributions with general dependence structure. Statistica Neerlandica 61(4): 432–445 . Michels et al. [2023] Michels, R., M. Ötting, and D. Karlis. 2023. Extending the Dixon and Coles model: an application to women’s football data. arXiv preprint arXiv:2307.02139 . Michels et al. [2023] Michels, R., M. Ötting, and R. Langrock. 2023. Bettors’ reaction to match dynamics: Evidence from in-game betting. European Journal of Operational Research 310(3): 1118–1127 . Ntzoufras et al. [2021] Ntzoufras, I., V. Palaskas, and S. Drikos. 2021. Bayesian models for prediction of the set-difference in volleyball. IMA Journal of Management Mathematics 32(4): 491–518 . Ötting et al. [2024] Ötting, M., R. Michels, R. Langrock, and C. Deutscher. 2024. Demand for live betting: An analysis using state-space models. Applied Stochastic Models in Business and Industry . Pelechrinis and Winston [2021] Pelechrinis, K. and W. Winston. 2021. A Skellam regression model for quantifying positional value in soccer. Journal of Quantitative Analysis in Sports 17(3): 187–201 . Prieto et al. [2016] Prieto, J., M.Á. Gómez, A. Volossovitch, and J. Sampaio. 2016. Effects of team timeouts on the teams’ scoring performance in elite handball close games. Kinesiology 48(1.): 115–123 . Singh et al. [2023] Singh, A., P. Scarf, and R. Baker. 2023. A unified theory for bivariate scores in possessive ball-sports: The case of handball. European Journal of Operational Research 304(3): 1099–1112 . Skellam [1946] Skellam, J. 1946. The frequency distribution of the difference between two Poisson variates belonging to different populations. Journal of the Royal Statistical Society. Series A 109(3): 296–296 . Smiatek and Heuer [2012] Smiatek, J. and A. Heuer. 2012. A statistical view on team handball results: home advantage, team fitness and prediction of match outcomes. arXiv preprint arXiv:1207.0700 . Tomy and Veena [2022] Tomy, L. and G. Veena. 2022. A retrospective study on Skellam and related distributions. Austrian Journal of Statistics 51(1): 102–111 . Van Eetvelde et al. [2023] Van Eetvelde, H., L.M. Hvattum, and C. Ley. 2023. The probabilistic final standing calculator: a fair stochastic tool to handle abruptly stopped football seasons. AStA Advances in Statistical Analysis 107(1-2): 251–269 . Volossovitch and Debanne [2021] Volossovitch, A. and T. Debanne. 2021. Home advantage in handball. Home Advantage in Sport: Causes and the Effect on Performance: 220–227 . Felice, F. and C. Ley. 2023. Prediction of handball matches with statistically enhanced learning via estimated team strengths. arXiv preprint arXiv:2307.11777 . Groll et al. [2020] Groll, A., J. Heiner, G. Schauberger, and J. Uhrmeister. 2020. Prediction of the 2019 IHF World Men’s Handball Championship–a sparse Gaussian approximation model. Journal of Sports Analytics 6(3): 187–197 . Holmes and McHale [2024] Holmes, B. and I.G. McHale. 2024. Forecasting football match results using a player rating based model. International Journal of Forecasting 40(1): 302–312 . Irwin [1937] Irwin, J.O. 1937. The frequency distribution of the difference between two independent variates following the same Poisson distribution. Journal of the Royal Statistical Society 100(3): 415–416 . Jiang et al. [2014] Jiang, L., K. Mao, and R. Wu. 2014. A Skellam model to identify differential patterns of gene expression induced by environmental signals. BMC Genomics 15(1): 1–9 . Karlis and Mamode Khan [2023] Karlis, D. and N. Mamode Khan. 2023. Models for integer data. Annual Review of Statistics and its Application 10: 297–323 . Karlis and Ntzoufras [2006] Karlis, D. and I. Ntzoufras. 2006. Bayesian analysis of the differences of count data. Statistics in Medicine 25(11): 1885–1905 . Koopman et al. [2017] Koopman, S.J., R. Lit, and A. Lucas. 2017. Intraday stochastic volatility in discrete price changes: the dynamic Skellam model. Journal of the American Statistical Association 112(520): 1490–1503 . Lago-Peñas et al. [2013] Lago-Peñas, C., M.A. Gomez, J. Viaño, and I. González-García. 2013. Home advantage in elite handball: the impact of the quality of opposition on team performance. International Journal of Performance Analysis in Sport 13(3): 724–733 . Maher [1982] Maher, M.J. 1982. Modelling association football scores. Statistica Neerlandica 36(3): 109–118 . McHale and Scarf [2007] McHale, I. and P. Scarf. 2007. Modelling soccer matches using bivariate discrete distributions with general dependence structure. Statistica Neerlandica 61(4): 432–445 . Michels et al. [2023] Michels, R., M. Ötting, and D. Karlis. 2023. Extending the Dixon and Coles model: an application to women’s football data. arXiv preprint arXiv:2307.02139 . Michels et al. [2023] Michels, R., M. Ötting, and R. Langrock. 2023. Bettors’ reaction to match dynamics: Evidence from in-game betting. European Journal of Operational Research 310(3): 1118–1127 . Ntzoufras et al. [2021] Ntzoufras, I., V. Palaskas, and S. Drikos. 2021. Bayesian models for prediction of the set-difference in volleyball. IMA Journal of Management Mathematics 32(4): 491–518 . Ötting et al. [2024] Ötting, M., R. Michels, R. Langrock, and C. Deutscher. 2024. Demand for live betting: An analysis using state-space models. Applied Stochastic Models in Business and Industry . Pelechrinis and Winston [2021] Pelechrinis, K. and W. Winston. 2021. A Skellam regression model for quantifying positional value in soccer. Journal of Quantitative Analysis in Sports 17(3): 187–201 . Prieto et al. [2016] Prieto, J., M.Á. Gómez, A. Volossovitch, and J. Sampaio. 2016. Effects of team timeouts on the teams’ scoring performance in elite handball close games. Kinesiology 48(1.): 115–123 . Singh et al. [2023] Singh, A., P. Scarf, and R. Baker. 2023. A unified theory for bivariate scores in possessive ball-sports: The case of handball. European Journal of Operational Research 304(3): 1099–1112 . Skellam [1946] Skellam, J. 1946. The frequency distribution of the difference between two Poisson variates belonging to different populations. Journal of the Royal Statistical Society. Series A 109(3): 296–296 . Smiatek and Heuer [2012] Smiatek, J. and A. Heuer. 2012. A statistical view on team handball results: home advantage, team fitness and prediction of match outcomes. arXiv preprint arXiv:1207.0700 . Tomy and Veena [2022] Tomy, L. and G. Veena. 2022. A retrospective study on Skellam and related distributions. Austrian Journal of Statistics 51(1): 102–111 . Van Eetvelde et al. [2023] Van Eetvelde, H., L.M. Hvattum, and C. Ley. 2023. The probabilistic final standing calculator: a fair stochastic tool to handle abruptly stopped football seasons. AStA Advances in Statistical Analysis 107(1-2): 251–269 . Volossovitch and Debanne [2021] Volossovitch, A. and T. Debanne. 2021. Home advantage in handball. Home Advantage in Sport: Causes and the Effect on Performance: 220–227 . Groll, A., J. Heiner, G. Schauberger, and J. Uhrmeister. 2020. Prediction of the 2019 IHF World Men’s Handball Championship–a sparse Gaussian approximation model. Journal of Sports Analytics 6(3): 187–197 . Holmes and McHale [2024] Holmes, B. and I.G. McHale. 2024. Forecasting football match results using a player rating based model. International Journal of Forecasting 40(1): 302–312 . Irwin [1937] Irwin, J.O. 1937. The frequency distribution of the difference between two independent variates following the same Poisson distribution. Journal of the Royal Statistical Society 100(3): 415–416 . Jiang et al. [2014] Jiang, L., K. Mao, and R. Wu. 2014. A Skellam model to identify differential patterns of gene expression induced by environmental signals. BMC Genomics 15(1): 1–9 . Karlis and Mamode Khan [2023] Karlis, D. and N. Mamode Khan. 2023. Models for integer data. Annual Review of Statistics and its Application 10: 297–323 . Karlis and Ntzoufras [2006] Karlis, D. and I. Ntzoufras. 2006. Bayesian analysis of the differences of count data. Statistics in Medicine 25(11): 1885–1905 . Koopman et al. [2017] Koopman, S.J., R. Lit, and A. Lucas. 2017. Intraday stochastic volatility in discrete price changes: the dynamic Skellam model. Journal of the American Statistical Association 112(520): 1490–1503 . Lago-Peñas et al. [2013] Lago-Peñas, C., M.A. Gomez, J. Viaño, and I. González-García. 2013. Home advantage in elite handball: the impact of the quality of opposition on team performance. International Journal of Performance Analysis in Sport 13(3): 724–733 . Maher [1982] Maher, M.J. 1982. Modelling association football scores. Statistica Neerlandica 36(3): 109–118 . McHale and Scarf [2007] McHale, I. and P. Scarf. 2007. Modelling soccer matches using bivariate discrete distributions with general dependence structure. Statistica Neerlandica 61(4): 432–445 . Michels et al. [2023] Michels, R., M. Ötting, and D. Karlis. 2023. Extending the Dixon and Coles model: an application to women’s football data. arXiv preprint arXiv:2307.02139 . Michels et al. [2023] Michels, R., M. Ötting, and R. Langrock. 2023. Bettors’ reaction to match dynamics: Evidence from in-game betting. European Journal of Operational Research 310(3): 1118–1127 . Ntzoufras et al. [2021] Ntzoufras, I., V. Palaskas, and S. Drikos. 2021. Bayesian models for prediction of the set-difference in volleyball. IMA Journal of Management Mathematics 32(4): 491–518 . Ötting et al. [2024] Ötting, M., R. Michels, R. Langrock, and C. Deutscher. 2024. Demand for live betting: An analysis using state-space models. Applied Stochastic Models in Business and Industry . Pelechrinis and Winston [2021] Pelechrinis, K. and W. Winston. 2021. A Skellam regression model for quantifying positional value in soccer. Journal of Quantitative Analysis in Sports 17(3): 187–201 . Prieto et al. [2016] Prieto, J., M.Á. Gómez, A. Volossovitch, and J. Sampaio. 2016. Effects of team timeouts on the teams’ scoring performance in elite handball close games. Kinesiology 48(1.): 115–123 . Singh et al. [2023] Singh, A., P. Scarf, and R. Baker. 2023. A unified theory for bivariate scores in possessive ball-sports: The case of handball. European Journal of Operational Research 304(3): 1099–1112 . Skellam [1946] Skellam, J. 1946. The frequency distribution of the difference between two Poisson variates belonging to different populations. Journal of the Royal Statistical Society. Series A 109(3): 296–296 . Smiatek and Heuer [2012] Smiatek, J. and A. Heuer. 2012. A statistical view on team handball results: home advantage, team fitness and prediction of match outcomes. arXiv preprint arXiv:1207.0700 . Tomy and Veena [2022] Tomy, L. and G. Veena. 2022. A retrospective study on Skellam and related distributions. Austrian Journal of Statistics 51(1): 102–111 . Van Eetvelde et al. [2023] Van Eetvelde, H., L.M. Hvattum, and C. Ley. 2023. The probabilistic final standing calculator: a fair stochastic tool to handle abruptly stopped football seasons. AStA Advances in Statistical Analysis 107(1-2): 251–269 . Volossovitch and Debanne [2021] Volossovitch, A. and T. Debanne. 2021. Home advantage in handball. Home Advantage in Sport: Causes and the Effect on Performance: 220–227 . Holmes, B. and I.G. McHale. 2024. Forecasting football match results using a player rating based model. International Journal of Forecasting 40(1): 302–312 . Irwin [1937] Irwin, J.O. 1937. The frequency distribution of the difference between two independent variates following the same Poisson distribution. Journal of the Royal Statistical Society 100(3): 415–416 . Jiang et al. [2014] Jiang, L., K. Mao, and R. Wu. 2014. A Skellam model to identify differential patterns of gene expression induced by environmental signals. BMC Genomics 15(1): 1–9 . Karlis and Mamode Khan [2023] Karlis, D. and N. Mamode Khan. 2023. Models for integer data. Annual Review of Statistics and its Application 10: 297–323 . Karlis and Ntzoufras [2006] Karlis, D. and I. Ntzoufras. 2006. Bayesian analysis of the differences of count data. Statistics in Medicine 25(11): 1885–1905 . Koopman et al. [2017] Koopman, S.J., R. Lit, and A. Lucas. 2017. Intraday stochastic volatility in discrete price changes: the dynamic Skellam model. Journal of the American Statistical Association 112(520): 1490–1503 . Lago-Peñas et al. [2013] Lago-Peñas, C., M.A. Gomez, J. Viaño, and I. González-García. 2013. Home advantage in elite handball: the impact of the quality of opposition on team performance. International Journal of Performance Analysis in Sport 13(3): 724–733 . Maher [1982] Maher, M.J. 1982. Modelling association football scores. Statistica Neerlandica 36(3): 109–118 . McHale and Scarf [2007] McHale, I. and P. Scarf. 2007. Modelling soccer matches using bivariate discrete distributions with general dependence structure. Statistica Neerlandica 61(4): 432–445 . Michels et al. [2023] Michels, R., M. Ötting, and D. Karlis. 2023. Extending the Dixon and Coles model: an application to women’s football data. arXiv preprint arXiv:2307.02139 . Michels et al. [2023] Michels, R., M. Ötting, and R. Langrock. 2023. Bettors’ reaction to match dynamics: Evidence from in-game betting. European Journal of Operational Research 310(3): 1118–1127 . Ntzoufras et al. [2021] Ntzoufras, I., V. Palaskas, and S. Drikos. 2021. Bayesian models for prediction of the set-difference in volleyball. IMA Journal of Management Mathematics 32(4): 491–518 . Ötting et al. [2024] Ötting, M., R. Michels, R. Langrock, and C. Deutscher. 2024. Demand for live betting: An analysis using state-space models. Applied Stochastic Models in Business and Industry . Pelechrinis and Winston [2021] Pelechrinis, K. and W. Winston. 2021. A Skellam regression model for quantifying positional value in soccer. Journal of Quantitative Analysis in Sports 17(3): 187–201 . Prieto et al. [2016] Prieto, J., M.Á. Gómez, A. Volossovitch, and J. Sampaio. 2016. Effects of team timeouts on the teams’ scoring performance in elite handball close games. Kinesiology 48(1.): 115–123 . Singh et al. [2023] Singh, A., P. Scarf, and R. Baker. 2023. A unified theory for bivariate scores in possessive ball-sports: The case of handball. European Journal of Operational Research 304(3): 1099–1112 . Skellam [1946] Skellam, J. 1946. The frequency distribution of the difference between two Poisson variates belonging to different populations. Journal of the Royal Statistical Society. Series A 109(3): 296–296 . Smiatek and Heuer [2012] Smiatek, J. and A. Heuer. 2012. A statistical view on team handball results: home advantage, team fitness and prediction of match outcomes. arXiv preprint arXiv:1207.0700 . Tomy and Veena [2022] Tomy, L. and G. Veena. 2022. A retrospective study on Skellam and related distributions. Austrian Journal of Statistics 51(1): 102–111 . Van Eetvelde et al. [2023] Van Eetvelde, H., L.M. Hvattum, and C. Ley. 2023. The probabilistic final standing calculator: a fair stochastic tool to handle abruptly stopped football seasons. AStA Advances in Statistical Analysis 107(1-2): 251–269 . Volossovitch and Debanne [2021] Volossovitch, A. and T. Debanne. 2021. Home advantage in handball. Home Advantage in Sport: Causes and the Effect on Performance: 220–227 . Irwin, J.O. 1937. The frequency distribution of the difference between two independent variates following the same Poisson distribution. Journal of the Royal Statistical Society 100(3): 415–416 . Jiang et al. [2014] Jiang, L., K. Mao, and R. Wu. 2014. A Skellam model to identify differential patterns of gene expression induced by environmental signals. BMC Genomics 15(1): 1–9 . Karlis and Mamode Khan [2023] Karlis, D. and N. Mamode Khan. 2023. Models for integer data. Annual Review of Statistics and its Application 10: 297–323 . Karlis and Ntzoufras [2006] Karlis, D. and I. Ntzoufras. 2006. Bayesian analysis of the differences of count data. Statistics in Medicine 25(11): 1885–1905 . Koopman et al. [2017] Koopman, S.J., R. Lit, and A. Lucas. 2017. Intraday stochastic volatility in discrete price changes: the dynamic Skellam model. Journal of the American Statistical Association 112(520): 1490–1503 . Lago-Peñas et al. [2013] Lago-Peñas, C., M.A. Gomez, J. Viaño, and I. González-García. 2013. Home advantage in elite handball: the impact of the quality of opposition on team performance. International Journal of Performance Analysis in Sport 13(3): 724–733 . Maher [1982] Maher, M.J. 1982. Modelling association football scores. Statistica Neerlandica 36(3): 109–118 . McHale and Scarf [2007] McHale, I. and P. Scarf. 2007. Modelling soccer matches using bivariate discrete distributions with general dependence structure. Statistica Neerlandica 61(4): 432–445 . Michels et al. [2023] Michels, R., M. Ötting, and D. Karlis. 2023. Extending the Dixon and Coles model: an application to women’s football data. arXiv preprint arXiv:2307.02139 . Michels et al. [2023] Michels, R., M. Ötting, and R. Langrock. 2023. Bettors’ reaction to match dynamics: Evidence from in-game betting. European Journal of Operational Research 310(3): 1118–1127 . Ntzoufras et al. [2021] Ntzoufras, I., V. Palaskas, and S. Drikos. 2021. Bayesian models for prediction of the set-difference in volleyball. IMA Journal of Management Mathematics 32(4): 491–518 . Ötting et al. [2024] Ötting, M., R. Michels, R. Langrock, and C. Deutscher. 2024. Demand for live betting: An analysis using state-space models. Applied Stochastic Models in Business and Industry . Pelechrinis and Winston [2021] Pelechrinis, K. and W. Winston. 2021. A Skellam regression model for quantifying positional value in soccer. Journal of Quantitative Analysis in Sports 17(3): 187–201 . Prieto et al. [2016] Prieto, J., M.Á. Gómez, A. Volossovitch, and J. Sampaio. 2016. Effects of team timeouts on the teams’ scoring performance in elite handball close games. Kinesiology 48(1.): 115–123 . Singh et al. [2023] Singh, A., P. Scarf, and R. Baker. 2023. A unified theory for bivariate scores in possessive ball-sports: The case of handball. European Journal of Operational Research 304(3): 1099–1112 . Skellam [1946] Skellam, J. 1946. The frequency distribution of the difference between two Poisson variates belonging to different populations. Journal of the Royal Statistical Society. Series A 109(3): 296–296 . Smiatek and Heuer [2012] Smiatek, J. and A. Heuer. 2012. A statistical view on team handball results: home advantage, team fitness and prediction of match outcomes. arXiv preprint arXiv:1207.0700 . Tomy and Veena [2022] Tomy, L. and G. Veena. 2022. A retrospective study on Skellam and related distributions. Austrian Journal of Statistics 51(1): 102–111 . Van Eetvelde et al. [2023] Van Eetvelde, H., L.M. Hvattum, and C. Ley. 2023. The probabilistic final standing calculator: a fair stochastic tool to handle abruptly stopped football seasons. AStA Advances in Statistical Analysis 107(1-2): 251–269 . Volossovitch and Debanne [2021] Volossovitch, A. and T. Debanne. 2021. Home advantage in handball. Home Advantage in Sport: Causes and the Effect on Performance: 220–227 . Jiang, L., K. Mao, and R. Wu. 2014. A Skellam model to identify differential patterns of gene expression induced by environmental signals. BMC Genomics 15(1): 1–9 . Karlis and Mamode Khan [2023] Karlis, D. and N. Mamode Khan. 2023. Models for integer data. Annual Review of Statistics and its Application 10: 297–323 . Karlis and Ntzoufras [2006] Karlis, D. and I. Ntzoufras. 2006. Bayesian analysis of the differences of count data. Statistics in Medicine 25(11): 1885–1905 . Koopman et al. [2017] Koopman, S.J., R. Lit, and A. Lucas. 2017. Intraday stochastic volatility in discrete price changes: the dynamic Skellam model. Journal of the American Statistical Association 112(520): 1490–1503 . Lago-Peñas et al. [2013] Lago-Peñas, C., M.A. Gomez, J. Viaño, and I. González-García. 2013. Home advantage in elite handball: the impact of the quality of opposition on team performance. International Journal of Performance Analysis in Sport 13(3): 724–733 . Maher [1982] Maher, M.J. 1982. Modelling association football scores. Statistica Neerlandica 36(3): 109–118 . McHale and Scarf [2007] McHale, I. and P. Scarf. 2007. Modelling soccer matches using bivariate discrete distributions with general dependence structure. Statistica Neerlandica 61(4): 432–445 . Michels et al. [2023] Michels, R., M. Ötting, and D. Karlis. 2023. Extending the Dixon and Coles model: an application to women’s football data. arXiv preprint arXiv:2307.02139 . Michels et al. [2023] Michels, R., M. Ötting, and R. Langrock. 2023. Bettors’ reaction to match dynamics: Evidence from in-game betting. European Journal of Operational Research 310(3): 1118–1127 . Ntzoufras et al. [2021] Ntzoufras, I., V. Palaskas, and S. Drikos. 2021. Bayesian models for prediction of the set-difference in volleyball. IMA Journal of Management Mathematics 32(4): 491–518 . Ötting et al. [2024] Ötting, M., R. Michels, R. Langrock, and C. Deutscher. 2024. Demand for live betting: An analysis using state-space models. Applied Stochastic Models in Business and Industry . Pelechrinis and Winston [2021] Pelechrinis, K. and W. Winston. 2021. A Skellam regression model for quantifying positional value in soccer. Journal of Quantitative Analysis in Sports 17(3): 187–201 . Prieto et al. [2016] Prieto, J., M.Á. Gómez, A. Volossovitch, and J. Sampaio. 2016. Effects of team timeouts on the teams’ scoring performance in elite handball close games. Kinesiology 48(1.): 115–123 . Singh et al. [2023] Singh, A., P. Scarf, and R. Baker. 2023. A unified theory for bivariate scores in possessive ball-sports: The case of handball. European Journal of Operational Research 304(3): 1099–1112 . Skellam [1946] Skellam, J. 1946. The frequency distribution of the difference between two Poisson variates belonging to different populations. Journal of the Royal Statistical Society. Series A 109(3): 296–296 . Smiatek and Heuer [2012] Smiatek, J. and A. Heuer. 2012. A statistical view on team handball results: home advantage, team fitness and prediction of match outcomes. arXiv preprint arXiv:1207.0700 . Tomy and Veena [2022] Tomy, L. and G. Veena. 2022. A retrospective study on Skellam and related distributions. Austrian Journal of Statistics 51(1): 102–111 . Van Eetvelde et al. [2023] Van Eetvelde, H., L.M. Hvattum, and C. Ley. 2023. The probabilistic final standing calculator: a fair stochastic tool to handle abruptly stopped football seasons. AStA Advances in Statistical Analysis 107(1-2): 251–269 . Volossovitch and Debanne [2021] Volossovitch, A. and T. Debanne. 2021. Home advantage in handball. Home Advantage in Sport: Causes and the Effect on Performance: 220–227 . Karlis, D. and N. Mamode Khan. 2023. Models for integer data. Annual Review of Statistics and its Application 10: 297–323 . Karlis and Ntzoufras [2006] Karlis, D. and I. Ntzoufras. 2006. Bayesian analysis of the differences of count data. Statistics in Medicine 25(11): 1885–1905 . Koopman et al. [2017] Koopman, S.J., R. Lit, and A. Lucas. 2017. Intraday stochastic volatility in discrete price changes: the dynamic Skellam model. Journal of the American Statistical Association 112(520): 1490–1503 . Lago-Peñas et al. [2013] Lago-Peñas, C., M.A. Gomez, J. Viaño, and I. González-García. 2013. Home advantage in elite handball: the impact of the quality of opposition on team performance. International Journal of Performance Analysis in Sport 13(3): 724–733 . Maher [1982] Maher, M.J. 1982. Modelling association football scores. Statistica Neerlandica 36(3): 109–118 . McHale and Scarf [2007] McHale, I. and P. Scarf. 2007. Modelling soccer matches using bivariate discrete distributions with general dependence structure. Statistica Neerlandica 61(4): 432–445 . Michels et al. [2023] Michels, R., M. Ötting, and D. Karlis. 2023. Extending the Dixon and Coles model: an application to women’s football data. arXiv preprint arXiv:2307.02139 . Michels et al. [2023] Michels, R., M. Ötting, and R. Langrock. 2023. Bettors’ reaction to match dynamics: Evidence from in-game betting. European Journal of Operational Research 310(3): 1118–1127 . Ntzoufras et al. [2021] Ntzoufras, I., V. Palaskas, and S. Drikos. 2021. Bayesian models for prediction of the set-difference in volleyball. IMA Journal of Management Mathematics 32(4): 491–518 . Ötting et al. [2024] Ötting, M., R. Michels, R. Langrock, and C. Deutscher. 2024. Demand for live betting: An analysis using state-space models. Applied Stochastic Models in Business and Industry . Pelechrinis and Winston [2021] Pelechrinis, K. and W. Winston. 2021. A Skellam regression model for quantifying positional value in soccer. Journal of Quantitative Analysis in Sports 17(3): 187–201 . Prieto et al. [2016] Prieto, J., M.Á. Gómez, A. Volossovitch, and J. Sampaio. 2016. Effects of team timeouts on the teams’ scoring performance in elite handball close games. Kinesiology 48(1.): 115–123 . Singh et al. [2023] Singh, A., P. Scarf, and R. Baker. 2023. A unified theory for bivariate scores in possessive ball-sports: The case of handball. European Journal of Operational Research 304(3): 1099–1112 . Skellam [1946] Skellam, J. 1946. The frequency distribution of the difference between two Poisson variates belonging to different populations. Journal of the Royal Statistical Society. Series A 109(3): 296–296 . Smiatek and Heuer [2012] Smiatek, J. and A. Heuer. 2012. A statistical view on team handball results: home advantage, team fitness and prediction of match outcomes. arXiv preprint arXiv:1207.0700 . Tomy and Veena [2022] Tomy, L. and G. Veena. 2022. A retrospective study on Skellam and related distributions. Austrian Journal of Statistics 51(1): 102–111 . Van Eetvelde et al. [2023] Van Eetvelde, H., L.M. Hvattum, and C. Ley. 2023. The probabilistic final standing calculator: a fair stochastic tool to handle abruptly stopped football seasons. AStA Advances in Statistical Analysis 107(1-2): 251–269 . Volossovitch and Debanne [2021] Volossovitch, A. and T. Debanne. 2021. Home advantage in handball. Home Advantage in Sport: Causes and the Effect on Performance: 220–227 . Karlis, D. and I. Ntzoufras. 2006. Bayesian analysis of the differences of count data. Statistics in Medicine 25(11): 1885–1905 . Koopman et al. [2017] Koopman, S.J., R. Lit, and A. Lucas. 2017. Intraday stochastic volatility in discrete price changes: the dynamic Skellam model. Journal of the American Statistical Association 112(520): 1490–1503 . Lago-Peñas et al. [2013] Lago-Peñas, C., M.A. Gomez, J. Viaño, and I. González-García. 2013. Home advantage in elite handball: the impact of the quality of opposition on team performance. International Journal of Performance Analysis in Sport 13(3): 724–733 . Maher [1982] Maher, M.J. 1982. Modelling association football scores. Statistica Neerlandica 36(3): 109–118 . McHale and Scarf [2007] McHale, I. and P. Scarf. 2007. Modelling soccer matches using bivariate discrete distributions with general dependence structure. Statistica Neerlandica 61(4): 432–445 . Michels et al. [2023] Michels, R., M. Ötting, and D. Karlis. 2023. Extending the Dixon and Coles model: an application to women’s football data. arXiv preprint arXiv:2307.02139 . Michels et al. [2023] Michels, R., M. Ötting, and R. Langrock. 2023. Bettors’ reaction to match dynamics: Evidence from in-game betting. European Journal of Operational Research 310(3): 1118–1127 . Ntzoufras et al. [2021] Ntzoufras, I., V. Palaskas, and S. Drikos. 2021. Bayesian models for prediction of the set-difference in volleyball. IMA Journal of Management Mathematics 32(4): 491–518 . Ötting et al. [2024] Ötting, M., R. Michels, R. Langrock, and C. Deutscher. 2024. Demand for live betting: An analysis using state-space models. Applied Stochastic Models in Business and Industry . Pelechrinis and Winston [2021] Pelechrinis, K. and W. Winston. 2021. A Skellam regression model for quantifying positional value in soccer. Journal of Quantitative Analysis in Sports 17(3): 187–201 . Prieto et al. [2016] Prieto, J., M.Á. Gómez, A. Volossovitch, and J. Sampaio. 2016. Effects of team timeouts on the teams’ scoring performance in elite handball close games. Kinesiology 48(1.): 115–123 . Singh et al. [2023] Singh, A., P. Scarf, and R. Baker. 2023. A unified theory for bivariate scores in possessive ball-sports: The case of handball. European Journal of Operational Research 304(3): 1099–1112 . Skellam [1946] Skellam, J. 1946. The frequency distribution of the difference between two Poisson variates belonging to different populations. Journal of the Royal Statistical Society. Series A 109(3): 296–296 . Smiatek and Heuer [2012] Smiatek, J. and A. Heuer. 2012. A statistical view on team handball results: home advantage, team fitness and prediction of match outcomes. arXiv preprint arXiv:1207.0700 . Tomy and Veena [2022] Tomy, L. and G. Veena. 2022. A retrospective study on Skellam and related distributions. Austrian Journal of Statistics 51(1): 102–111 . Van Eetvelde et al. [2023] Van Eetvelde, H., L.M. Hvattum, and C. Ley. 2023. The probabilistic final standing calculator: a fair stochastic tool to handle abruptly stopped football seasons. AStA Advances in Statistical Analysis 107(1-2): 251–269 . Volossovitch and Debanne [2021] Volossovitch, A. and T. Debanne. 2021. Home advantage in handball. Home Advantage in Sport: Causes and the Effect on Performance: 220–227 . Koopman, S.J., R. Lit, and A. Lucas. 2017. Intraday stochastic volatility in discrete price changes: the dynamic Skellam model. Journal of the American Statistical Association 112(520): 1490–1503 . Lago-Peñas et al. [2013] Lago-Peñas, C., M.A. Gomez, J. Viaño, and I. González-García. 2013. Home advantage in elite handball: the impact of the quality of opposition on team performance. International Journal of Performance Analysis in Sport 13(3): 724–733 . Maher [1982] Maher, M.J. 1982. Modelling association football scores. Statistica Neerlandica 36(3): 109–118 . McHale and Scarf [2007] McHale, I. and P. Scarf. 2007. Modelling soccer matches using bivariate discrete distributions with general dependence structure. Statistica Neerlandica 61(4): 432–445 . Michels et al. [2023] Michels, R., M. Ötting, and D. Karlis. 2023. Extending the Dixon and Coles model: an application to women’s football data. arXiv preprint arXiv:2307.02139 . Michels et al. [2023] Michels, R., M. Ötting, and R. Langrock. 2023. Bettors’ reaction to match dynamics: Evidence from in-game betting. European Journal of Operational Research 310(3): 1118–1127 . Ntzoufras et al. [2021] Ntzoufras, I., V. Palaskas, and S. Drikos. 2021. Bayesian models for prediction of the set-difference in volleyball. IMA Journal of Management Mathematics 32(4): 491–518 . Ötting et al. [2024] Ötting, M., R. Michels, R. Langrock, and C. Deutscher. 2024. Demand for live betting: An analysis using state-space models. Applied Stochastic Models in Business and Industry . Pelechrinis and Winston [2021] Pelechrinis, K. and W. Winston. 2021. A Skellam regression model for quantifying positional value in soccer. Journal of Quantitative Analysis in Sports 17(3): 187–201 . Prieto et al. [2016] Prieto, J., M.Á. Gómez, A. Volossovitch, and J. Sampaio. 2016. Effects of team timeouts on the teams’ scoring performance in elite handball close games. Kinesiology 48(1.): 115–123 . Singh et al. [2023] Singh, A., P. Scarf, and R. Baker. 2023. A unified theory for bivariate scores in possessive ball-sports: The case of handball. European Journal of Operational Research 304(3): 1099–1112 . Skellam [1946] Skellam, J. 1946. The frequency distribution of the difference between two Poisson variates belonging to different populations. Journal of the Royal Statistical Society. Series A 109(3): 296–296 . Smiatek and Heuer [2012] Smiatek, J. and A. Heuer. 2012. A statistical view on team handball results: home advantage, team fitness and prediction of match outcomes. arXiv preprint arXiv:1207.0700 . Tomy and Veena [2022] Tomy, L. and G. Veena. 2022. A retrospective study on Skellam and related distributions. Austrian Journal of Statistics 51(1): 102–111 . Van Eetvelde et al. [2023] Van Eetvelde, H., L.M. Hvattum, and C. Ley. 2023. The probabilistic final standing calculator: a fair stochastic tool to handle abruptly stopped football seasons. AStA Advances in Statistical Analysis 107(1-2): 251–269 . Volossovitch and Debanne [2021] Volossovitch, A. and T. Debanne. 2021. Home advantage in handball. Home Advantage in Sport: Causes and the Effect on Performance: 220–227 . Lago-Peñas, C., M.A. Gomez, J. Viaño, and I. González-García. 2013. Home advantage in elite handball: the impact of the quality of opposition on team performance. International Journal of Performance Analysis in Sport 13(3): 724–733 . Maher [1982] Maher, M.J. 1982. Modelling association football scores. Statistica Neerlandica 36(3): 109–118 . McHale and Scarf [2007] McHale, I. and P. Scarf. 2007. Modelling soccer matches using bivariate discrete distributions with general dependence structure. Statistica Neerlandica 61(4): 432–445 . Michels et al. [2023] Michels, R., M. Ötting, and D. Karlis. 2023. Extending the Dixon and Coles model: an application to women’s football data. arXiv preprint arXiv:2307.02139 . Michels et al. [2023] Michels, R., M. Ötting, and R. Langrock. 2023. Bettors’ reaction to match dynamics: Evidence from in-game betting. European Journal of Operational Research 310(3): 1118–1127 . Ntzoufras et al. [2021] Ntzoufras, I., V. Palaskas, and S. Drikos. 2021. Bayesian models for prediction of the set-difference in volleyball. IMA Journal of Management Mathematics 32(4): 491–518 . Ötting et al. [2024] Ötting, M., R. Michels, R. Langrock, and C. Deutscher. 2024. Demand for live betting: An analysis using state-space models. Applied Stochastic Models in Business and Industry . Pelechrinis and Winston [2021] Pelechrinis, K. and W. Winston. 2021. A Skellam regression model for quantifying positional value in soccer. Journal of Quantitative Analysis in Sports 17(3): 187–201 . Prieto et al. [2016] Prieto, J., M.Á. Gómez, A. Volossovitch, and J. Sampaio. 2016. Effects of team timeouts on the teams’ scoring performance in elite handball close games. Kinesiology 48(1.): 115–123 . Singh et al. [2023] Singh, A., P. Scarf, and R. Baker. 2023. A unified theory for bivariate scores in possessive ball-sports: The case of handball. European Journal of Operational Research 304(3): 1099–1112 . Skellam [1946] Skellam, J. 1946. The frequency distribution of the difference between two Poisson variates belonging to different populations. Journal of the Royal Statistical Society. Series A 109(3): 296–296 . Smiatek and Heuer [2012] Smiatek, J. and A. Heuer. 2012. A statistical view on team handball results: home advantage, team fitness and prediction of match outcomes. arXiv preprint arXiv:1207.0700 . Tomy and Veena [2022] Tomy, L. and G. Veena. 2022. A retrospective study on Skellam and related distributions. Austrian Journal of Statistics 51(1): 102–111 . Van Eetvelde et al. [2023] Van Eetvelde, H., L.M. Hvattum, and C. Ley. 2023. The probabilistic final standing calculator: a fair stochastic tool to handle abruptly stopped football seasons. AStA Advances in Statistical Analysis 107(1-2): 251–269 . Volossovitch and Debanne [2021] Volossovitch, A. and T. Debanne. 2021. Home advantage in handball. Home Advantage in Sport: Causes and the Effect on Performance: 220–227 . Maher, M.J. 1982. Modelling association football scores. Statistica Neerlandica 36(3): 109–118 . McHale and Scarf [2007] McHale, I. and P. Scarf. 2007. Modelling soccer matches using bivariate discrete distributions with general dependence structure. Statistica Neerlandica 61(4): 432–445 . Michels et al. [2023] Michels, R., M. Ötting, and D. Karlis. 2023. Extending the Dixon and Coles model: an application to women’s football data. arXiv preprint arXiv:2307.02139 . Michels et al. [2023] Michels, R., M. Ötting, and R. Langrock. 2023. Bettors’ reaction to match dynamics: Evidence from in-game betting. European Journal of Operational Research 310(3): 1118–1127 . Ntzoufras et al. [2021] Ntzoufras, I., V. Palaskas, and S. Drikos. 2021. Bayesian models for prediction of the set-difference in volleyball. IMA Journal of Management Mathematics 32(4): 491–518 . Ötting et al. [2024] Ötting, M., R. Michels, R. Langrock, and C. Deutscher. 2024. Demand for live betting: An analysis using state-space models. Applied Stochastic Models in Business and Industry . Pelechrinis and Winston [2021] Pelechrinis, K. and W. Winston. 2021. A Skellam regression model for quantifying positional value in soccer. Journal of Quantitative Analysis in Sports 17(3): 187–201 . Prieto et al. [2016] Prieto, J., M.Á. Gómez, A. Volossovitch, and J. Sampaio. 2016. Effects of team timeouts on the teams’ scoring performance in elite handball close games. Kinesiology 48(1.): 115–123 . Singh et al. [2023] Singh, A., P. Scarf, and R. Baker. 2023. A unified theory for bivariate scores in possessive ball-sports: The case of handball. European Journal of Operational Research 304(3): 1099–1112 . Skellam [1946] Skellam, J. 1946. The frequency distribution of the difference between two Poisson variates belonging to different populations. Journal of the Royal Statistical Society. Series A 109(3): 296–296 . Smiatek and Heuer [2012] Smiatek, J. and A. Heuer. 2012. A statistical view on team handball results: home advantage, team fitness and prediction of match outcomes. arXiv preprint arXiv:1207.0700 . Tomy and Veena [2022] Tomy, L. and G. Veena. 2022. A retrospective study on Skellam and related distributions. Austrian Journal of Statistics 51(1): 102–111 . Van Eetvelde et al. [2023] Van Eetvelde, H., L.M. Hvattum, and C. Ley. 2023. The probabilistic final standing calculator: a fair stochastic tool to handle abruptly stopped football seasons. AStA Advances in Statistical Analysis 107(1-2): 251–269 . Volossovitch and Debanne [2021] Volossovitch, A. and T. Debanne. 2021. Home advantage in handball. Home Advantage in Sport: Causes and the Effect on Performance: 220–227 . McHale, I. and P. Scarf. 2007. Modelling soccer matches using bivariate discrete distributions with general dependence structure. Statistica Neerlandica 61(4): 432–445 . Michels et al. [2023] Michels, R., M. Ötting, and D. Karlis. 2023. Extending the Dixon and Coles model: an application to women’s football data. arXiv preprint arXiv:2307.02139 . Michels et al. [2023] Michels, R., M. Ötting, and R. Langrock. 2023. Bettors’ reaction to match dynamics: Evidence from in-game betting. European Journal of Operational Research 310(3): 1118–1127 . Ntzoufras et al. [2021] Ntzoufras, I., V. Palaskas, and S. Drikos. 2021. Bayesian models for prediction of the set-difference in volleyball. IMA Journal of Management Mathematics 32(4): 491–518 . Ötting et al. [2024] Ötting, M., R. Michels, R. Langrock, and C. Deutscher. 2024. Demand for live betting: An analysis using state-space models. Applied Stochastic Models in Business and Industry . Pelechrinis and Winston [2021] Pelechrinis, K. and W. Winston. 2021. A Skellam regression model for quantifying positional value in soccer. Journal of Quantitative Analysis in Sports 17(3): 187–201 . Prieto et al. [2016] Prieto, J., M.Á. Gómez, A. Volossovitch, and J. Sampaio. 2016. Effects of team timeouts on the teams’ scoring performance in elite handball close games. Kinesiology 48(1.): 115–123 . Singh et al. [2023] Singh, A., P. Scarf, and R. Baker. 2023. A unified theory for bivariate scores in possessive ball-sports: The case of handball. European Journal of Operational Research 304(3): 1099–1112 . Skellam [1946] Skellam, J. 1946. The frequency distribution of the difference between two Poisson variates belonging to different populations. Journal of the Royal Statistical Society. Series A 109(3): 296–296 . Smiatek and Heuer [2012] Smiatek, J. and A. Heuer. 2012. A statistical view on team handball results: home advantage, team fitness and prediction of match outcomes. arXiv preprint arXiv:1207.0700 . Tomy and Veena [2022] Tomy, L. and G. Veena. 2022. A retrospective study on Skellam and related distributions. Austrian Journal of Statistics 51(1): 102–111 . Van Eetvelde et al. [2023] Van Eetvelde, H., L.M. Hvattum, and C. Ley. 2023. The probabilistic final standing calculator: a fair stochastic tool to handle abruptly stopped football seasons. AStA Advances in Statistical Analysis 107(1-2): 251–269 . Volossovitch and Debanne [2021] Volossovitch, A. and T. Debanne. 2021. Home advantage in handball. Home Advantage in Sport: Causes and the Effect on Performance: 220–227 . Michels, R., M. Ötting, and D. Karlis. 2023. Extending the Dixon and Coles model: an application to women’s football data. arXiv preprint arXiv:2307.02139 . Michels et al. [2023] Michels, R., M. Ötting, and R. Langrock. 2023. Bettors’ reaction to match dynamics: Evidence from in-game betting. European Journal of Operational Research 310(3): 1118–1127 . Ntzoufras et al. [2021] Ntzoufras, I., V. Palaskas, and S. Drikos. 2021. Bayesian models for prediction of the set-difference in volleyball. IMA Journal of Management Mathematics 32(4): 491–518 . Ötting et al. [2024] Ötting, M., R. Michels, R. Langrock, and C. Deutscher. 2024. Demand for live betting: An analysis using state-space models. Applied Stochastic Models in Business and Industry . Pelechrinis and Winston [2021] Pelechrinis, K. and W. Winston. 2021. A Skellam regression model for quantifying positional value in soccer. Journal of Quantitative Analysis in Sports 17(3): 187–201 . Prieto et al. [2016] Prieto, J., M.Á. Gómez, A. Volossovitch, and J. Sampaio. 2016. Effects of team timeouts on the teams’ scoring performance in elite handball close games. Kinesiology 48(1.): 115–123 . Singh et al. [2023] Singh, A., P. Scarf, and R. Baker. 2023. A unified theory for bivariate scores in possessive ball-sports: The case of handball. European Journal of Operational Research 304(3): 1099–1112 . Skellam [1946] Skellam, J. 1946. The frequency distribution of the difference between two Poisson variates belonging to different populations. Journal of the Royal Statistical Society. Series A 109(3): 296–296 . Smiatek and Heuer [2012] Smiatek, J. and A. Heuer. 2012. A statistical view on team handball results: home advantage, team fitness and prediction of match outcomes. arXiv preprint arXiv:1207.0700 . Tomy and Veena [2022] Tomy, L. and G. Veena. 2022. A retrospective study on Skellam and related distributions. Austrian Journal of Statistics 51(1): 102–111 . Van Eetvelde et al. [2023] Van Eetvelde, H., L.M. Hvattum, and C. Ley. 2023. The probabilistic final standing calculator: a fair stochastic tool to handle abruptly stopped football seasons. AStA Advances in Statistical Analysis 107(1-2): 251–269 . Volossovitch and Debanne [2021] Volossovitch, A. and T. Debanne. 2021. Home advantage in handball. Home Advantage in Sport: Causes and the Effect on Performance: 220–227 . Michels, R., M. Ötting, and R. Langrock. 2023. Bettors’ reaction to match dynamics: Evidence from in-game betting. European Journal of Operational Research 310(3): 1118–1127 . Ntzoufras et al. [2021] Ntzoufras, I., V. Palaskas, and S. Drikos. 2021. Bayesian models for prediction of the set-difference in volleyball. IMA Journal of Management Mathematics 32(4): 491–518 . Ötting et al. [2024] Ötting, M., R. Michels, R. Langrock, and C. Deutscher. 2024. Demand for live betting: An analysis using state-space models. Applied Stochastic Models in Business and Industry . Pelechrinis and Winston [2021] Pelechrinis, K. and W. Winston. 2021. A Skellam regression model for quantifying positional value in soccer. Journal of Quantitative Analysis in Sports 17(3): 187–201 . Prieto et al. [2016] Prieto, J., M.Á. Gómez, A. Volossovitch, and J. Sampaio. 2016. Effects of team timeouts on the teams’ scoring performance in elite handball close games. Kinesiology 48(1.): 115–123 . Singh et al. [2023] Singh, A., P. Scarf, and R. Baker. 2023. A unified theory for bivariate scores in possessive ball-sports: The case of handball. European Journal of Operational Research 304(3): 1099–1112 . Skellam [1946] Skellam, J. 1946. The frequency distribution of the difference between two Poisson variates belonging to different populations. Journal of the Royal Statistical Society. Series A 109(3): 296–296 . Smiatek and Heuer [2012] Smiatek, J. and A. Heuer. 2012. A statistical view on team handball results: home advantage, team fitness and prediction of match outcomes. arXiv preprint arXiv:1207.0700 . Tomy and Veena [2022] Tomy, L. and G. Veena. 2022. A retrospective study on Skellam and related distributions. Austrian Journal of Statistics 51(1): 102–111 . Van Eetvelde et al. [2023] Van Eetvelde, H., L.M. Hvattum, and C. Ley. 2023. The probabilistic final standing calculator: a fair stochastic tool to handle abruptly stopped football seasons. AStA Advances in Statistical Analysis 107(1-2): 251–269 . Volossovitch and Debanne [2021] Volossovitch, A. and T. Debanne. 2021. Home advantage in handball. Home Advantage in Sport: Causes and the Effect on Performance: 220–227 . Ntzoufras, I., V. Palaskas, and S. Drikos. 2021. Bayesian models for prediction of the set-difference in volleyball. IMA Journal of Management Mathematics 32(4): 491–518 . Ötting et al. [2024] Ötting, M., R. Michels, R. Langrock, and C. Deutscher. 2024. Demand for live betting: An analysis using state-space models. Applied Stochastic Models in Business and Industry . Pelechrinis and Winston [2021] Pelechrinis, K. and W. Winston. 2021. A Skellam regression model for quantifying positional value in soccer. Journal of Quantitative Analysis in Sports 17(3): 187–201 . Prieto et al. [2016] Prieto, J., M.Á. Gómez, A. Volossovitch, and J. Sampaio. 2016. Effects of team timeouts on the teams’ scoring performance in elite handball close games. Kinesiology 48(1.): 115–123 . Singh et al. [2023] Singh, A., P. Scarf, and R. Baker. 2023. A unified theory for bivariate scores in possessive ball-sports: The case of handball. European Journal of Operational Research 304(3): 1099–1112 . Skellam [1946] Skellam, J. 1946. The frequency distribution of the difference between two Poisson variates belonging to different populations. Journal of the Royal Statistical Society. Series A 109(3): 296–296 . Smiatek and Heuer [2012] Smiatek, J. and A. Heuer. 2012. A statistical view on team handball results: home advantage, team fitness and prediction of match outcomes. arXiv preprint arXiv:1207.0700 . Tomy and Veena [2022] Tomy, L. and G. Veena. 2022. A retrospective study on Skellam and related distributions. Austrian Journal of Statistics 51(1): 102–111 . Van Eetvelde et al. [2023] Van Eetvelde, H., L.M. Hvattum, and C. Ley. 2023. The probabilistic final standing calculator: a fair stochastic tool to handle abruptly stopped football seasons. AStA Advances in Statistical Analysis 107(1-2): 251–269 . Volossovitch and Debanne [2021] Volossovitch, A. and T. Debanne. 2021. Home advantage in handball. Home Advantage in Sport: Causes and the Effect on Performance: 220–227 . Ötting, M., R. Michels, R. Langrock, and C. Deutscher. 2024. Demand for live betting: An analysis using state-space models. Applied Stochastic Models in Business and Industry . Pelechrinis and Winston [2021] Pelechrinis, K. and W. Winston. 2021. A Skellam regression model for quantifying positional value in soccer. Journal of Quantitative Analysis in Sports 17(3): 187–201 . Prieto et al. [2016] Prieto, J., M.Á. Gómez, A. Volossovitch, and J. Sampaio. 2016. Effects of team timeouts on the teams’ scoring performance in elite handball close games. Kinesiology 48(1.): 115–123 . Singh et al. [2023] Singh, A., P. Scarf, and R. Baker. 2023. A unified theory for bivariate scores in possessive ball-sports: The case of handball. European Journal of Operational Research 304(3): 1099–1112 . Skellam [1946] Skellam, J. 1946. The frequency distribution of the difference between two Poisson variates belonging to different populations. Journal of the Royal Statistical Society. Series A 109(3): 296–296 . Smiatek and Heuer [2012] Smiatek, J. and A. Heuer. 2012. A statistical view on team handball results: home advantage, team fitness and prediction of match outcomes. arXiv preprint arXiv:1207.0700 . Tomy and Veena [2022] Tomy, L. and G. Veena. 2022. A retrospective study on Skellam and related distributions. Austrian Journal of Statistics 51(1): 102–111 . Van Eetvelde et al. [2023] Van Eetvelde, H., L.M. Hvattum, and C. Ley. 2023. The probabilistic final standing calculator: a fair stochastic tool to handle abruptly stopped football seasons. AStA Advances in Statistical Analysis 107(1-2): 251–269 . Volossovitch and Debanne [2021] Volossovitch, A. and T. Debanne. 2021. Home advantage in handball. Home Advantage in Sport: Causes and the Effect on Performance: 220–227 . Pelechrinis, K. and W. Winston. 2021. A Skellam regression model for quantifying positional value in soccer. Journal of Quantitative Analysis in Sports 17(3): 187–201 . Prieto et al. [2016] Prieto, J., M.Á. Gómez, A. Volossovitch, and J. Sampaio. 2016. Effects of team timeouts on the teams’ scoring performance in elite handball close games. Kinesiology 48(1.): 115–123 . Singh et al. [2023] Singh, A., P. Scarf, and R. Baker. 2023. A unified theory for bivariate scores in possessive ball-sports: The case of handball. European Journal of Operational Research 304(3): 1099–1112 . Skellam [1946] Skellam, J. 1946. The frequency distribution of the difference between two Poisson variates belonging to different populations. Journal of the Royal Statistical Society. Series A 109(3): 296–296 . Smiatek and Heuer [2012] Smiatek, J. and A. Heuer. 2012. A statistical view on team handball results: home advantage, team fitness and prediction of match outcomes. arXiv preprint arXiv:1207.0700 . Tomy and Veena [2022] Tomy, L. and G. Veena. 2022. A retrospective study on Skellam and related distributions. Austrian Journal of Statistics 51(1): 102–111 . Van Eetvelde et al. [2023] Van Eetvelde, H., L.M. Hvattum, and C. Ley. 2023. The probabilistic final standing calculator: a fair stochastic tool to handle abruptly stopped football seasons. AStA Advances in Statistical Analysis 107(1-2): 251–269 . Volossovitch and Debanne [2021] Volossovitch, A. and T. Debanne. 2021. Home advantage in handball. Home Advantage in Sport: Causes and the Effect on Performance: 220–227 . Prieto, J., M.Á. Gómez, A. Volossovitch, and J. Sampaio. 2016. Effects of team timeouts on the teams’ scoring performance in elite handball close games. Kinesiology 48(1.): 115–123 . Singh et al. [2023] Singh, A., P. Scarf, and R. Baker. 2023. A unified theory for bivariate scores in possessive ball-sports: The case of handball. European Journal of Operational Research 304(3): 1099–1112 . Skellam [1946] Skellam, J. 1946. The frequency distribution of the difference between two Poisson variates belonging to different populations. Journal of the Royal Statistical Society. Series A 109(3): 296–296 . Smiatek and Heuer [2012] Smiatek, J. and A. Heuer. 2012. A statistical view on team handball results: home advantage, team fitness and prediction of match outcomes. arXiv preprint arXiv:1207.0700 . Tomy and Veena [2022] Tomy, L. and G. Veena. 2022. A retrospective study on Skellam and related distributions. Austrian Journal of Statistics 51(1): 102–111 . Van Eetvelde et al. [2023] Van Eetvelde, H., L.M. Hvattum, and C. Ley. 2023. The probabilistic final standing calculator: a fair stochastic tool to handle abruptly stopped football seasons. AStA Advances in Statistical Analysis 107(1-2): 251–269 . Volossovitch and Debanne [2021] Volossovitch, A. and T. Debanne. 2021. Home advantage in handball. Home Advantage in Sport: Causes and the Effect on Performance: 220–227 . Singh, A., P. Scarf, and R. Baker. 2023. A unified theory for bivariate scores in possessive ball-sports: The case of handball. European Journal of Operational Research 304(3): 1099–1112 . Skellam [1946] Skellam, J. 1946. The frequency distribution of the difference between two Poisson variates belonging to different populations. Journal of the Royal Statistical Society. Series A 109(3): 296–296 . Smiatek and Heuer [2012] Smiatek, J. and A. Heuer. 2012. A statistical view on team handball results: home advantage, team fitness and prediction of match outcomes. arXiv preprint arXiv:1207.0700 . Tomy and Veena [2022] Tomy, L. and G. Veena. 2022. A retrospective study on Skellam and related distributions. Austrian Journal of Statistics 51(1): 102–111 . Van Eetvelde et al. [2023] Van Eetvelde, H., L.M. Hvattum, and C. Ley. 2023. The probabilistic final standing calculator: a fair stochastic tool to handle abruptly stopped football seasons. AStA Advances in Statistical Analysis 107(1-2): 251–269 . Volossovitch and Debanne [2021] Volossovitch, A. and T. Debanne. 2021. Home advantage in handball. Home Advantage in Sport: Causes and the Effect on Performance: 220–227 . Skellam, J. 1946. The frequency distribution of the difference between two Poisson variates belonging to different populations. Journal of the Royal Statistical Society. Series A 109(3): 296–296 . Smiatek and Heuer [2012] Smiatek, J. and A. Heuer. 2012. A statistical view on team handball results: home advantage, team fitness and prediction of match outcomes. arXiv preprint arXiv:1207.0700 . Tomy and Veena [2022] Tomy, L. and G. Veena. 2022. A retrospective study on Skellam and related distributions. Austrian Journal of Statistics 51(1): 102–111 . Van Eetvelde et al. [2023] Van Eetvelde, H., L.M. Hvattum, and C. Ley. 2023. The probabilistic final standing calculator: a fair stochastic tool to handle abruptly stopped football seasons. AStA Advances in Statistical Analysis 107(1-2): 251–269 . Volossovitch and Debanne [2021] Volossovitch, A. and T. Debanne. 2021. Home advantage in handball. Home Advantage in Sport: Causes and the Effect on Performance: 220–227 . Smiatek, J. and A. Heuer. 2012. A statistical view on team handball results: home advantage, team fitness and prediction of match outcomes. arXiv preprint arXiv:1207.0700 . Tomy and Veena [2022] Tomy, L. and G. Veena. 2022. A retrospective study on Skellam and related distributions. Austrian Journal of Statistics 51(1): 102–111 . Van Eetvelde et al. [2023] Van Eetvelde, H., L.M. Hvattum, and C. Ley. 2023. The probabilistic final standing calculator: a fair stochastic tool to handle abruptly stopped football seasons. AStA Advances in Statistical Analysis 107(1-2): 251–269 . Volossovitch and Debanne [2021] Volossovitch, A. and T. Debanne. 2021. Home advantage in handball. Home Advantage in Sport: Causes and the Effect on Performance: 220–227 . Tomy, L. and G. Veena. 2022. A retrospective study on Skellam and related distributions. Austrian Journal of Statistics 51(1): 102–111 . Van Eetvelde et al. [2023] Van Eetvelde, H., L.M. Hvattum, and C. Ley. 2023. The probabilistic final standing calculator: a fair stochastic tool to handle abruptly stopped football seasons. AStA Advances in Statistical Analysis 107(1-2): 251–269 . Volossovitch and Debanne [2021] Volossovitch, A. and T. Debanne. 2021. Home advantage in handball. Home Advantage in Sport: Causes and the Effect on Performance: 220–227 . Van Eetvelde, H., L.M. Hvattum, and C. Ley. 2023. The probabilistic final standing calculator: a fair stochastic tool to handle abruptly stopped football seasons. AStA Advances in Statistical Analysis 107(1-2): 251–269 . Volossovitch and Debanne [2021] Volossovitch, A. and T. Debanne. 2021. Home advantage in handball. Home Advantage in Sport: Causes and the Effect on Performance: 220–227 . Volossovitch, A. and T. Debanne. 2021. Home advantage in handball. Home Advantage in Sport: Causes and the Effect on Performance: 220–227 .
- Prediction of handball matches with statistically enhanced learning via estimated team strengths. arXiv preprint arXiv:2307.11777 . Groll et al. [2020] Groll, A., J. Heiner, G. Schauberger, and J. Uhrmeister. 2020. Prediction of the 2019 IHF World Men’s Handball Championship–a sparse Gaussian approximation model. Journal of Sports Analytics 6(3): 187–197 . Holmes and McHale [2024] Holmes, B. and I.G. McHale. 2024. Forecasting football match results using a player rating based model. International Journal of Forecasting 40(1): 302–312 . Irwin [1937] Irwin, J.O. 1937. The frequency distribution of the difference between two independent variates following the same Poisson distribution. Journal of the Royal Statistical Society 100(3): 415–416 . Jiang et al. [2014] Jiang, L., K. Mao, and R. Wu. 2014. A Skellam model to identify differential patterns of gene expression induced by environmental signals. BMC Genomics 15(1): 1–9 . Karlis and Mamode Khan [2023] Karlis, D. and N. Mamode Khan. 2023. Models for integer data. Annual Review of Statistics and its Application 10: 297–323 . Karlis and Ntzoufras [2006] Karlis, D. and I. Ntzoufras. 2006. Bayesian analysis of the differences of count data. Statistics in Medicine 25(11): 1885–1905 . Koopman et al. [2017] Koopman, S.J., R. Lit, and A. Lucas. 2017. Intraday stochastic volatility in discrete price changes: the dynamic Skellam model. Journal of the American Statistical Association 112(520): 1490–1503 . Lago-Peñas et al. [2013] Lago-Peñas, C., M.A. Gomez, J. Viaño, and I. González-García. 2013. Home advantage in elite handball: the impact of the quality of opposition on team performance. International Journal of Performance Analysis in Sport 13(3): 724–733 . Maher [1982] Maher, M.J. 1982. Modelling association football scores. Statistica Neerlandica 36(3): 109–118 . McHale and Scarf [2007] McHale, I. and P. Scarf. 2007. Modelling soccer matches using bivariate discrete distributions with general dependence structure. Statistica Neerlandica 61(4): 432–445 . Michels et al. [2023] Michels, R., M. Ötting, and D. Karlis. 2023. Extending the Dixon and Coles model: an application to women’s football data. arXiv preprint arXiv:2307.02139 . Michels et al. [2023] Michels, R., M. Ötting, and R. Langrock. 2023. Bettors’ reaction to match dynamics: Evidence from in-game betting. European Journal of Operational Research 310(3): 1118–1127 . Ntzoufras et al. [2021] Ntzoufras, I., V. Palaskas, and S. Drikos. 2021. Bayesian models for prediction of the set-difference in volleyball. IMA Journal of Management Mathematics 32(4): 491–518 . Ötting et al. [2024] Ötting, M., R. Michels, R. Langrock, and C. Deutscher. 2024. Demand for live betting: An analysis using state-space models. Applied Stochastic Models in Business and Industry . Pelechrinis and Winston [2021] Pelechrinis, K. and W. Winston. 2021. A Skellam regression model for quantifying positional value in soccer. Journal of Quantitative Analysis in Sports 17(3): 187–201 . Prieto et al. [2016] Prieto, J., M.Á. Gómez, A. Volossovitch, and J. Sampaio. 2016. Effects of team timeouts on the teams’ scoring performance in elite handball close games. Kinesiology 48(1.): 115–123 . Singh et al. [2023] Singh, A., P. Scarf, and R. Baker. 2023. A unified theory for bivariate scores in possessive ball-sports: The case of handball. European Journal of Operational Research 304(3): 1099–1112 . Skellam [1946] Skellam, J. 1946. The frequency distribution of the difference between two Poisson variates belonging to different populations. Journal of the Royal Statistical Society. Series A 109(3): 296–296 . Smiatek and Heuer [2012] Smiatek, J. and A. Heuer. 2012. A statistical view on team handball results: home advantage, team fitness and prediction of match outcomes. arXiv preprint arXiv:1207.0700 . Tomy and Veena [2022] Tomy, L. and G. Veena. 2022. A retrospective study on Skellam and related distributions. Austrian Journal of Statistics 51(1): 102–111 . Van Eetvelde et al. [2023] Van Eetvelde, H., L.M. Hvattum, and C. Ley. 2023. The probabilistic final standing calculator: a fair stochastic tool to handle abruptly stopped football seasons. AStA Advances in Statistical Analysis 107(1-2): 251–269 . Volossovitch and Debanne [2021] Volossovitch, A. and T. Debanne. 2021. Home advantage in handball. Home Advantage in Sport: Causes and the Effect on Performance: 220–227 . Groll, A., J. Heiner, G. Schauberger, and J. Uhrmeister. 2020. Prediction of the 2019 IHF World Men’s Handball Championship–a sparse Gaussian approximation model. Journal of Sports Analytics 6(3): 187–197 . Holmes and McHale [2024] Holmes, B. and I.G. McHale. 2024. Forecasting football match results using a player rating based model. International Journal of Forecasting 40(1): 302–312 . Irwin [1937] Irwin, J.O. 1937. The frequency distribution of the difference between two independent variates following the same Poisson distribution. Journal of the Royal Statistical Society 100(3): 415–416 . Jiang et al. [2014] Jiang, L., K. Mao, and R. Wu. 2014. A Skellam model to identify differential patterns of gene expression induced by environmental signals. BMC Genomics 15(1): 1–9 . Karlis and Mamode Khan [2023] Karlis, D. and N. Mamode Khan. 2023. Models for integer data. Annual Review of Statistics and its Application 10: 297–323 . Karlis and Ntzoufras [2006] Karlis, D. and I. Ntzoufras. 2006. Bayesian analysis of the differences of count data. Statistics in Medicine 25(11): 1885–1905 . Koopman et al. [2017] Koopman, S.J., R. Lit, and A. Lucas. 2017. Intraday stochastic volatility in discrete price changes: the dynamic Skellam model. Journal of the American Statistical Association 112(520): 1490–1503 . Lago-Peñas et al. [2013] Lago-Peñas, C., M.A. Gomez, J. Viaño, and I. González-García. 2013. Home advantage in elite handball: the impact of the quality of opposition on team performance. International Journal of Performance Analysis in Sport 13(3): 724–733 . Maher [1982] Maher, M.J. 1982. Modelling association football scores. Statistica Neerlandica 36(3): 109–118 . McHale and Scarf [2007] McHale, I. and P. Scarf. 2007. Modelling soccer matches using bivariate discrete distributions with general dependence structure. Statistica Neerlandica 61(4): 432–445 . Michels et al. [2023] Michels, R., M. Ötting, and D. Karlis. 2023. Extending the Dixon and Coles model: an application to women’s football data. arXiv preprint arXiv:2307.02139 . Michels et al. [2023] Michels, R., M. Ötting, and R. Langrock. 2023. Bettors’ reaction to match dynamics: Evidence from in-game betting. European Journal of Operational Research 310(3): 1118–1127 . Ntzoufras et al. [2021] Ntzoufras, I., V. Palaskas, and S. Drikos. 2021. Bayesian models for prediction of the set-difference in volleyball. IMA Journal of Management Mathematics 32(4): 491–518 . Ötting et al. [2024] Ötting, M., R. Michels, R. Langrock, and C. Deutscher. 2024. Demand for live betting: An analysis using state-space models. Applied Stochastic Models in Business and Industry . Pelechrinis and Winston [2021] Pelechrinis, K. and W. Winston. 2021. A Skellam regression model for quantifying positional value in soccer. Journal of Quantitative Analysis in Sports 17(3): 187–201 . Prieto et al. [2016] Prieto, J., M.Á. Gómez, A. Volossovitch, and J. Sampaio. 2016. Effects of team timeouts on the teams’ scoring performance in elite handball close games. Kinesiology 48(1.): 115–123 . Singh et al. [2023] Singh, A., P. Scarf, and R. Baker. 2023. A unified theory for bivariate scores in possessive ball-sports: The case of handball. European Journal of Operational Research 304(3): 1099–1112 . Skellam [1946] Skellam, J. 1946. The frequency distribution of the difference between two Poisson variates belonging to different populations. Journal of the Royal Statistical Society. Series A 109(3): 296–296 . Smiatek and Heuer [2012] Smiatek, J. and A. Heuer. 2012. A statistical view on team handball results: home advantage, team fitness and prediction of match outcomes. arXiv preprint arXiv:1207.0700 . Tomy and Veena [2022] Tomy, L. and G. Veena. 2022. A retrospective study on Skellam and related distributions. Austrian Journal of Statistics 51(1): 102–111 . Van Eetvelde et al. [2023] Van Eetvelde, H., L.M. Hvattum, and C. Ley. 2023. The probabilistic final standing calculator: a fair stochastic tool to handle abruptly stopped football seasons. AStA Advances in Statistical Analysis 107(1-2): 251–269 . Volossovitch and Debanne [2021] Volossovitch, A. and T. Debanne. 2021. Home advantage in handball. Home Advantage in Sport: Causes and the Effect on Performance: 220–227 . Holmes, B. and I.G. McHale. 2024. Forecasting football match results using a player rating based model. International Journal of Forecasting 40(1): 302–312 . Irwin [1937] Irwin, J.O. 1937. The frequency distribution of the difference between two independent variates following the same Poisson distribution. Journal of the Royal Statistical Society 100(3): 415–416 . Jiang et al. [2014] Jiang, L., K. Mao, and R. Wu. 2014. A Skellam model to identify differential patterns of gene expression induced by environmental signals. BMC Genomics 15(1): 1–9 . Karlis and Mamode Khan [2023] Karlis, D. and N. Mamode Khan. 2023. Models for integer data. Annual Review of Statistics and its Application 10: 297–323 . Karlis and Ntzoufras [2006] Karlis, D. and I. Ntzoufras. 2006. Bayesian analysis of the differences of count data. Statistics in Medicine 25(11): 1885–1905 . Koopman et al. [2017] Koopman, S.J., R. Lit, and A. Lucas. 2017. Intraday stochastic volatility in discrete price changes: the dynamic Skellam model. Journal of the American Statistical Association 112(520): 1490–1503 . Lago-Peñas et al. [2013] Lago-Peñas, C., M.A. Gomez, J. Viaño, and I. González-García. 2013. Home advantage in elite handball: the impact of the quality of opposition on team performance. International Journal of Performance Analysis in Sport 13(3): 724–733 . Maher [1982] Maher, M.J. 1982. Modelling association football scores. Statistica Neerlandica 36(3): 109–118 . McHale and Scarf [2007] McHale, I. and P. Scarf. 2007. Modelling soccer matches using bivariate discrete distributions with general dependence structure. Statistica Neerlandica 61(4): 432–445 . Michels et al. [2023] Michels, R., M. Ötting, and D. Karlis. 2023. Extending the Dixon and Coles model: an application to women’s football data. arXiv preprint arXiv:2307.02139 . Michels et al. [2023] Michels, R., M. Ötting, and R. Langrock. 2023. Bettors’ reaction to match dynamics: Evidence from in-game betting. European Journal of Operational Research 310(3): 1118–1127 . Ntzoufras et al. [2021] Ntzoufras, I., V. Palaskas, and S. Drikos. 2021. Bayesian models for prediction of the set-difference in volleyball. IMA Journal of Management Mathematics 32(4): 491–518 . Ötting et al. [2024] Ötting, M., R. Michels, R. Langrock, and C. Deutscher. 2024. Demand for live betting: An analysis using state-space models. Applied Stochastic Models in Business and Industry . Pelechrinis and Winston [2021] Pelechrinis, K. and W. Winston. 2021. A Skellam regression model for quantifying positional value in soccer. Journal of Quantitative Analysis in Sports 17(3): 187–201 . Prieto et al. [2016] Prieto, J., M.Á. Gómez, A. Volossovitch, and J. Sampaio. 2016. Effects of team timeouts on the teams’ scoring performance in elite handball close games. Kinesiology 48(1.): 115–123 . Singh et al. [2023] Singh, A., P. Scarf, and R. Baker. 2023. A unified theory for bivariate scores in possessive ball-sports: The case of handball. European Journal of Operational Research 304(3): 1099–1112 . Skellam [1946] Skellam, J. 1946. The frequency distribution of the difference between two Poisson variates belonging to different populations. Journal of the Royal Statistical Society. Series A 109(3): 296–296 . Smiatek and Heuer [2012] Smiatek, J. and A. Heuer. 2012. A statistical view on team handball results: home advantage, team fitness and prediction of match outcomes. arXiv preprint arXiv:1207.0700 . Tomy and Veena [2022] Tomy, L. and G. Veena. 2022. A retrospective study on Skellam and related distributions. Austrian Journal of Statistics 51(1): 102–111 . Van Eetvelde et al. [2023] Van Eetvelde, H., L.M. Hvattum, and C. Ley. 2023. The probabilistic final standing calculator: a fair stochastic tool to handle abruptly stopped football seasons. AStA Advances in Statistical Analysis 107(1-2): 251–269 . Volossovitch and Debanne [2021] Volossovitch, A. and T. Debanne. 2021. Home advantage in handball. Home Advantage in Sport: Causes and the Effect on Performance: 220–227 . Irwin, J.O. 1937. The frequency distribution of the difference between two independent variates following the same Poisson distribution. Journal of the Royal Statistical Society 100(3): 415–416 . Jiang et al. [2014] Jiang, L., K. Mao, and R. Wu. 2014. A Skellam model to identify differential patterns of gene expression induced by environmental signals. BMC Genomics 15(1): 1–9 . Karlis and Mamode Khan [2023] Karlis, D. and N. Mamode Khan. 2023. Models for integer data. Annual Review of Statistics and its Application 10: 297–323 . Karlis and Ntzoufras [2006] Karlis, D. and I. Ntzoufras. 2006. Bayesian analysis of the differences of count data. Statistics in Medicine 25(11): 1885–1905 . Koopman et al. [2017] Koopman, S.J., R. Lit, and A. Lucas. 2017. Intraday stochastic volatility in discrete price changes: the dynamic Skellam model. Journal of the American Statistical Association 112(520): 1490–1503 . Lago-Peñas et al. [2013] Lago-Peñas, C., M.A. Gomez, J. Viaño, and I. González-García. 2013. Home advantage in elite handball: the impact of the quality of opposition on team performance. International Journal of Performance Analysis in Sport 13(3): 724–733 . Maher [1982] Maher, M.J. 1982. Modelling association football scores. Statistica Neerlandica 36(3): 109–118 . McHale and Scarf [2007] McHale, I. and P. Scarf. 2007. Modelling soccer matches using bivariate discrete distributions with general dependence structure. Statistica Neerlandica 61(4): 432–445 . Michels et al. [2023] Michels, R., M. Ötting, and D. Karlis. 2023. Extending the Dixon and Coles model: an application to women’s football data. arXiv preprint arXiv:2307.02139 . Michels et al. [2023] Michels, R., M. Ötting, and R. Langrock. 2023. Bettors’ reaction to match dynamics: Evidence from in-game betting. European Journal of Operational Research 310(3): 1118–1127 . Ntzoufras et al. [2021] Ntzoufras, I., V. Palaskas, and S. Drikos. 2021. Bayesian models for prediction of the set-difference in volleyball. IMA Journal of Management Mathematics 32(4): 491–518 . Ötting et al. [2024] Ötting, M., R. Michels, R. Langrock, and C. Deutscher. 2024. Demand for live betting: An analysis using state-space models. Applied Stochastic Models in Business and Industry . Pelechrinis and Winston [2021] Pelechrinis, K. and W. Winston. 2021. A Skellam regression model for quantifying positional value in soccer. Journal of Quantitative Analysis in Sports 17(3): 187–201 . Prieto et al. [2016] Prieto, J., M.Á. Gómez, A. Volossovitch, and J. Sampaio. 2016. Effects of team timeouts on the teams’ scoring performance in elite handball close games. Kinesiology 48(1.): 115–123 . Singh et al. [2023] Singh, A., P. Scarf, and R. Baker. 2023. A unified theory for bivariate scores in possessive ball-sports: The case of handball. European Journal of Operational Research 304(3): 1099–1112 . Skellam [1946] Skellam, J. 1946. The frequency distribution of the difference between two Poisson variates belonging to different populations. Journal of the Royal Statistical Society. Series A 109(3): 296–296 . Smiatek and Heuer [2012] Smiatek, J. and A. Heuer. 2012. A statistical view on team handball results: home advantage, team fitness and prediction of match outcomes. arXiv preprint arXiv:1207.0700 . Tomy and Veena [2022] Tomy, L. and G. Veena. 2022. A retrospective study on Skellam and related distributions. Austrian Journal of Statistics 51(1): 102–111 . Van Eetvelde et al. [2023] Van Eetvelde, H., L.M. Hvattum, and C. Ley. 2023. The probabilistic final standing calculator: a fair stochastic tool to handle abruptly stopped football seasons. AStA Advances in Statistical Analysis 107(1-2): 251–269 . Volossovitch and Debanne [2021] Volossovitch, A. and T. Debanne. 2021. Home advantage in handball. Home Advantage in Sport: Causes and the Effect on Performance: 220–227 . Jiang, L., K. Mao, and R. Wu. 2014. A Skellam model to identify differential patterns of gene expression induced by environmental signals. BMC Genomics 15(1): 1–9 . Karlis and Mamode Khan [2023] Karlis, D. and N. Mamode Khan. 2023. Models for integer data. Annual Review of Statistics and its Application 10: 297–323 . Karlis and Ntzoufras [2006] Karlis, D. and I. Ntzoufras. 2006. Bayesian analysis of the differences of count data. Statistics in Medicine 25(11): 1885–1905 . Koopman et al. [2017] Koopman, S.J., R. Lit, and A. Lucas. 2017. Intraday stochastic volatility in discrete price changes: the dynamic Skellam model. Journal of the American Statistical Association 112(520): 1490–1503 . Lago-Peñas et al. [2013] Lago-Peñas, C., M.A. Gomez, J. Viaño, and I. González-García. 2013. Home advantage in elite handball: the impact of the quality of opposition on team performance. International Journal of Performance Analysis in Sport 13(3): 724–733 . Maher [1982] Maher, M.J. 1982. Modelling association football scores. Statistica Neerlandica 36(3): 109–118 . McHale and Scarf [2007] McHale, I. and P. Scarf. 2007. Modelling soccer matches using bivariate discrete distributions with general dependence structure. Statistica Neerlandica 61(4): 432–445 . Michels et al. [2023] Michels, R., M. Ötting, and D. Karlis. 2023. Extending the Dixon and Coles model: an application to women’s football data. arXiv preprint arXiv:2307.02139 . Michels et al. [2023] Michels, R., M. Ötting, and R. Langrock. 2023. Bettors’ reaction to match dynamics: Evidence from in-game betting. European Journal of Operational Research 310(3): 1118–1127 . Ntzoufras et al. [2021] Ntzoufras, I., V. Palaskas, and S. Drikos. 2021. Bayesian models for prediction of the set-difference in volleyball. IMA Journal of Management Mathematics 32(4): 491–518 . Ötting et al. [2024] Ötting, M., R. Michels, R. Langrock, and C. Deutscher. 2024. Demand for live betting: An analysis using state-space models. Applied Stochastic Models in Business and Industry . Pelechrinis and Winston [2021] Pelechrinis, K. and W. Winston. 2021. A Skellam regression model for quantifying positional value in soccer. Journal of Quantitative Analysis in Sports 17(3): 187–201 . Prieto et al. [2016] Prieto, J., M.Á. Gómez, A. Volossovitch, and J. Sampaio. 2016. Effects of team timeouts on the teams’ scoring performance in elite handball close games. Kinesiology 48(1.): 115–123 . Singh et al. [2023] Singh, A., P. Scarf, and R. Baker. 2023. A unified theory for bivariate scores in possessive ball-sports: The case of handball. European Journal of Operational Research 304(3): 1099–1112 . Skellam [1946] Skellam, J. 1946. The frequency distribution of the difference between two Poisson variates belonging to different populations. Journal of the Royal Statistical Society. Series A 109(3): 296–296 . Smiatek and Heuer [2012] Smiatek, J. and A. Heuer. 2012. A statistical view on team handball results: home advantage, team fitness and prediction of match outcomes. arXiv preprint arXiv:1207.0700 . Tomy and Veena [2022] Tomy, L. and G. Veena. 2022. A retrospective study on Skellam and related distributions. Austrian Journal of Statistics 51(1): 102–111 . Van Eetvelde et al. [2023] Van Eetvelde, H., L.M. Hvattum, and C. Ley. 2023. The probabilistic final standing calculator: a fair stochastic tool to handle abruptly stopped football seasons. AStA Advances in Statistical Analysis 107(1-2): 251–269 . Volossovitch and Debanne [2021] Volossovitch, A. and T. Debanne. 2021. Home advantage in handball. Home Advantage in Sport: Causes and the Effect on Performance: 220–227 . Karlis, D. and N. Mamode Khan. 2023. Models for integer data. Annual Review of Statistics and its Application 10: 297–323 . Karlis and Ntzoufras [2006] Karlis, D. and I. Ntzoufras. 2006. Bayesian analysis of the differences of count data. Statistics in Medicine 25(11): 1885–1905 . Koopman et al. [2017] Koopman, S.J., R. Lit, and A. Lucas. 2017. Intraday stochastic volatility in discrete price changes: the dynamic Skellam model. Journal of the American Statistical Association 112(520): 1490–1503 . Lago-Peñas et al. [2013] Lago-Peñas, C., M.A. Gomez, J. Viaño, and I. González-García. 2013. Home advantage in elite handball: the impact of the quality of opposition on team performance. International Journal of Performance Analysis in Sport 13(3): 724–733 . Maher [1982] Maher, M.J. 1982. Modelling association football scores. Statistica Neerlandica 36(3): 109–118 . McHale and Scarf [2007] McHale, I. and P. Scarf. 2007. Modelling soccer matches using bivariate discrete distributions with general dependence structure. Statistica Neerlandica 61(4): 432–445 . Michels et al. [2023] Michels, R., M. Ötting, and D. Karlis. 2023. Extending the Dixon and Coles model: an application to women’s football data. arXiv preprint arXiv:2307.02139 . Michels et al. [2023] Michels, R., M. Ötting, and R. Langrock. 2023. Bettors’ reaction to match dynamics: Evidence from in-game betting. European Journal of Operational Research 310(3): 1118–1127 . Ntzoufras et al. [2021] Ntzoufras, I., V. Palaskas, and S. Drikos. 2021. Bayesian models for prediction of the set-difference in volleyball. IMA Journal of Management Mathematics 32(4): 491–518 . Ötting et al. [2024] Ötting, M., R. Michels, R. Langrock, and C. Deutscher. 2024. Demand for live betting: An analysis using state-space models. Applied Stochastic Models in Business and Industry . Pelechrinis and Winston [2021] Pelechrinis, K. and W. Winston. 2021. A Skellam regression model for quantifying positional value in soccer. Journal of Quantitative Analysis in Sports 17(3): 187–201 . Prieto et al. [2016] Prieto, J., M.Á. Gómez, A. Volossovitch, and J. Sampaio. 2016. Effects of team timeouts on the teams’ scoring performance in elite handball close games. Kinesiology 48(1.): 115–123 . Singh et al. [2023] Singh, A., P. Scarf, and R. Baker. 2023. A unified theory for bivariate scores in possessive ball-sports: The case of handball. European Journal of Operational Research 304(3): 1099–1112 . Skellam [1946] Skellam, J. 1946. The frequency distribution of the difference between two Poisson variates belonging to different populations. Journal of the Royal Statistical Society. Series A 109(3): 296–296 . Smiatek and Heuer [2012] Smiatek, J. and A. Heuer. 2012. A statistical view on team handball results: home advantage, team fitness and prediction of match outcomes. arXiv preprint arXiv:1207.0700 . Tomy and Veena [2022] Tomy, L. and G. Veena. 2022. A retrospective study on Skellam and related distributions. Austrian Journal of Statistics 51(1): 102–111 . Van Eetvelde et al. [2023] Van Eetvelde, H., L.M. Hvattum, and C. Ley. 2023. The probabilistic final standing calculator: a fair stochastic tool to handle abruptly stopped football seasons. AStA Advances in Statistical Analysis 107(1-2): 251–269 . Volossovitch and Debanne [2021] Volossovitch, A. and T. Debanne. 2021. Home advantage in handball. Home Advantage in Sport: Causes and the Effect on Performance: 220–227 . Karlis, D. and I. Ntzoufras. 2006. Bayesian analysis of the differences of count data. Statistics in Medicine 25(11): 1885–1905 . Koopman et al. [2017] Koopman, S.J., R. Lit, and A. Lucas. 2017. Intraday stochastic volatility in discrete price changes: the dynamic Skellam model. Journal of the American Statistical Association 112(520): 1490–1503 . Lago-Peñas et al. [2013] Lago-Peñas, C., M.A. Gomez, J. Viaño, and I. González-García. 2013. Home advantage in elite handball: the impact of the quality of opposition on team performance. International Journal of Performance Analysis in Sport 13(3): 724–733 . Maher [1982] Maher, M.J. 1982. Modelling association football scores. Statistica Neerlandica 36(3): 109–118 . McHale and Scarf [2007] McHale, I. and P. Scarf. 2007. Modelling soccer matches using bivariate discrete distributions with general dependence structure. Statistica Neerlandica 61(4): 432–445 . Michels et al. [2023] Michels, R., M. Ötting, and D. Karlis. 2023. Extending the Dixon and Coles model: an application to women’s football data. arXiv preprint arXiv:2307.02139 . Michels et al. [2023] Michels, R., M. Ötting, and R. Langrock. 2023. Bettors’ reaction to match dynamics: Evidence from in-game betting. European Journal of Operational Research 310(3): 1118–1127 . Ntzoufras et al. [2021] Ntzoufras, I., V. Palaskas, and S. Drikos. 2021. Bayesian models for prediction of the set-difference in volleyball. IMA Journal of Management Mathematics 32(4): 491–518 . Ötting et al. [2024] Ötting, M., R. Michels, R. Langrock, and C. Deutscher. 2024. Demand for live betting: An analysis using state-space models. Applied Stochastic Models in Business and Industry . Pelechrinis and Winston [2021] Pelechrinis, K. and W. Winston. 2021. A Skellam regression model for quantifying positional value in soccer. Journal of Quantitative Analysis in Sports 17(3): 187–201 . Prieto et al. [2016] Prieto, J., M.Á. Gómez, A. Volossovitch, and J. Sampaio. 2016. Effects of team timeouts on the teams’ scoring performance in elite handball close games. Kinesiology 48(1.): 115–123 . Singh et al. [2023] Singh, A., P. Scarf, and R. Baker. 2023. A unified theory for bivariate scores in possessive ball-sports: The case of handball. European Journal of Operational Research 304(3): 1099–1112 . Skellam [1946] Skellam, J. 1946. The frequency distribution of the difference between two Poisson variates belonging to different populations. Journal of the Royal Statistical Society. Series A 109(3): 296–296 . Smiatek and Heuer [2012] Smiatek, J. and A. Heuer. 2012. A statistical view on team handball results: home advantage, team fitness and prediction of match outcomes. arXiv preprint arXiv:1207.0700 . Tomy and Veena [2022] Tomy, L. and G. Veena. 2022. A retrospective study on Skellam and related distributions. Austrian Journal of Statistics 51(1): 102–111 . Van Eetvelde et al. [2023] Van Eetvelde, H., L.M. Hvattum, and C. Ley. 2023. The probabilistic final standing calculator: a fair stochastic tool to handle abruptly stopped football seasons. AStA Advances in Statistical Analysis 107(1-2): 251–269 . Volossovitch and Debanne [2021] Volossovitch, A. and T. Debanne. 2021. Home advantage in handball. Home Advantage in Sport: Causes and the Effect on Performance: 220–227 . Koopman, S.J., R. Lit, and A. Lucas. 2017. Intraday stochastic volatility in discrete price changes: the dynamic Skellam model. Journal of the American Statistical Association 112(520): 1490–1503 . Lago-Peñas et al. [2013] Lago-Peñas, C., M.A. Gomez, J. Viaño, and I. González-García. 2013. Home advantage in elite handball: the impact of the quality of opposition on team performance. International Journal of Performance Analysis in Sport 13(3): 724–733 . Maher [1982] Maher, M.J. 1982. Modelling association football scores. Statistica Neerlandica 36(3): 109–118 . McHale and Scarf [2007] McHale, I. and P. Scarf. 2007. Modelling soccer matches using bivariate discrete distributions with general dependence structure. Statistica Neerlandica 61(4): 432–445 . Michels et al. [2023] Michels, R., M. Ötting, and D. Karlis. 2023. Extending the Dixon and Coles model: an application to women’s football data. arXiv preprint arXiv:2307.02139 . Michels et al. [2023] Michels, R., M. Ötting, and R. Langrock. 2023. Bettors’ reaction to match dynamics: Evidence from in-game betting. European Journal of Operational Research 310(3): 1118–1127 . Ntzoufras et al. [2021] Ntzoufras, I., V. Palaskas, and S. Drikos. 2021. Bayesian models for prediction of the set-difference in volleyball. IMA Journal of Management Mathematics 32(4): 491–518 . Ötting et al. [2024] Ötting, M., R. Michels, R. Langrock, and C. Deutscher. 2024. Demand for live betting: An analysis using state-space models. Applied Stochastic Models in Business and Industry . Pelechrinis and Winston [2021] Pelechrinis, K. and W. Winston. 2021. A Skellam regression model for quantifying positional value in soccer. Journal of Quantitative Analysis in Sports 17(3): 187–201 . Prieto et al. [2016] Prieto, J., M.Á. Gómez, A. Volossovitch, and J. Sampaio. 2016. Effects of team timeouts on the teams’ scoring performance in elite handball close games. Kinesiology 48(1.): 115–123 . Singh et al. [2023] Singh, A., P. Scarf, and R. Baker. 2023. A unified theory for bivariate scores in possessive ball-sports: The case of handball. European Journal of Operational Research 304(3): 1099–1112 . Skellam [1946] Skellam, J. 1946. The frequency distribution of the difference between two Poisson variates belonging to different populations. Journal of the Royal Statistical Society. Series A 109(3): 296–296 . Smiatek and Heuer [2012] Smiatek, J. and A. Heuer. 2012. A statistical view on team handball results: home advantage, team fitness and prediction of match outcomes. arXiv preprint arXiv:1207.0700 . Tomy and Veena [2022] Tomy, L. and G. Veena. 2022. A retrospective study on Skellam and related distributions. Austrian Journal of Statistics 51(1): 102–111 . Van Eetvelde et al. [2023] Van Eetvelde, H., L.M. Hvattum, and C. Ley. 2023. The probabilistic final standing calculator: a fair stochastic tool to handle abruptly stopped football seasons. AStA Advances in Statistical Analysis 107(1-2): 251–269 . Volossovitch and Debanne [2021] Volossovitch, A. and T. Debanne. 2021. Home advantage in handball. Home Advantage in Sport: Causes and the Effect on Performance: 220–227 . Lago-Peñas, C., M.A. Gomez, J. Viaño, and I. González-García. 2013. Home advantage in elite handball: the impact of the quality of opposition on team performance. International Journal of Performance Analysis in Sport 13(3): 724–733 . Maher [1982] Maher, M.J. 1982. Modelling association football scores. Statistica Neerlandica 36(3): 109–118 . McHale and Scarf [2007] McHale, I. and P. Scarf. 2007. Modelling soccer matches using bivariate discrete distributions with general dependence structure. Statistica Neerlandica 61(4): 432–445 . Michels et al. [2023] Michels, R., M. Ötting, and D. Karlis. 2023. Extending the Dixon and Coles model: an application to women’s football data. arXiv preprint arXiv:2307.02139 . Michels et al. [2023] Michels, R., M. Ötting, and R. Langrock. 2023. Bettors’ reaction to match dynamics: Evidence from in-game betting. European Journal of Operational Research 310(3): 1118–1127 . Ntzoufras et al. [2021] Ntzoufras, I., V. Palaskas, and S. Drikos. 2021. Bayesian models for prediction of the set-difference in volleyball. IMA Journal of Management Mathematics 32(4): 491–518 . Ötting et al. [2024] Ötting, M., R. Michels, R. Langrock, and C. Deutscher. 2024. Demand for live betting: An analysis using state-space models. Applied Stochastic Models in Business and Industry . Pelechrinis and Winston [2021] Pelechrinis, K. and W. Winston. 2021. A Skellam regression model for quantifying positional value in soccer. Journal of Quantitative Analysis in Sports 17(3): 187–201 . Prieto et al. [2016] Prieto, J., M.Á. Gómez, A. Volossovitch, and J. Sampaio. 2016. Effects of team timeouts on the teams’ scoring performance in elite handball close games. Kinesiology 48(1.): 115–123 . Singh et al. [2023] Singh, A., P. Scarf, and R. Baker. 2023. 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The probabilistic final standing calculator: a fair stochastic tool to handle abruptly stopped football seasons. AStA Advances in Statistical Analysis 107(1-2): 251–269 . Volossovitch and Debanne [2021] Volossovitch, A. and T. Debanne. 2021. Home advantage in handball. Home Advantage in Sport: Causes and the Effect on Performance: 220–227 . Holmes, B. and I.G. McHale. 2024. Forecasting football match results using a player rating based model. International Journal of Forecasting 40(1): 302–312 . Irwin [1937] Irwin, J.O. 1937. The frequency distribution of the difference between two independent variates following the same Poisson distribution. Journal of the Royal Statistical Society 100(3): 415–416 . Jiang et al. [2014] Jiang, L., K. Mao, and R. Wu. 2014. A Skellam model to identify differential patterns of gene expression induced by environmental signals. BMC Genomics 15(1): 1–9 . Karlis and Mamode Khan [2023] Karlis, D. and N. Mamode Khan. 2023. Models for integer data. Annual Review of Statistics and its Application 10: 297–323 . Karlis and Ntzoufras [2006] Karlis, D. and I. Ntzoufras. 2006. Bayesian analysis of the differences of count data. Statistics in Medicine 25(11): 1885–1905 . Koopman et al. [2017] Koopman, S.J., R. Lit, and A. Lucas. 2017. Intraday stochastic volatility in discrete price changes: the dynamic Skellam model. Journal of the American Statistical Association 112(520): 1490–1503 . Lago-Peñas et al. [2013] Lago-Peñas, C., M.A. Gomez, J. Viaño, and I. González-García. 2013. Home advantage in elite handball: the impact of the quality of opposition on team performance. International Journal of Performance Analysis in Sport 13(3): 724–733 . Maher [1982] Maher, M.J. 1982. Modelling association football scores. Statistica Neerlandica 36(3): 109–118 . McHale and Scarf [2007] McHale, I. and P. Scarf. 2007. Modelling soccer matches using bivariate discrete distributions with general dependence structure. Statistica Neerlandica 61(4): 432–445 . Michels et al. [2023] Michels, R., M. Ötting, and D. Karlis. 2023. Extending the Dixon and Coles model: an application to women’s football data. arXiv preprint arXiv:2307.02139 . Michels et al. [2023] Michels, R., M. Ötting, and R. Langrock. 2023. Bettors’ reaction to match dynamics: Evidence from in-game betting. European Journal of Operational Research 310(3): 1118–1127 . Ntzoufras et al. [2021] Ntzoufras, I., V. Palaskas, and S. Drikos. 2021. Bayesian models for prediction of the set-difference in volleyball. IMA Journal of Management Mathematics 32(4): 491–518 . Ötting et al. [2024] Ötting, M., R. Michels, R. Langrock, and C. Deutscher. 2024. Demand for live betting: An analysis using state-space models. Applied Stochastic Models in Business and Industry . Pelechrinis and Winston [2021] Pelechrinis, K. and W. Winston. 2021. A Skellam regression model for quantifying positional value in soccer. Journal of Quantitative Analysis in Sports 17(3): 187–201 . Prieto et al. [2016] Prieto, J., M.Á. Gómez, A. Volossovitch, and J. Sampaio. 2016. Effects of team timeouts on the teams’ scoring performance in elite handball close games. Kinesiology 48(1.): 115–123 . Singh et al. [2023] Singh, A., P. Scarf, and R. Baker. 2023. A unified theory for bivariate scores in possessive ball-sports: The case of handball. European Journal of Operational Research 304(3): 1099–1112 . Skellam [1946] Skellam, J. 1946. The frequency distribution of the difference between two Poisson variates belonging to different populations. Journal of the Royal Statistical Society. Series A 109(3): 296–296 . Smiatek and Heuer [2012] Smiatek, J. and A. Heuer. 2012. A statistical view on team handball results: home advantage, team fitness and prediction of match outcomes. arXiv preprint arXiv:1207.0700 . Tomy and Veena [2022] Tomy, L. and G. Veena. 2022. A retrospective study on Skellam and related distributions. Austrian Journal of Statistics 51(1): 102–111 . Van Eetvelde et al. [2023] Van Eetvelde, H., L.M. Hvattum, and C. Ley. 2023. The probabilistic final standing calculator: a fair stochastic tool to handle abruptly stopped football seasons. AStA Advances in Statistical Analysis 107(1-2): 251–269 . Volossovitch and Debanne [2021] Volossovitch, A. and T. Debanne. 2021. Home advantage in handball. Home Advantage in Sport: Causes and the Effect on Performance: 220–227 . Irwin, J.O. 1937. The frequency distribution of the difference between two independent variates following the same Poisson distribution. Journal of the Royal Statistical Society 100(3): 415–416 . Jiang et al. [2014] Jiang, L., K. Mao, and R. Wu. 2014. A Skellam model to identify differential patterns of gene expression induced by environmental signals. BMC Genomics 15(1): 1–9 . Karlis and Mamode Khan [2023] Karlis, D. and N. Mamode Khan. 2023. Models for integer data. Annual Review of Statistics and its Application 10: 297–323 . Karlis and Ntzoufras [2006] Karlis, D. and I. Ntzoufras. 2006. Bayesian analysis of the differences of count data. Statistics in Medicine 25(11): 1885–1905 . Koopman et al. [2017] Koopman, S.J., R. Lit, and A. Lucas. 2017. Intraday stochastic volatility in discrete price changes: the dynamic Skellam model. Journal of the American Statistical Association 112(520): 1490–1503 . Lago-Peñas et al. [2013] Lago-Peñas, C., M.A. Gomez, J. Viaño, and I. González-García. 2013. Home advantage in elite handball: the impact of the quality of opposition on team performance. International Journal of Performance Analysis in Sport 13(3): 724–733 . Maher [1982] Maher, M.J. 1982. Modelling association football scores. Statistica Neerlandica 36(3): 109–118 . McHale and Scarf [2007] McHale, I. and P. Scarf. 2007. Modelling soccer matches using bivariate discrete distributions with general dependence structure. Statistica Neerlandica 61(4): 432–445 . Michels et al. [2023] Michels, R., M. Ötting, and D. Karlis. 2023. Extending the Dixon and Coles model: an application to women’s football data. arXiv preprint arXiv:2307.02139 . Michels et al. [2023] Michels, R., M. Ötting, and R. Langrock. 2023. Bettors’ reaction to match dynamics: Evidence from in-game betting. European Journal of Operational Research 310(3): 1118–1127 . Ntzoufras et al. [2021] Ntzoufras, I., V. Palaskas, and S. Drikos. 2021. Bayesian models for prediction of the set-difference in volleyball. IMA Journal of Management Mathematics 32(4): 491–518 . Ötting et al. [2024] Ötting, M., R. Michels, R. Langrock, and C. Deutscher. 2024. Demand for live betting: An analysis using state-space models. Applied Stochastic Models in Business and Industry . Pelechrinis and Winston [2021] Pelechrinis, K. and W. Winston. 2021. A Skellam regression model for quantifying positional value in soccer. Journal of Quantitative Analysis in Sports 17(3): 187–201 . Prieto et al. [2016] Prieto, J., M.Á. Gómez, A. Volossovitch, and J. Sampaio. 2016. Effects of team timeouts on the teams’ scoring performance in elite handball close games. Kinesiology 48(1.): 115–123 . Singh et al. [2023] Singh, A., P. Scarf, and R. Baker. 2023. A unified theory for bivariate scores in possessive ball-sports: The case of handball. European Journal of Operational Research 304(3): 1099–1112 . Skellam [1946] Skellam, J. 1946. The frequency distribution of the difference between two Poisson variates belonging to different populations. Journal of the Royal Statistical Society. Series A 109(3): 296–296 . Smiatek and Heuer [2012] Smiatek, J. and A. Heuer. 2012. A statistical view on team handball results: home advantage, team fitness and prediction of match outcomes. arXiv preprint arXiv:1207.0700 . Tomy and Veena [2022] Tomy, L. and G. Veena. 2022. A retrospective study on Skellam and related distributions. Austrian Journal of Statistics 51(1): 102–111 . Van Eetvelde et al. [2023] Van Eetvelde, H., L.M. Hvattum, and C. Ley. 2023. The probabilistic final standing calculator: a fair stochastic tool to handle abruptly stopped football seasons. AStA Advances in Statistical Analysis 107(1-2): 251–269 . Volossovitch and Debanne [2021] Volossovitch, A. and T. Debanne. 2021. Home advantage in handball. Home Advantage in Sport: Causes and the Effect on Performance: 220–227 . Jiang, L., K. Mao, and R. Wu. 2014. A Skellam model to identify differential patterns of gene expression induced by environmental signals. BMC Genomics 15(1): 1–9 . Karlis and Mamode Khan [2023] Karlis, D. and N. Mamode Khan. 2023. Models for integer data. Annual Review of Statistics and its Application 10: 297–323 . Karlis and Ntzoufras [2006] Karlis, D. and I. Ntzoufras. 2006. Bayesian analysis of the differences of count data. Statistics in Medicine 25(11): 1885–1905 . Koopman et al. [2017] Koopman, S.J., R. Lit, and A. Lucas. 2017. Intraday stochastic volatility in discrete price changes: the dynamic Skellam model. Journal of the American Statistical Association 112(520): 1490–1503 . Lago-Peñas et al. [2013] Lago-Peñas, C., M.A. Gomez, J. Viaño, and I. González-García. 2013. Home advantage in elite handball: the impact of the quality of opposition on team performance. International Journal of Performance Analysis in Sport 13(3): 724–733 . Maher [1982] Maher, M.J. 1982. Modelling association football scores. Statistica Neerlandica 36(3): 109–118 . McHale and Scarf [2007] McHale, I. and P. Scarf. 2007. Modelling soccer matches using bivariate discrete distributions with general dependence structure. Statistica Neerlandica 61(4): 432–445 . Michels et al. [2023] Michels, R., M. Ötting, and D. Karlis. 2023. Extending the Dixon and Coles model: an application to women’s football data. arXiv preprint arXiv:2307.02139 . Michels et al. [2023] Michels, R., M. Ötting, and R. Langrock. 2023. Bettors’ reaction to match dynamics: Evidence from in-game betting. European Journal of Operational Research 310(3): 1118–1127 . Ntzoufras et al. [2021] Ntzoufras, I., V. Palaskas, and S. Drikos. 2021. Bayesian models for prediction of the set-difference in volleyball. IMA Journal of Management Mathematics 32(4): 491–518 . Ötting et al. [2024] Ötting, M., R. Michels, R. Langrock, and C. Deutscher. 2024. Demand for live betting: An analysis using state-space models. Applied Stochastic Models in Business and Industry . Pelechrinis and Winston [2021] Pelechrinis, K. and W. Winston. 2021. A Skellam regression model for quantifying positional value in soccer. Journal of Quantitative Analysis in Sports 17(3): 187–201 . Prieto et al. [2016] Prieto, J., M.Á. Gómez, A. Volossovitch, and J. Sampaio. 2016. Effects of team timeouts on the teams’ scoring performance in elite handball close games. Kinesiology 48(1.): 115–123 . Singh et al. [2023] Singh, A., P. Scarf, and R. Baker. 2023. A unified theory for bivariate scores in possessive ball-sports: The case of handball. European Journal of Operational Research 304(3): 1099–1112 . Skellam [1946] Skellam, J. 1946. The frequency distribution of the difference between two Poisson variates belonging to different populations. Journal of the Royal Statistical Society. Series A 109(3): 296–296 . Smiatek and Heuer [2012] Smiatek, J. and A. Heuer. 2012. A statistical view on team handball results: home advantage, team fitness and prediction of match outcomes. arXiv preprint arXiv:1207.0700 . Tomy and Veena [2022] Tomy, L. and G. Veena. 2022. A retrospective study on Skellam and related distributions. Austrian Journal of Statistics 51(1): 102–111 . Van Eetvelde et al. [2023] Van Eetvelde, H., L.M. Hvattum, and C. Ley. 2023. The probabilistic final standing calculator: a fair stochastic tool to handle abruptly stopped football seasons. AStA Advances in Statistical Analysis 107(1-2): 251–269 . Volossovitch and Debanne [2021] Volossovitch, A. and T. Debanne. 2021. Home advantage in handball. Home Advantage in Sport: Causes and the Effect on Performance: 220–227 . Karlis, D. and N. Mamode Khan. 2023. Models for integer data. Annual Review of Statistics and its Application 10: 297–323 . Karlis and Ntzoufras [2006] Karlis, D. and I. Ntzoufras. 2006. Bayesian analysis of the differences of count data. Statistics in Medicine 25(11): 1885–1905 . Koopman et al. [2017] Koopman, S.J., R. Lit, and A. Lucas. 2017. Intraday stochastic volatility in discrete price changes: the dynamic Skellam model. Journal of the American Statistical Association 112(520): 1490–1503 . Lago-Peñas et al. [2013] Lago-Peñas, C., M.A. Gomez, J. Viaño, and I. González-García. 2013. Home advantage in elite handball: the impact of the quality of opposition on team performance. International Journal of Performance Analysis in Sport 13(3): 724–733 . Maher [1982] Maher, M.J. 1982. Modelling association football scores. Statistica Neerlandica 36(3): 109–118 . McHale and Scarf [2007] McHale, I. and P. Scarf. 2007. Modelling soccer matches using bivariate discrete distributions with general dependence structure. Statistica Neerlandica 61(4): 432–445 . Michels et al. [2023] Michels, R., M. Ötting, and D. Karlis. 2023. Extending the Dixon and Coles model: an application to women’s football data. arXiv preprint arXiv:2307.02139 . Michels et al. [2023] Michels, R., M. Ötting, and R. Langrock. 2023. Bettors’ reaction to match dynamics: Evidence from in-game betting. European Journal of Operational Research 310(3): 1118–1127 . Ntzoufras et al. [2021] Ntzoufras, I., V. Palaskas, and S. Drikos. 2021. Bayesian models for prediction of the set-difference in volleyball. IMA Journal of Management Mathematics 32(4): 491–518 . Ötting et al. [2024] Ötting, M., R. Michels, R. Langrock, and C. Deutscher. 2024. Demand for live betting: An analysis using state-space models. Applied Stochastic Models in Business and Industry . Pelechrinis and Winston [2021] Pelechrinis, K. and W. Winston. 2021. A Skellam regression model for quantifying positional value in soccer. Journal of Quantitative Analysis in Sports 17(3): 187–201 . Prieto et al. [2016] Prieto, J., M.Á. Gómez, A. Volossovitch, and J. Sampaio. 2016. Effects of team timeouts on the teams’ scoring performance in elite handball close games. Kinesiology 48(1.): 115–123 . Singh et al. [2023] Singh, A., P. Scarf, and R. Baker. 2023. A unified theory for bivariate scores in possessive ball-sports: The case of handball. European Journal of Operational Research 304(3): 1099–1112 . Skellam [1946] Skellam, J. 1946. The frequency distribution of the difference between two Poisson variates belonging to different populations. Journal of the Royal Statistical Society. Series A 109(3): 296–296 . Smiatek and Heuer [2012] Smiatek, J. and A. Heuer. 2012. A statistical view on team handball results: home advantage, team fitness and prediction of match outcomes. arXiv preprint arXiv:1207.0700 . Tomy and Veena [2022] Tomy, L. and G. Veena. 2022. A retrospective study on Skellam and related distributions. Austrian Journal of Statistics 51(1): 102–111 . Van Eetvelde et al. [2023] Van Eetvelde, H., L.M. Hvattum, and C. Ley. 2023. The probabilistic final standing calculator: a fair stochastic tool to handle abruptly stopped football seasons. AStA Advances in Statistical Analysis 107(1-2): 251–269 . Volossovitch and Debanne [2021] Volossovitch, A. and T. Debanne. 2021. Home advantage in handball. Home Advantage in Sport: Causes and the Effect on Performance: 220–227 . Karlis, D. and I. Ntzoufras. 2006. Bayesian analysis of the differences of count data. Statistics in Medicine 25(11): 1885–1905 . Koopman et al. [2017] Koopman, S.J., R. Lit, and A. Lucas. 2017. Intraday stochastic volatility in discrete price changes: the dynamic Skellam model. Journal of the American Statistical Association 112(520): 1490–1503 . Lago-Peñas et al. [2013] Lago-Peñas, C., M.A. Gomez, J. Viaño, and I. González-García. 2013. Home advantage in elite handball: the impact of the quality of opposition on team performance. International Journal of Performance Analysis in Sport 13(3): 724–733 . Maher [1982] Maher, M.J. 1982. Modelling association football scores. Statistica Neerlandica 36(3): 109–118 . McHale and Scarf [2007] McHale, I. and P. Scarf. 2007. Modelling soccer matches using bivariate discrete distributions with general dependence structure. Statistica Neerlandica 61(4): 432–445 . Michels et al. [2023] Michels, R., M. Ötting, and D. Karlis. 2023. Extending the Dixon and Coles model: an application to women’s football data. arXiv preprint arXiv:2307.02139 . Michels et al. [2023] Michels, R., M. Ötting, and R. Langrock. 2023. Bettors’ reaction to match dynamics: Evidence from in-game betting. European Journal of Operational Research 310(3): 1118–1127 . Ntzoufras et al. [2021] Ntzoufras, I., V. Palaskas, and S. Drikos. 2021. Bayesian models for prediction of the set-difference in volleyball. IMA Journal of Management Mathematics 32(4): 491–518 . Ötting et al. [2024] Ötting, M., R. Michels, R. Langrock, and C. Deutscher. 2024. Demand for live betting: An analysis using state-space models. Applied Stochastic Models in Business and Industry . Pelechrinis and Winston [2021] Pelechrinis, K. and W. Winston. 2021. A Skellam regression model for quantifying positional value in soccer. Journal of Quantitative Analysis in Sports 17(3): 187–201 . Prieto et al. [2016] Prieto, J., M.Á. Gómez, A. Volossovitch, and J. Sampaio. 2016. Effects of team timeouts on the teams’ scoring performance in elite handball close games. Kinesiology 48(1.): 115–123 . Singh et al. [2023] Singh, A., P. Scarf, and R. Baker. 2023. A unified theory for bivariate scores in possessive ball-sports: The case of handball. European Journal of Operational Research 304(3): 1099–1112 . Skellam [1946] Skellam, J. 1946. The frequency distribution of the difference between two Poisson variates belonging to different populations. Journal of the Royal Statistical Society. Series A 109(3): 296–296 . Smiatek and Heuer [2012] Smiatek, J. and A. Heuer. 2012. A statistical view on team handball results: home advantage, team fitness and prediction of match outcomes. arXiv preprint arXiv:1207.0700 . Tomy and Veena [2022] Tomy, L. and G. Veena. 2022. A retrospective study on Skellam and related distributions. Austrian Journal of Statistics 51(1): 102–111 . Van Eetvelde et al. [2023] Van Eetvelde, H., L.M. Hvattum, and C. Ley. 2023. The probabilistic final standing calculator: a fair stochastic tool to handle abruptly stopped football seasons. AStA Advances in Statistical Analysis 107(1-2): 251–269 . Volossovitch and Debanne [2021] Volossovitch, A. and T. Debanne. 2021. Home advantage in handball. Home Advantage in Sport: Causes and the Effect on Performance: 220–227 . Koopman, S.J., R. Lit, and A. Lucas. 2017. Intraday stochastic volatility in discrete price changes: the dynamic Skellam model. Journal of the American Statistical Association 112(520): 1490–1503 . Lago-Peñas et al. [2013] Lago-Peñas, C., M.A. Gomez, J. Viaño, and I. González-García. 2013. Home advantage in elite handball: the impact of the quality of opposition on team performance. International Journal of Performance Analysis in Sport 13(3): 724–733 . Maher [1982] Maher, M.J. 1982. Modelling association football scores. Statistica Neerlandica 36(3): 109–118 . McHale and Scarf [2007] McHale, I. and P. Scarf. 2007. Modelling soccer matches using bivariate discrete distributions with general dependence structure. Statistica Neerlandica 61(4): 432–445 . Michels et al. [2023] Michels, R., M. Ötting, and D. Karlis. 2023. Extending the Dixon and Coles model: an application to women’s football data. arXiv preprint arXiv:2307.02139 . Michels et al. [2023] Michels, R., M. Ötting, and R. Langrock. 2023. Bettors’ reaction to match dynamics: Evidence from in-game betting. European Journal of Operational Research 310(3): 1118–1127 . Ntzoufras et al. [2021] Ntzoufras, I., V. Palaskas, and S. Drikos. 2021. Bayesian models for prediction of the set-difference in volleyball. IMA Journal of Management Mathematics 32(4): 491–518 . Ötting et al. [2024] Ötting, M., R. Michels, R. Langrock, and C. Deutscher. 2024. Demand for live betting: An analysis using state-space models. Applied Stochastic Models in Business and Industry . Pelechrinis and Winston [2021] Pelechrinis, K. and W. Winston. 2021. A Skellam regression model for quantifying positional value in soccer. Journal of Quantitative Analysis in Sports 17(3): 187–201 . Prieto et al. [2016] Prieto, J., M.Á. Gómez, A. Volossovitch, and J. Sampaio. 2016. Effects of team timeouts on the teams’ scoring performance in elite handball close games. Kinesiology 48(1.): 115–123 . Singh et al. [2023] Singh, A., P. Scarf, and R. Baker. 2023. A unified theory for bivariate scores in possessive ball-sports: The case of handball. European Journal of Operational Research 304(3): 1099–1112 . Skellam [1946] Skellam, J. 1946. The frequency distribution of the difference between two Poisson variates belonging to different populations. Journal of the Royal Statistical Society. Series A 109(3): 296–296 . Smiatek and Heuer [2012] Smiatek, J. and A. Heuer. 2012. A statistical view on team handball results: home advantage, team fitness and prediction of match outcomes. arXiv preprint arXiv:1207.0700 . Tomy and Veena [2022] Tomy, L. and G. Veena. 2022. A retrospective study on Skellam and related distributions. Austrian Journal of Statistics 51(1): 102–111 . Van Eetvelde et al. [2023] Van Eetvelde, H., L.M. Hvattum, and C. Ley. 2023. The probabilistic final standing calculator: a fair stochastic tool to handle abruptly stopped football seasons. AStA Advances in Statistical Analysis 107(1-2): 251–269 . Volossovitch and Debanne [2021] Volossovitch, A. and T. Debanne. 2021. Home advantage in handball. Home Advantage in Sport: Causes and the Effect on Performance: 220–227 . Lago-Peñas, C., M.A. Gomez, J. Viaño, and I. González-García. 2013. Home advantage in elite handball: the impact of the quality of opposition on team performance. International Journal of Performance Analysis in Sport 13(3): 724–733 . Maher [1982] Maher, M.J. 1982. Modelling association football scores. Statistica Neerlandica 36(3): 109–118 . McHale and Scarf [2007] McHale, I. and P. Scarf. 2007. Modelling soccer matches using bivariate discrete distributions with general dependence structure. Statistica Neerlandica 61(4): 432–445 . Michels et al. [2023] Michels, R., M. Ötting, and D. Karlis. 2023. Extending the Dixon and Coles model: an application to women’s football data. arXiv preprint arXiv:2307.02139 . Michels et al. [2023] Michels, R., M. Ötting, and R. Langrock. 2023. Bettors’ reaction to match dynamics: Evidence from in-game betting. European Journal of Operational Research 310(3): 1118–1127 . Ntzoufras et al. [2021] Ntzoufras, I., V. Palaskas, and S. Drikos. 2021. Bayesian models for prediction of the set-difference in volleyball. IMA Journal of Management Mathematics 32(4): 491–518 . Ötting et al. [2024] Ötting, M., R. Michels, R. Langrock, and C. Deutscher. 2024. Demand for live betting: An analysis using state-space models. Applied Stochastic Models in Business and Industry . Pelechrinis and Winston [2021] Pelechrinis, K. and W. Winston. 2021. A Skellam regression model for quantifying positional value in soccer. Journal of Quantitative Analysis in Sports 17(3): 187–201 . Prieto et al. [2016] Prieto, J., M.Á. Gómez, A. Volossovitch, and J. Sampaio. 2016. Effects of team timeouts on the teams’ scoring performance in elite handball close games. Kinesiology 48(1.): 115–123 . Singh et al. [2023] Singh, A., P. Scarf, and R. Baker. 2023. A unified theory for bivariate scores in possessive ball-sports: The case of handball. European Journal of Operational Research 304(3): 1099–1112 . Skellam [1946] Skellam, J. 1946. The frequency distribution of the difference between two Poisson variates belonging to different populations. Journal of the Royal Statistical Society. Series A 109(3): 296–296 . Smiatek and Heuer [2012] Smiatek, J. and A. Heuer. 2012. A statistical view on team handball results: home advantage, team fitness and prediction of match outcomes. arXiv preprint arXiv:1207.0700 . Tomy and Veena [2022] Tomy, L. and G. Veena. 2022. A retrospective study on Skellam and related distributions. Austrian Journal of Statistics 51(1): 102–111 . Van Eetvelde et al. [2023] Van Eetvelde, H., L.M. Hvattum, and C. Ley. 2023. The probabilistic final standing calculator: a fair stochastic tool to handle abruptly stopped football seasons. AStA Advances in Statistical Analysis 107(1-2): 251–269 . Volossovitch and Debanne [2021] Volossovitch, A. and T. Debanne. 2021. Home advantage in handball. Home Advantage in Sport: Causes and the Effect on Performance: 220–227 . Maher, M.J. 1982. Modelling association football scores. Statistica Neerlandica 36(3): 109–118 . McHale and Scarf [2007] McHale, I. and P. Scarf. 2007. Modelling soccer matches using bivariate discrete distributions with general dependence structure. Statistica Neerlandica 61(4): 432–445 . Michels et al. [2023] Michels, R., M. Ötting, and D. Karlis. 2023. Extending the Dixon and Coles model: an application to women’s football data. arXiv preprint arXiv:2307.02139 . Michels et al. [2023] Michels, R., M. Ötting, and R. Langrock. 2023. Bettors’ reaction to match dynamics: Evidence from in-game betting. European Journal of Operational Research 310(3): 1118–1127 . Ntzoufras et al. [2021] Ntzoufras, I., V. Palaskas, and S. Drikos. 2021. Bayesian models for prediction of the set-difference in volleyball. IMA Journal of Management Mathematics 32(4): 491–518 . Ötting et al. [2024] Ötting, M., R. Michels, R. Langrock, and C. Deutscher. 2024. Demand for live betting: An analysis using state-space models. Applied Stochastic Models in Business and Industry . Pelechrinis and Winston [2021] Pelechrinis, K. and W. Winston. 2021. A Skellam regression model for quantifying positional value in soccer. Journal of Quantitative Analysis in Sports 17(3): 187–201 . Prieto et al. [2016] Prieto, J., M.Á. Gómez, A. Volossovitch, and J. Sampaio. 2016. Effects of team timeouts on the teams’ scoring performance in elite handball close games. Kinesiology 48(1.): 115–123 . Singh et al. [2023] Singh, A., P. Scarf, and R. Baker. 2023. A unified theory for bivariate scores in possessive ball-sports: The case of handball. European Journal of Operational Research 304(3): 1099–1112 . Skellam [1946] Skellam, J. 1946. The frequency distribution of the difference between two Poisson variates belonging to different populations. Journal of the Royal Statistical Society. Series A 109(3): 296–296 . Smiatek and Heuer [2012] Smiatek, J. and A. Heuer. 2012. A statistical view on team handball results: home advantage, team fitness and prediction of match outcomes. arXiv preprint arXiv:1207.0700 . Tomy and Veena [2022] Tomy, L. and G. Veena. 2022. A retrospective study on Skellam and related distributions. Austrian Journal of Statistics 51(1): 102–111 . Van Eetvelde et al. [2023] Van Eetvelde, H., L.M. Hvattum, and C. Ley. 2023. The probabilistic final standing calculator: a fair stochastic tool to handle abruptly stopped football seasons. AStA Advances in Statistical Analysis 107(1-2): 251–269 . Volossovitch and Debanne [2021] Volossovitch, A. and T. Debanne. 2021. Home advantage in handball. Home Advantage in Sport: Causes and the Effect on Performance: 220–227 . McHale, I. and P. Scarf. 2007. Modelling soccer matches using bivariate discrete distributions with general dependence structure. Statistica Neerlandica 61(4): 432–445 . Michels et al. [2023] Michels, R., M. Ötting, and D. Karlis. 2023. Extending the Dixon and Coles model: an application to women’s football data. arXiv preprint arXiv:2307.02139 . Michels et al. [2023] Michels, R., M. Ötting, and R. Langrock. 2023. Bettors’ reaction to match dynamics: Evidence from in-game betting. European Journal of Operational Research 310(3): 1118–1127 . Ntzoufras et al. [2021] Ntzoufras, I., V. Palaskas, and S. Drikos. 2021. Bayesian models for prediction of the set-difference in volleyball. IMA Journal of Management Mathematics 32(4): 491–518 . Ötting et al. [2024] Ötting, M., R. Michels, R. Langrock, and C. Deutscher. 2024. Demand for live betting: An analysis using state-space models. Applied Stochastic Models in Business and Industry . Pelechrinis and Winston [2021] Pelechrinis, K. and W. Winston. 2021. A Skellam regression model for quantifying positional value in soccer. Journal of Quantitative Analysis in Sports 17(3): 187–201 . Prieto et al. [2016] Prieto, J., M.Á. Gómez, A. Volossovitch, and J. Sampaio. 2016. Effects of team timeouts on the teams’ scoring performance in elite handball close games. Kinesiology 48(1.): 115–123 . Singh et al. [2023] Singh, A., P. Scarf, and R. Baker. 2023. A unified theory for bivariate scores in possessive ball-sports: The case of handball. European Journal of Operational Research 304(3): 1099–1112 . Skellam [1946] Skellam, J. 1946. The frequency distribution of the difference between two Poisson variates belonging to different populations. Journal of the Royal Statistical Society. Series A 109(3): 296–296 . Smiatek and Heuer [2012] Smiatek, J. and A. Heuer. 2012. A statistical view on team handball results: home advantage, team fitness and prediction of match outcomes. arXiv preprint arXiv:1207.0700 . Tomy and Veena [2022] Tomy, L. and G. Veena. 2022. A retrospective study on Skellam and related distributions. Austrian Journal of Statistics 51(1): 102–111 . Van Eetvelde et al. [2023] Van Eetvelde, H., L.M. Hvattum, and C. Ley. 2023. The probabilistic final standing calculator: a fair stochastic tool to handle abruptly stopped football seasons. AStA Advances in Statistical Analysis 107(1-2): 251–269 . Volossovitch and Debanne [2021] Volossovitch, A. and T. Debanne. 2021. Home advantage in handball. Home Advantage in Sport: Causes and the Effect on Performance: 220–227 . Michels, R., M. Ötting, and D. Karlis. 2023. Extending the Dixon and Coles model: an application to women’s football data. arXiv preprint arXiv:2307.02139 . Michels et al. [2023] Michels, R., M. Ötting, and R. Langrock. 2023. Bettors’ reaction to match dynamics: Evidence from in-game betting. European Journal of Operational Research 310(3): 1118–1127 . Ntzoufras et al. [2021] Ntzoufras, I., V. Palaskas, and S. Drikos. 2021. Bayesian models for prediction of the set-difference in volleyball. IMA Journal of Management Mathematics 32(4): 491–518 . Ötting et al. [2024] Ötting, M., R. Michels, R. Langrock, and C. Deutscher. 2024. Demand for live betting: An analysis using state-space models. Applied Stochastic Models in Business and Industry . Pelechrinis and Winston [2021] Pelechrinis, K. and W. Winston. 2021. A Skellam regression model for quantifying positional value in soccer. Journal of Quantitative Analysis in Sports 17(3): 187–201 . Prieto et al. [2016] Prieto, J., M.Á. Gómez, A. Volossovitch, and J. Sampaio. 2016. Effects of team timeouts on the teams’ scoring performance in elite handball close games. Kinesiology 48(1.): 115–123 . Singh et al. [2023] Singh, A., P. Scarf, and R. Baker. 2023. A unified theory for bivariate scores in possessive ball-sports: The case of handball. European Journal of Operational Research 304(3): 1099–1112 . Skellam [1946] Skellam, J. 1946. The frequency distribution of the difference between two Poisson variates belonging to different populations. Journal of the Royal Statistical Society. Series A 109(3): 296–296 . Smiatek and Heuer [2012] Smiatek, J. and A. Heuer. 2012. A statistical view on team handball results: home advantage, team fitness and prediction of match outcomes. arXiv preprint arXiv:1207.0700 . Tomy and Veena [2022] Tomy, L. and G. Veena. 2022. A retrospective study on Skellam and related distributions. Austrian Journal of Statistics 51(1): 102–111 . Van Eetvelde et al. [2023] Van Eetvelde, H., L.M. Hvattum, and C. Ley. 2023. The probabilistic final standing calculator: a fair stochastic tool to handle abruptly stopped football seasons. AStA Advances in Statistical Analysis 107(1-2): 251–269 . Volossovitch and Debanne [2021] Volossovitch, A. and T. Debanne. 2021. Home advantage in handball. Home Advantage in Sport: Causes and the Effect on Performance: 220–227 . Michels, R., M. Ötting, and R. Langrock. 2023. Bettors’ reaction to match dynamics: Evidence from in-game betting. European Journal of Operational Research 310(3): 1118–1127 . Ntzoufras et al. [2021] Ntzoufras, I., V. Palaskas, and S. Drikos. 2021. Bayesian models for prediction of the set-difference in volleyball. IMA Journal of Management Mathematics 32(4): 491–518 . Ötting et al. [2024] Ötting, M., R. Michels, R. Langrock, and C. Deutscher. 2024. Demand for live betting: An analysis using state-space models. Applied Stochastic Models in Business and Industry . Pelechrinis and Winston [2021] Pelechrinis, K. and W. Winston. 2021. A Skellam regression model for quantifying positional value in soccer. Journal of Quantitative Analysis in Sports 17(3): 187–201 . Prieto et al. [2016] Prieto, J., M.Á. Gómez, A. Volossovitch, and J. Sampaio. 2016. Effects of team timeouts on the teams’ scoring performance in elite handball close games. Kinesiology 48(1.): 115–123 . Singh et al. [2023] Singh, A., P. Scarf, and R. Baker. 2023. A unified theory for bivariate scores in possessive ball-sports: The case of handball. European Journal of Operational Research 304(3): 1099–1112 . Skellam [1946] Skellam, J. 1946. The frequency distribution of the difference between two Poisson variates belonging to different populations. Journal of the Royal Statistical Society. Series A 109(3): 296–296 . Smiatek and Heuer [2012] Smiatek, J. and A. Heuer. 2012. A statistical view on team handball results: home advantage, team fitness and prediction of match outcomes. arXiv preprint arXiv:1207.0700 . Tomy and Veena [2022] Tomy, L. and G. Veena. 2022. A retrospective study on Skellam and related distributions. Austrian Journal of Statistics 51(1): 102–111 . Van Eetvelde et al. [2023] Van Eetvelde, H., L.M. Hvattum, and C. Ley. 2023. The probabilistic final standing calculator: a fair stochastic tool to handle abruptly stopped football seasons. AStA Advances in Statistical Analysis 107(1-2): 251–269 . Volossovitch and Debanne [2021] Volossovitch, A. and T. Debanne. 2021. Home advantage in handball. Home Advantage in Sport: Causes and the Effect on Performance: 220–227 . Ntzoufras, I., V. Palaskas, and S. Drikos. 2021. Bayesian models for prediction of the set-difference in volleyball. IMA Journal of Management Mathematics 32(4): 491–518 . Ötting et al. [2024] Ötting, M., R. Michels, R. Langrock, and C. Deutscher. 2024. Demand for live betting: An analysis using state-space models. Applied Stochastic Models in Business and Industry . Pelechrinis and Winston [2021] Pelechrinis, K. and W. Winston. 2021. A Skellam regression model for quantifying positional value in soccer. Journal of Quantitative Analysis in Sports 17(3): 187–201 . Prieto et al. [2016] Prieto, J., M.Á. Gómez, A. Volossovitch, and J. Sampaio. 2016. Effects of team timeouts on the teams’ scoring performance in elite handball close games. Kinesiology 48(1.): 115–123 . Singh et al. [2023] Singh, A., P. Scarf, and R. Baker. 2023. A unified theory for bivariate scores in possessive ball-sports: The case of handball. European Journal of Operational Research 304(3): 1099–1112 . Skellam [1946] Skellam, J. 1946. The frequency distribution of the difference between two Poisson variates belonging to different populations. Journal of the Royal Statistical Society. Series A 109(3): 296–296 . Smiatek and Heuer [2012] Smiatek, J. and A. Heuer. 2012. A statistical view on team handball results: home advantage, team fitness and prediction of match outcomes. arXiv preprint arXiv:1207.0700 . Tomy and Veena [2022] Tomy, L. and G. Veena. 2022. A retrospective study on Skellam and related distributions. Austrian Journal of Statistics 51(1): 102–111 . Van Eetvelde et al. [2023] Van Eetvelde, H., L.M. Hvattum, and C. Ley. 2023. The probabilistic final standing calculator: a fair stochastic tool to handle abruptly stopped football seasons. AStA Advances in Statistical Analysis 107(1-2): 251–269 . Volossovitch and Debanne [2021] Volossovitch, A. and T. Debanne. 2021. Home advantage in handball. Home Advantage in Sport: Causes and the Effect on Performance: 220–227 . Ötting, M., R. Michels, R. Langrock, and C. Deutscher. 2024. Demand for live betting: An analysis using state-space models. Applied Stochastic Models in Business and Industry . Pelechrinis and Winston [2021] Pelechrinis, K. and W. Winston. 2021. A Skellam regression model for quantifying positional value in soccer. Journal of Quantitative Analysis in Sports 17(3): 187–201 . Prieto et al. [2016] Prieto, J., M.Á. Gómez, A. Volossovitch, and J. Sampaio. 2016. Effects of team timeouts on the teams’ scoring performance in elite handball close games. Kinesiology 48(1.): 115–123 . Singh et al. [2023] Singh, A., P. Scarf, and R. Baker. 2023. A unified theory for bivariate scores in possessive ball-sports: The case of handball. European Journal of Operational Research 304(3): 1099–1112 . Skellam [1946] Skellam, J. 1946. The frequency distribution of the difference between two Poisson variates belonging to different populations. Journal of the Royal Statistical Society. Series A 109(3): 296–296 . Smiatek and Heuer [2012] Smiatek, J. and A. Heuer. 2012. A statistical view on team handball results: home advantage, team fitness and prediction of match outcomes. arXiv preprint arXiv:1207.0700 . Tomy and Veena [2022] Tomy, L. and G. Veena. 2022. A retrospective study on Skellam and related distributions. Austrian Journal of Statistics 51(1): 102–111 . Van Eetvelde et al. [2023] Van Eetvelde, H., L.M. Hvattum, and C. Ley. 2023. The probabilistic final standing calculator: a fair stochastic tool to handle abruptly stopped football seasons. AStA Advances in Statistical Analysis 107(1-2): 251–269 . Volossovitch and Debanne [2021] Volossovitch, A. and T. Debanne. 2021. Home advantage in handball. Home Advantage in Sport: Causes and the Effect on Performance: 220–227 . Pelechrinis, K. and W. Winston. 2021. A Skellam regression model for quantifying positional value in soccer. Journal of Quantitative Analysis in Sports 17(3): 187–201 . Prieto et al. [2016] Prieto, J., M.Á. Gómez, A. Volossovitch, and J. Sampaio. 2016. Effects of team timeouts on the teams’ scoring performance in elite handball close games. Kinesiology 48(1.): 115–123 . Singh et al. [2023] Singh, A., P. Scarf, and R. Baker. 2023. A unified theory for bivariate scores in possessive ball-sports: The case of handball. European Journal of Operational Research 304(3): 1099–1112 . Skellam [1946] Skellam, J. 1946. The frequency distribution of the difference between two Poisson variates belonging to different populations. Journal of the Royal Statistical Society. Series A 109(3): 296–296 . Smiatek and Heuer [2012] Smiatek, J. and A. Heuer. 2012. A statistical view on team handball results: home advantage, team fitness and prediction of match outcomes. arXiv preprint arXiv:1207.0700 . Tomy and Veena [2022] Tomy, L. and G. Veena. 2022. A retrospective study on Skellam and related distributions. Austrian Journal of Statistics 51(1): 102–111 . Van Eetvelde et al. [2023] Van Eetvelde, H., L.M. Hvattum, and C. Ley. 2023. The probabilistic final standing calculator: a fair stochastic tool to handle abruptly stopped football seasons. AStA Advances in Statistical Analysis 107(1-2): 251–269 . Volossovitch and Debanne [2021] Volossovitch, A. and T. Debanne. 2021. Home advantage in handball. Home Advantage in Sport: Causes and the Effect on Performance: 220–227 . Prieto, J., M.Á. Gómez, A. Volossovitch, and J. Sampaio. 2016. Effects of team timeouts on the teams’ scoring performance in elite handball close games. Kinesiology 48(1.): 115–123 . Singh et al. [2023] Singh, A., P. Scarf, and R. Baker. 2023. A unified theory for bivariate scores in possessive ball-sports: The case of handball. European Journal of Operational Research 304(3): 1099–1112 . Skellam [1946] Skellam, J. 1946. The frequency distribution of the difference between two Poisson variates belonging to different populations. Journal of the Royal Statistical Society. Series A 109(3): 296–296 . Smiatek and Heuer [2012] Smiatek, J. and A. Heuer. 2012. A statistical view on team handball results: home advantage, team fitness and prediction of match outcomes. arXiv preprint arXiv:1207.0700 . Tomy and Veena [2022] Tomy, L. and G. Veena. 2022. A retrospective study on Skellam and related distributions. Austrian Journal of Statistics 51(1): 102–111 . Van Eetvelde et al. [2023] Van Eetvelde, H., L.M. Hvattum, and C. Ley. 2023. The probabilistic final standing calculator: a fair stochastic tool to handle abruptly stopped football seasons. AStA Advances in Statistical Analysis 107(1-2): 251–269 . Volossovitch and Debanne [2021] Volossovitch, A. and T. Debanne. 2021. Home advantage in handball. Home Advantage in Sport: Causes and the Effect on Performance: 220–227 . Singh, A., P. Scarf, and R. Baker. 2023. A unified theory for bivariate scores in possessive ball-sports: The case of handball. European Journal of Operational Research 304(3): 1099–1112 . Skellam [1946] Skellam, J. 1946. The frequency distribution of the difference between two Poisson variates belonging to different populations. Journal of the Royal Statistical Society. Series A 109(3): 296–296 . Smiatek and Heuer [2012] Smiatek, J. and A. Heuer. 2012. A statistical view on team handball results: home advantage, team fitness and prediction of match outcomes. arXiv preprint arXiv:1207.0700 . Tomy and Veena [2022] Tomy, L. and G. Veena. 2022. A retrospective study on Skellam and related distributions. Austrian Journal of Statistics 51(1): 102–111 . Van Eetvelde et al. [2023] Van Eetvelde, H., L.M. Hvattum, and C. Ley. 2023. The probabilistic final standing calculator: a fair stochastic tool to handle abruptly stopped football seasons. AStA Advances in Statistical Analysis 107(1-2): 251–269 . Volossovitch and Debanne [2021] Volossovitch, A. and T. Debanne. 2021. Home advantage in handball. Home Advantage in Sport: Causes and the Effect on Performance: 220–227 . Skellam, J. 1946. The frequency distribution of the difference between two Poisson variates belonging to different populations. Journal of the Royal Statistical Society. Series A 109(3): 296–296 . Smiatek and Heuer [2012] Smiatek, J. and A. Heuer. 2012. A statistical view on team handball results: home advantage, team fitness and prediction of match outcomes. arXiv preprint arXiv:1207.0700 . Tomy and Veena [2022] Tomy, L. and G. Veena. 2022. A retrospective study on Skellam and related distributions. Austrian Journal of Statistics 51(1): 102–111 . Van Eetvelde et al. [2023] Van Eetvelde, H., L.M. Hvattum, and C. Ley. 2023. The probabilistic final standing calculator: a fair stochastic tool to handle abruptly stopped football seasons. AStA Advances in Statistical Analysis 107(1-2): 251–269 . Volossovitch and Debanne [2021] Volossovitch, A. and T. Debanne. 2021. Home advantage in handball. Home Advantage in Sport: Causes and the Effect on Performance: 220–227 . Smiatek, J. and A. Heuer. 2012. A statistical view on team handball results: home advantage, team fitness and prediction of match outcomes. arXiv preprint arXiv:1207.0700 . Tomy and Veena [2022] Tomy, L. and G. Veena. 2022. A retrospective study on Skellam and related distributions. Austrian Journal of Statistics 51(1): 102–111 . Van Eetvelde et al. [2023] Van Eetvelde, H., L.M. Hvattum, and C. Ley. 2023. The probabilistic final standing calculator: a fair stochastic tool to handle abruptly stopped football seasons. AStA Advances in Statistical Analysis 107(1-2): 251–269 . Volossovitch and Debanne [2021] Volossovitch, A. and T. Debanne. 2021. Home advantage in handball. Home Advantage in Sport: Causes and the Effect on Performance: 220–227 . Tomy, L. and G. Veena. 2022. A retrospective study on Skellam and related distributions. Austrian Journal of Statistics 51(1): 102–111 . Van Eetvelde et al. [2023] Van Eetvelde, H., L.M. Hvattum, and C. Ley. 2023. The probabilistic final standing calculator: a fair stochastic tool to handle abruptly stopped football seasons. AStA Advances in Statistical Analysis 107(1-2): 251–269 . Volossovitch and Debanne [2021] Volossovitch, A. and T. Debanne. 2021. Home advantage in handball. Home Advantage in Sport: Causes and the Effect on Performance: 220–227 . Van Eetvelde, H., L.M. Hvattum, and C. Ley. 2023. The probabilistic final standing calculator: a fair stochastic tool to handle abruptly stopped football seasons. AStA Advances in Statistical Analysis 107(1-2): 251–269 . Volossovitch and Debanne [2021] Volossovitch, A. and T. Debanne. 2021. Home advantage in handball. Home Advantage in Sport: Causes and the Effect on Performance: 220–227 . Volossovitch, A. and T. Debanne. 2021. Home advantage in handball. Home Advantage in Sport: Causes and the Effect on Performance: 220–227 .
- Holmes, B. and I.G. McHale. 2024. Forecasting football match results using a player rating based model. International Journal of Forecasting 40(1): 302–312 . Irwin [1937] Irwin, J.O. 1937. The frequency distribution of the difference between two independent variates following the same Poisson distribution. Journal of the Royal Statistical Society 100(3): 415–416 . Jiang et al. [2014] Jiang, L., K. Mao, and R. Wu. 2014. A Skellam model to identify differential patterns of gene expression induced by environmental signals. BMC Genomics 15(1): 1–9 . Karlis and Mamode Khan [2023] Karlis, D. and N. Mamode Khan. 2023. Models for integer data. Annual Review of Statistics and its Application 10: 297–323 . Karlis and Ntzoufras [2006] Karlis, D. and I. Ntzoufras. 2006. Bayesian analysis of the differences of count data. Statistics in Medicine 25(11): 1885–1905 . Koopman et al. [2017] Koopman, S.J., R. Lit, and A. Lucas. 2017. Intraday stochastic volatility in discrete price changes: the dynamic Skellam model. Journal of the American Statistical Association 112(520): 1490–1503 . Lago-Peñas et al. [2013] Lago-Peñas, C., M.A. Gomez, J. Viaño, and I. González-García. 2013. Home advantage in elite handball: the impact of the quality of opposition on team performance. International Journal of Performance Analysis in Sport 13(3): 724–733 . Maher [1982] Maher, M.J. 1982. Modelling association football scores. Statistica Neerlandica 36(3): 109–118 . McHale and Scarf [2007] McHale, I. and P. Scarf. 2007. Modelling soccer matches using bivariate discrete distributions with general dependence structure. Statistica Neerlandica 61(4): 432–445 . Michels et al. [2023] Michels, R., M. Ötting, and D. Karlis. 2023. Extending the Dixon and Coles model: an application to women’s football data. arXiv preprint arXiv:2307.02139 . Michels et al. [2023] Michels, R., M. Ötting, and R. Langrock. 2023. Bettors’ reaction to match dynamics: Evidence from in-game betting. European Journal of Operational Research 310(3): 1118–1127 . Ntzoufras et al. [2021] Ntzoufras, I., V. Palaskas, and S. Drikos. 2021. Bayesian models for prediction of the set-difference in volleyball. IMA Journal of Management Mathematics 32(4): 491–518 . Ötting et al. [2024] Ötting, M., R. Michels, R. Langrock, and C. Deutscher. 2024. Demand for live betting: An analysis using state-space models. Applied Stochastic Models in Business and Industry . Pelechrinis and Winston [2021] Pelechrinis, K. and W. Winston. 2021. A Skellam regression model for quantifying positional value in soccer. Journal of Quantitative Analysis in Sports 17(3): 187–201 . Prieto et al. [2016] Prieto, J., M.Á. Gómez, A. Volossovitch, and J. Sampaio. 2016. Effects of team timeouts on the teams’ scoring performance in elite handball close games. Kinesiology 48(1.): 115–123 . Singh et al. [2023] Singh, A., P. Scarf, and R. Baker. 2023. A unified theory for bivariate scores in possessive ball-sports: The case of handball. European Journal of Operational Research 304(3): 1099–1112 . Skellam [1946] Skellam, J. 1946. The frequency distribution of the difference between two Poisson variates belonging to different populations. Journal of the Royal Statistical Society. Series A 109(3): 296–296 . Smiatek and Heuer [2012] Smiatek, J. and A. Heuer. 2012. A statistical view on team handball results: home advantage, team fitness and prediction of match outcomes. arXiv preprint arXiv:1207.0700 . Tomy and Veena [2022] Tomy, L. and G. Veena. 2022. A retrospective study on Skellam and related distributions. Austrian Journal of Statistics 51(1): 102–111 . Van Eetvelde et al. [2023] Van Eetvelde, H., L.M. Hvattum, and C. Ley. 2023. The probabilistic final standing calculator: a fair stochastic tool to handle abruptly stopped football seasons. AStA Advances in Statistical Analysis 107(1-2): 251–269 . Volossovitch and Debanne [2021] Volossovitch, A. and T. Debanne. 2021. Home advantage in handball. Home Advantage in Sport: Causes and the Effect on Performance: 220–227 . Irwin, J.O. 1937. The frequency distribution of the difference between two independent variates following the same Poisson distribution. Journal of the Royal Statistical Society 100(3): 415–416 . Jiang et al. [2014] Jiang, L., K. Mao, and R. Wu. 2014. A Skellam model to identify differential patterns of gene expression induced by environmental signals. BMC Genomics 15(1): 1–9 . Karlis and Mamode Khan [2023] Karlis, D. and N. Mamode Khan. 2023. Models for integer data. Annual Review of Statistics and its Application 10: 297–323 . Karlis and Ntzoufras [2006] Karlis, D. and I. Ntzoufras. 2006. Bayesian analysis of the differences of count data. Statistics in Medicine 25(11): 1885–1905 . Koopman et al. [2017] Koopman, S.J., R. Lit, and A. Lucas. 2017. Intraday stochastic volatility in discrete price changes: the dynamic Skellam model. Journal of the American Statistical Association 112(520): 1490–1503 . Lago-Peñas et al. [2013] Lago-Peñas, C., M.A. Gomez, J. Viaño, and I. González-García. 2013. Home advantage in elite handball: the impact of the quality of opposition on team performance. International Journal of Performance Analysis in Sport 13(3): 724–733 . Maher [1982] Maher, M.J. 1982. Modelling association football scores. Statistica Neerlandica 36(3): 109–118 . McHale and Scarf [2007] McHale, I. and P. Scarf. 2007. Modelling soccer matches using bivariate discrete distributions with general dependence structure. Statistica Neerlandica 61(4): 432–445 . Michels et al. [2023] Michels, R., M. Ötting, and D. Karlis. 2023. Extending the Dixon and Coles model: an application to women’s football data. arXiv preprint arXiv:2307.02139 . Michels et al. [2023] Michels, R., M. Ötting, and R. Langrock. 2023. Bettors’ reaction to match dynamics: Evidence from in-game betting. European Journal of Operational Research 310(3): 1118–1127 . Ntzoufras et al. [2021] Ntzoufras, I., V. Palaskas, and S. Drikos. 2021. Bayesian models for prediction of the set-difference in volleyball. IMA Journal of Management Mathematics 32(4): 491–518 . Ötting et al. [2024] Ötting, M., R. Michels, R. Langrock, and C. Deutscher. 2024. Demand for live betting: An analysis using state-space models. Applied Stochastic Models in Business and Industry . Pelechrinis and Winston [2021] Pelechrinis, K. and W. Winston. 2021. A Skellam regression model for quantifying positional value in soccer. Journal of Quantitative Analysis in Sports 17(3): 187–201 . Prieto et al. [2016] Prieto, J., M.Á. Gómez, A. Volossovitch, and J. Sampaio. 2016. Effects of team timeouts on the teams’ scoring performance in elite handball close games. Kinesiology 48(1.): 115–123 . Singh et al. [2023] Singh, A., P. Scarf, and R. Baker. 2023. A unified theory for bivariate scores in possessive ball-sports: The case of handball. European Journal of Operational Research 304(3): 1099–1112 . Skellam [1946] Skellam, J. 1946. The frequency distribution of the difference between two Poisson variates belonging to different populations. Journal of the Royal Statistical Society. Series A 109(3): 296–296 . Smiatek and Heuer [2012] Smiatek, J. and A. Heuer. 2012. A statistical view on team handball results: home advantage, team fitness and prediction of match outcomes. arXiv preprint arXiv:1207.0700 . Tomy and Veena [2022] Tomy, L. and G. Veena. 2022. A retrospective study on Skellam and related distributions. Austrian Journal of Statistics 51(1): 102–111 . Van Eetvelde et al. [2023] Van Eetvelde, H., L.M. Hvattum, and C. Ley. 2023. The probabilistic final standing calculator: a fair stochastic tool to handle abruptly stopped football seasons. AStA Advances in Statistical Analysis 107(1-2): 251–269 . Volossovitch and Debanne [2021] Volossovitch, A. and T. Debanne. 2021. Home advantage in handball. Home Advantage in Sport: Causes and the Effect on Performance: 220–227 . Jiang, L., K. Mao, and R. Wu. 2014. A Skellam model to identify differential patterns of gene expression induced by environmental signals. BMC Genomics 15(1): 1–9 . Karlis and Mamode Khan [2023] Karlis, D. and N. Mamode Khan. 2023. Models for integer data. Annual Review of Statistics and its Application 10: 297–323 . Karlis and Ntzoufras [2006] Karlis, D. and I. Ntzoufras. 2006. Bayesian analysis of the differences of count data. Statistics in Medicine 25(11): 1885–1905 . Koopman et al. [2017] Koopman, S.J., R. Lit, and A. Lucas. 2017. Intraday stochastic volatility in discrete price changes: the dynamic Skellam model. Journal of the American Statistical Association 112(520): 1490–1503 . Lago-Peñas et al. [2013] Lago-Peñas, C., M.A. Gomez, J. Viaño, and I. González-García. 2013. Home advantage in elite handball: the impact of the quality of opposition on team performance. International Journal of Performance Analysis in Sport 13(3): 724–733 . Maher [1982] Maher, M.J. 1982. Modelling association football scores. Statistica Neerlandica 36(3): 109–118 . McHale and Scarf [2007] McHale, I. and P. Scarf. 2007. Modelling soccer matches using bivariate discrete distributions with general dependence structure. Statistica Neerlandica 61(4): 432–445 . Michels et al. [2023] Michels, R., M. Ötting, and D. Karlis. 2023. Extending the Dixon and Coles model: an application to women’s football data. arXiv preprint arXiv:2307.02139 . Michels et al. [2023] Michels, R., M. Ötting, and R. Langrock. 2023. Bettors’ reaction to match dynamics: Evidence from in-game betting. European Journal of Operational Research 310(3): 1118–1127 . Ntzoufras et al. [2021] Ntzoufras, I., V. Palaskas, and S. Drikos. 2021. Bayesian models for prediction of the set-difference in volleyball. IMA Journal of Management Mathematics 32(4): 491–518 . Ötting et al. [2024] Ötting, M., R. Michels, R. Langrock, and C. Deutscher. 2024. Demand for live betting: An analysis using state-space models. Applied Stochastic Models in Business and Industry . Pelechrinis and Winston [2021] Pelechrinis, K. and W. Winston. 2021. A Skellam regression model for quantifying positional value in soccer. Journal of Quantitative Analysis in Sports 17(3): 187–201 . Prieto et al. [2016] Prieto, J., M.Á. Gómez, A. Volossovitch, and J. Sampaio. 2016. Effects of team timeouts on the teams’ scoring performance in elite handball close games. Kinesiology 48(1.): 115–123 . Singh et al. [2023] Singh, A., P. Scarf, and R. Baker. 2023. A unified theory for bivariate scores in possessive ball-sports: The case of handball. European Journal of Operational Research 304(3): 1099–1112 . Skellam [1946] Skellam, J. 1946. The frequency distribution of the difference between two Poisson variates belonging to different populations. Journal of the Royal Statistical Society. Series A 109(3): 296–296 . Smiatek and Heuer [2012] Smiatek, J. and A. Heuer. 2012. A statistical view on team handball results: home advantage, team fitness and prediction of match outcomes. arXiv preprint arXiv:1207.0700 . Tomy and Veena [2022] Tomy, L. and G. Veena. 2022. A retrospective study on Skellam and related distributions. Austrian Journal of Statistics 51(1): 102–111 . Van Eetvelde et al. [2023] Van Eetvelde, H., L.M. Hvattum, and C. Ley. 2023. The probabilistic final standing calculator: a fair stochastic tool to handle abruptly stopped football seasons. AStA Advances in Statistical Analysis 107(1-2): 251–269 . Volossovitch and Debanne [2021] Volossovitch, A. and T. Debanne. 2021. Home advantage in handball. Home Advantage in Sport: Causes and the Effect on Performance: 220–227 . Karlis, D. and N. Mamode Khan. 2023. Models for integer data. Annual Review of Statistics and its Application 10: 297–323 . Karlis and Ntzoufras [2006] Karlis, D. and I. Ntzoufras. 2006. Bayesian analysis of the differences of count data. Statistics in Medicine 25(11): 1885–1905 . Koopman et al. [2017] Koopman, S.J., R. Lit, and A. Lucas. 2017. Intraday stochastic volatility in discrete price changes: the dynamic Skellam model. Journal of the American Statistical Association 112(520): 1490–1503 . Lago-Peñas et al. [2013] Lago-Peñas, C., M.A. Gomez, J. Viaño, and I. González-García. 2013. Home advantage in elite handball: the impact of the quality of opposition on team performance. International Journal of Performance Analysis in Sport 13(3): 724–733 . Maher [1982] Maher, M.J. 1982. Modelling association football scores. Statistica Neerlandica 36(3): 109–118 . McHale and Scarf [2007] McHale, I. and P. Scarf. 2007. Modelling soccer matches using bivariate discrete distributions with general dependence structure. Statistica Neerlandica 61(4): 432–445 . Michels et al. [2023] Michels, R., M. Ötting, and D. Karlis. 2023. Extending the Dixon and Coles model: an application to women’s football data. arXiv preprint arXiv:2307.02139 . Michels et al. [2023] Michels, R., M. Ötting, and R. Langrock. 2023. Bettors’ reaction to match dynamics: Evidence from in-game betting. European Journal of Operational Research 310(3): 1118–1127 . Ntzoufras et al. [2021] Ntzoufras, I., V. Palaskas, and S. Drikos. 2021. Bayesian models for prediction of the set-difference in volleyball. IMA Journal of Management Mathematics 32(4): 491–518 . Ötting et al. [2024] Ötting, M., R. Michels, R. Langrock, and C. Deutscher. 2024. Demand for live betting: An analysis using state-space models. Applied Stochastic Models in Business and Industry . Pelechrinis and Winston [2021] Pelechrinis, K. and W. Winston. 2021. A Skellam regression model for quantifying positional value in soccer. Journal of Quantitative Analysis in Sports 17(3): 187–201 . Prieto et al. [2016] Prieto, J., M.Á. Gómez, A. Volossovitch, and J. Sampaio. 2016. Effects of team timeouts on the teams’ scoring performance in elite handball close games. Kinesiology 48(1.): 115–123 . Singh et al. [2023] Singh, A., P. Scarf, and R. Baker. 2023. A unified theory for bivariate scores in possessive ball-sports: The case of handball. European Journal of Operational Research 304(3): 1099–1112 . Skellam [1946] Skellam, J. 1946. The frequency distribution of the difference between two Poisson variates belonging to different populations. Journal of the Royal Statistical Society. Series A 109(3): 296–296 . Smiatek and Heuer [2012] Smiatek, J. and A. Heuer. 2012. A statistical view on team handball results: home advantage, team fitness and prediction of match outcomes. arXiv preprint arXiv:1207.0700 . Tomy and Veena [2022] Tomy, L. and G. Veena. 2022. A retrospective study on Skellam and related distributions. Austrian Journal of Statistics 51(1): 102–111 . Van Eetvelde et al. [2023] Van Eetvelde, H., L.M. Hvattum, and C. Ley. 2023. The probabilistic final standing calculator: a fair stochastic tool to handle abruptly stopped football seasons. AStA Advances in Statistical Analysis 107(1-2): 251–269 . Volossovitch and Debanne [2021] Volossovitch, A. and T. Debanne. 2021. Home advantage in handball. Home Advantage in Sport: Causes and the Effect on Performance: 220–227 . Karlis, D. and I. Ntzoufras. 2006. Bayesian analysis of the differences of count data. Statistics in Medicine 25(11): 1885–1905 . Koopman et al. [2017] Koopman, S.J., R. Lit, and A. Lucas. 2017. Intraday stochastic volatility in discrete price changes: the dynamic Skellam model. Journal of the American Statistical Association 112(520): 1490–1503 . Lago-Peñas et al. [2013] Lago-Peñas, C., M.A. Gomez, J. Viaño, and I. González-García. 2013. Home advantage in elite handball: the impact of the quality of opposition on team performance. International Journal of Performance Analysis in Sport 13(3): 724–733 . Maher [1982] Maher, M.J. 1982. Modelling association football scores. Statistica Neerlandica 36(3): 109–118 . McHale and Scarf [2007] McHale, I. and P. Scarf. 2007. Modelling soccer matches using bivariate discrete distributions with general dependence structure. Statistica Neerlandica 61(4): 432–445 . Michels et al. [2023] Michels, R., M. Ötting, and D. Karlis. 2023. Extending the Dixon and Coles model: an application to women’s football data. arXiv preprint arXiv:2307.02139 . Michels et al. [2023] Michels, R., M. Ötting, and R. Langrock. 2023. Bettors’ reaction to match dynamics: Evidence from in-game betting. European Journal of Operational Research 310(3): 1118–1127 . Ntzoufras et al. [2021] Ntzoufras, I., V. Palaskas, and S. Drikos. 2021. Bayesian models for prediction of the set-difference in volleyball. IMA Journal of Management Mathematics 32(4): 491–518 . Ötting et al. [2024] Ötting, M., R. Michels, R. Langrock, and C. Deutscher. 2024. Demand for live betting: An analysis using state-space models. Applied Stochastic Models in Business and Industry . Pelechrinis and Winston [2021] Pelechrinis, K. and W. Winston. 2021. A Skellam regression model for quantifying positional value in soccer. Journal of Quantitative Analysis in Sports 17(3): 187–201 . Prieto et al. [2016] Prieto, J., M.Á. Gómez, A. Volossovitch, and J. Sampaio. 2016. Effects of team timeouts on the teams’ scoring performance in elite handball close games. Kinesiology 48(1.): 115–123 . Singh et al. [2023] Singh, A., P. Scarf, and R. Baker. 2023. A unified theory for bivariate scores in possessive ball-sports: The case of handball. European Journal of Operational Research 304(3): 1099–1112 . Skellam [1946] Skellam, J. 1946. The frequency distribution of the difference between two Poisson variates belonging to different populations. Journal of the Royal Statistical Society. Series A 109(3): 296–296 . Smiatek and Heuer [2012] Smiatek, J. and A. Heuer. 2012. A statistical view on team handball results: home advantage, team fitness and prediction of match outcomes. arXiv preprint arXiv:1207.0700 . Tomy and Veena [2022] Tomy, L. and G. Veena. 2022. A retrospective study on Skellam and related distributions. Austrian Journal of Statistics 51(1): 102–111 . Van Eetvelde et al. [2023] Van Eetvelde, H., L.M. Hvattum, and C. Ley. 2023. The probabilistic final standing calculator: a fair stochastic tool to handle abruptly stopped football seasons. AStA Advances in Statistical Analysis 107(1-2): 251–269 . Volossovitch and Debanne [2021] Volossovitch, A. and T. Debanne. 2021. Home advantage in handball. Home Advantage in Sport: Causes and the Effect on Performance: 220–227 . Koopman, S.J., R. Lit, and A. Lucas. 2017. Intraday stochastic volatility in discrete price changes: the dynamic Skellam model. Journal of the American Statistical Association 112(520): 1490–1503 . Lago-Peñas et al. [2013] Lago-Peñas, C., M.A. Gomez, J. Viaño, and I. González-García. 2013. Home advantage in elite handball: the impact of the quality of opposition on team performance. International Journal of Performance Analysis in Sport 13(3): 724–733 . Maher [1982] Maher, M.J. 1982. Modelling association football scores. Statistica Neerlandica 36(3): 109–118 . McHale and Scarf [2007] McHale, I. and P. Scarf. 2007. Modelling soccer matches using bivariate discrete distributions with general dependence structure. Statistica Neerlandica 61(4): 432–445 . Michels et al. [2023] Michels, R., M. Ötting, and D. Karlis. 2023. Extending the Dixon and Coles model: an application to women’s football data. arXiv preprint arXiv:2307.02139 . Michels et al. [2023] Michels, R., M. Ötting, and R. Langrock. 2023. Bettors’ reaction to match dynamics: Evidence from in-game betting. European Journal of Operational Research 310(3): 1118–1127 . Ntzoufras et al. [2021] Ntzoufras, I., V. Palaskas, and S. Drikos. 2021. Bayesian models for prediction of the set-difference in volleyball. IMA Journal of Management Mathematics 32(4): 491–518 . Ötting et al. [2024] Ötting, M., R. Michels, R. Langrock, and C. Deutscher. 2024. Demand for live betting: An analysis using state-space models. Applied Stochastic Models in Business and Industry . Pelechrinis and Winston [2021] Pelechrinis, K. and W. Winston. 2021. A Skellam regression model for quantifying positional value in soccer. Journal of Quantitative Analysis in Sports 17(3): 187–201 . Prieto et al. [2016] Prieto, J., M.Á. Gómez, A. Volossovitch, and J. Sampaio. 2016. Effects of team timeouts on the teams’ scoring performance in elite handball close games. Kinesiology 48(1.): 115–123 . Singh et al. [2023] Singh, A., P. Scarf, and R. Baker. 2023. A unified theory for bivariate scores in possessive ball-sports: The case of handball. European Journal of Operational Research 304(3): 1099–1112 . Skellam [1946] Skellam, J. 1946. The frequency distribution of the difference between two Poisson variates belonging to different populations. Journal of the Royal Statistical Society. Series A 109(3): 296–296 . Smiatek and Heuer [2012] Smiatek, J. and A. Heuer. 2012. A statistical view on team handball results: home advantage, team fitness and prediction of match outcomes. arXiv preprint arXiv:1207.0700 . Tomy and Veena [2022] Tomy, L. and G. Veena. 2022. A retrospective study on Skellam and related distributions. Austrian Journal of Statistics 51(1): 102–111 . Van Eetvelde et al. [2023] Van Eetvelde, H., L.M. Hvattum, and C. Ley. 2023. The probabilistic final standing calculator: a fair stochastic tool to handle abruptly stopped football seasons. AStA Advances in Statistical Analysis 107(1-2): 251–269 . Volossovitch and Debanne [2021] Volossovitch, A. and T. Debanne. 2021. Home advantage in handball. Home Advantage in Sport: Causes and the Effect on Performance: 220–227 . Lago-Peñas, C., M.A. Gomez, J. Viaño, and I. González-García. 2013. Home advantage in elite handball: the impact of the quality of opposition on team performance. International Journal of Performance Analysis in Sport 13(3): 724–733 . Maher [1982] Maher, M.J. 1982. Modelling association football scores. Statistica Neerlandica 36(3): 109–118 . McHale and Scarf [2007] McHale, I. and P. Scarf. 2007. Modelling soccer matches using bivariate discrete distributions with general dependence structure. Statistica Neerlandica 61(4): 432–445 . Michels et al. [2023] Michels, R., M. Ötting, and D. Karlis. 2023. Extending the Dixon and Coles model: an application to women’s football data. arXiv preprint arXiv:2307.02139 . Michels et al. [2023] Michels, R., M. Ötting, and R. Langrock. 2023. Bettors’ reaction to match dynamics: Evidence from in-game betting. European Journal of Operational Research 310(3): 1118–1127 . Ntzoufras et al. [2021] Ntzoufras, I., V. Palaskas, and S. Drikos. 2021. Bayesian models for prediction of the set-difference in volleyball. IMA Journal of Management Mathematics 32(4): 491–518 . Ötting et al. [2024] Ötting, M., R. Michels, R. Langrock, and C. Deutscher. 2024. Demand for live betting: An analysis using state-space models. Applied Stochastic Models in Business and Industry . Pelechrinis and Winston [2021] Pelechrinis, K. and W. Winston. 2021. A Skellam regression model for quantifying positional value in soccer. Journal of Quantitative Analysis in Sports 17(3): 187–201 . Prieto et al. [2016] Prieto, J., M.Á. Gómez, A. Volossovitch, and J. Sampaio. 2016. Effects of team timeouts on the teams’ scoring performance in elite handball close games. Kinesiology 48(1.): 115–123 . Singh et al. [2023] Singh, A., P. Scarf, and R. Baker. 2023. A unified theory for bivariate scores in possessive ball-sports: The case of handball. European Journal of Operational Research 304(3): 1099–1112 . Skellam [1946] Skellam, J. 1946. The frequency distribution of the difference between two Poisson variates belonging to different populations. Journal of the Royal Statistical Society. Series A 109(3): 296–296 . Smiatek and Heuer [2012] Smiatek, J. and A. Heuer. 2012. A statistical view on team handball results: home advantage, team fitness and prediction of match outcomes. arXiv preprint arXiv:1207.0700 . Tomy and Veena [2022] Tomy, L. and G. Veena. 2022. A retrospective study on Skellam and related distributions. Austrian Journal of Statistics 51(1): 102–111 . Van Eetvelde et al. [2023] Van Eetvelde, H., L.M. Hvattum, and C. Ley. 2023. The probabilistic final standing calculator: a fair stochastic tool to handle abruptly stopped football seasons. AStA Advances in Statistical Analysis 107(1-2): 251–269 . Volossovitch and Debanne [2021] Volossovitch, A. and T. Debanne. 2021. Home advantage in handball. Home Advantage in Sport: Causes and the Effect on Performance: 220–227 . Maher, M.J. 1982. Modelling association football scores. Statistica Neerlandica 36(3): 109–118 . McHale and Scarf [2007] McHale, I. and P. Scarf. 2007. Modelling soccer matches using bivariate discrete distributions with general dependence structure. Statistica Neerlandica 61(4): 432–445 . Michels et al. [2023] Michels, R., M. Ötting, and D. Karlis. 2023. Extending the Dixon and Coles model: an application to women’s football data. arXiv preprint arXiv:2307.02139 . Michels et al. [2023] Michels, R., M. Ötting, and R. Langrock. 2023. Bettors’ reaction to match dynamics: Evidence from in-game betting. European Journal of Operational Research 310(3): 1118–1127 . Ntzoufras et al. [2021] Ntzoufras, I., V. Palaskas, and S. Drikos. 2021. Bayesian models for prediction of the set-difference in volleyball. IMA Journal of Management Mathematics 32(4): 491–518 . Ötting et al. [2024] Ötting, M., R. Michels, R. Langrock, and C. Deutscher. 2024. Demand for live betting: An analysis using state-space models. Applied Stochastic Models in Business and Industry . Pelechrinis and Winston [2021] Pelechrinis, K. and W. Winston. 2021. A Skellam regression model for quantifying positional value in soccer. Journal of Quantitative Analysis in Sports 17(3): 187–201 . Prieto et al. [2016] Prieto, J., M.Á. Gómez, A. Volossovitch, and J. Sampaio. 2016. Effects of team timeouts on the teams’ scoring performance in elite handball close games. Kinesiology 48(1.): 115–123 . Singh et al. [2023] Singh, A., P. Scarf, and R. Baker. 2023. A unified theory for bivariate scores in possessive ball-sports: The case of handball. European Journal of Operational Research 304(3): 1099–1112 . Skellam [1946] Skellam, J. 1946. The frequency distribution of the difference between two Poisson variates belonging to different populations. Journal of the Royal Statistical Society. Series A 109(3): 296–296 . Smiatek and Heuer [2012] Smiatek, J. and A. Heuer. 2012. A statistical view on team handball results: home advantage, team fitness and prediction of match outcomes. arXiv preprint arXiv:1207.0700 . Tomy and Veena [2022] Tomy, L. and G. Veena. 2022. A retrospective study on Skellam and related distributions. Austrian Journal of Statistics 51(1): 102–111 . Van Eetvelde et al. [2023] Van Eetvelde, H., L.M. Hvattum, and C. Ley. 2023. The probabilistic final standing calculator: a fair stochastic tool to handle abruptly stopped football seasons. AStA Advances in Statistical Analysis 107(1-2): 251–269 . Volossovitch and Debanne [2021] Volossovitch, A. and T. Debanne. 2021. Home advantage in handball. Home Advantage in Sport: Causes and the Effect on Performance: 220–227 . McHale, I. and P. Scarf. 2007. Modelling soccer matches using bivariate discrete distributions with general dependence structure. Statistica Neerlandica 61(4): 432–445 . Michels et al. [2023] Michels, R., M. Ötting, and D. Karlis. 2023. Extending the Dixon and Coles model: an application to women’s football data. arXiv preprint arXiv:2307.02139 . Michels et al. [2023] Michels, R., M. Ötting, and R. Langrock. 2023. Bettors’ reaction to match dynamics: Evidence from in-game betting. European Journal of Operational Research 310(3): 1118–1127 . Ntzoufras et al. [2021] Ntzoufras, I., V. Palaskas, and S. Drikos. 2021. Bayesian models for prediction of the set-difference in volleyball. IMA Journal of Management Mathematics 32(4): 491–518 . Ötting et al. [2024] Ötting, M., R. Michels, R. Langrock, and C. Deutscher. 2024. Demand for live betting: An analysis using state-space models. Applied Stochastic Models in Business and Industry . Pelechrinis and Winston [2021] Pelechrinis, K. and W. Winston. 2021. A Skellam regression model for quantifying positional value in soccer. Journal of Quantitative Analysis in Sports 17(3): 187–201 . Prieto et al. [2016] Prieto, J., M.Á. Gómez, A. Volossovitch, and J. Sampaio. 2016. Effects of team timeouts on the teams’ scoring performance in elite handball close games. Kinesiology 48(1.): 115–123 . Singh et al. [2023] Singh, A., P. Scarf, and R. Baker. 2023. A unified theory for bivariate scores in possessive ball-sports: The case of handball. European Journal of Operational Research 304(3): 1099–1112 . Skellam [1946] Skellam, J. 1946. The frequency distribution of the difference between two Poisson variates belonging to different populations. Journal of the Royal Statistical Society. Series A 109(3): 296–296 . Smiatek and Heuer [2012] Smiatek, J. and A. Heuer. 2012. A statistical view on team handball results: home advantage, team fitness and prediction of match outcomes. arXiv preprint arXiv:1207.0700 . Tomy and Veena [2022] Tomy, L. and G. Veena. 2022. A retrospective study on Skellam and related distributions. Austrian Journal of Statistics 51(1): 102–111 . Van Eetvelde et al. [2023] Van Eetvelde, H., L.M. Hvattum, and C. Ley. 2023. The probabilistic final standing calculator: a fair stochastic tool to handle abruptly stopped football seasons. AStA Advances in Statistical Analysis 107(1-2): 251–269 . Volossovitch and Debanne [2021] Volossovitch, A. and T. Debanne. 2021. Home advantage in handball. Home Advantage in Sport: Causes and the Effect on Performance: 220–227 . Michels, R., M. Ötting, and D. Karlis. 2023. Extending the Dixon and Coles model: an application to women’s football data. arXiv preprint arXiv:2307.02139 . Michels et al. [2023] Michels, R., M. Ötting, and R. Langrock. 2023. Bettors’ reaction to match dynamics: Evidence from in-game betting. European Journal of Operational Research 310(3): 1118–1127 . Ntzoufras et al. [2021] Ntzoufras, I., V. Palaskas, and S. Drikos. 2021. Bayesian models for prediction of the set-difference in volleyball. IMA Journal of Management Mathematics 32(4): 491–518 . Ötting et al. [2024] Ötting, M., R. Michels, R. Langrock, and C. Deutscher. 2024. Demand for live betting: An analysis using state-space models. Applied Stochastic Models in Business and Industry . Pelechrinis and Winston [2021] Pelechrinis, K. and W. Winston. 2021. A Skellam regression model for quantifying positional value in soccer. Journal of Quantitative Analysis in Sports 17(3): 187–201 . Prieto et al. [2016] Prieto, J., M.Á. Gómez, A. Volossovitch, and J. Sampaio. 2016. Effects of team timeouts on the teams’ scoring performance in elite handball close games. Kinesiology 48(1.): 115–123 . Singh et al. [2023] Singh, A., P. Scarf, and R. Baker. 2023. A unified theory for bivariate scores in possessive ball-sports: The case of handball. European Journal of Operational Research 304(3): 1099–1112 . Skellam [1946] Skellam, J. 1946. The frequency distribution of the difference between two Poisson variates belonging to different populations. Journal of the Royal Statistical Society. Series A 109(3): 296–296 . Smiatek and Heuer [2012] Smiatek, J. and A. Heuer. 2012. A statistical view on team handball results: home advantage, team fitness and prediction of match outcomes. arXiv preprint arXiv:1207.0700 . Tomy and Veena [2022] Tomy, L. and G. Veena. 2022. A retrospective study on Skellam and related distributions. Austrian Journal of Statistics 51(1): 102–111 . Van Eetvelde et al. [2023] Van Eetvelde, H., L.M. Hvattum, and C. Ley. 2023. The probabilistic final standing calculator: a fair stochastic tool to handle abruptly stopped football seasons. AStA Advances in Statistical Analysis 107(1-2): 251–269 . Volossovitch and Debanne [2021] Volossovitch, A. and T. Debanne. 2021. Home advantage in handball. Home Advantage in Sport: Causes and the Effect on Performance: 220–227 . Michels, R., M. Ötting, and R. Langrock. 2023. Bettors’ reaction to match dynamics: Evidence from in-game betting. European Journal of Operational Research 310(3): 1118–1127 . Ntzoufras et al. [2021] Ntzoufras, I., V. Palaskas, and S. Drikos. 2021. Bayesian models for prediction of the set-difference in volleyball. IMA Journal of Management Mathematics 32(4): 491–518 . Ötting et al. [2024] Ötting, M., R. Michels, R. Langrock, and C. Deutscher. 2024. Demand for live betting: An analysis using state-space models. Applied Stochastic Models in Business and Industry . Pelechrinis and Winston [2021] Pelechrinis, K. and W. Winston. 2021. A Skellam regression model for quantifying positional value in soccer. Journal of Quantitative Analysis in Sports 17(3): 187–201 . Prieto et al. [2016] Prieto, J., M.Á. Gómez, A. Volossovitch, and J. Sampaio. 2016. Effects of team timeouts on the teams’ scoring performance in elite handball close games. Kinesiology 48(1.): 115–123 . Singh et al. [2023] Singh, A., P. Scarf, and R. Baker. 2023. A unified theory for bivariate scores in possessive ball-sports: The case of handball. European Journal of Operational Research 304(3): 1099–1112 . Skellam [1946] Skellam, J. 1946. The frequency distribution of the difference between two Poisson variates belonging to different populations. Journal of the Royal Statistical Society. Series A 109(3): 296–296 . Smiatek and Heuer [2012] Smiatek, J. and A. Heuer. 2012. A statistical view on team handball results: home advantage, team fitness and prediction of match outcomes. arXiv preprint arXiv:1207.0700 . Tomy and Veena [2022] Tomy, L. and G. Veena. 2022. A retrospective study on Skellam and related distributions. Austrian Journal of Statistics 51(1): 102–111 . Van Eetvelde et al. [2023] Van Eetvelde, H., L.M. Hvattum, and C. Ley. 2023. The probabilistic final standing calculator: a fair stochastic tool to handle abruptly stopped football seasons. AStA Advances in Statistical Analysis 107(1-2): 251–269 . Volossovitch and Debanne [2021] Volossovitch, A. and T. Debanne. 2021. Home advantage in handball. Home Advantage in Sport: Causes and the Effect on Performance: 220–227 . Ntzoufras, I., V. Palaskas, and S. Drikos. 2021. Bayesian models for prediction of the set-difference in volleyball. IMA Journal of Management Mathematics 32(4): 491–518 . Ötting et al. [2024] Ötting, M., R. Michels, R. Langrock, and C. Deutscher. 2024. Demand for live betting: An analysis using state-space models. Applied Stochastic Models in Business and Industry . Pelechrinis and Winston [2021] Pelechrinis, K. and W. Winston. 2021. A Skellam regression model for quantifying positional value in soccer. Journal of Quantitative Analysis in Sports 17(3): 187–201 . Prieto et al. [2016] Prieto, J., M.Á. Gómez, A. Volossovitch, and J. Sampaio. 2016. Effects of team timeouts on the teams’ scoring performance in elite handball close games. Kinesiology 48(1.): 115–123 . Singh et al. [2023] Singh, A., P. Scarf, and R. Baker. 2023. A unified theory for bivariate scores in possessive ball-sports: The case of handball. European Journal of Operational Research 304(3): 1099–1112 . Skellam [1946] Skellam, J. 1946. The frequency distribution of the difference between two Poisson variates belonging to different populations. Journal of the Royal Statistical Society. Series A 109(3): 296–296 . Smiatek and Heuer [2012] Smiatek, J. and A. Heuer. 2012. A statistical view on team handball results: home advantage, team fitness and prediction of match outcomes. arXiv preprint arXiv:1207.0700 . Tomy and Veena [2022] Tomy, L. and G. Veena. 2022. A retrospective study on Skellam and related distributions. Austrian Journal of Statistics 51(1): 102–111 . Van Eetvelde et al. [2023] Van Eetvelde, H., L.M. Hvattum, and C. Ley. 2023. The probabilistic final standing calculator: a fair stochastic tool to handle abruptly stopped football seasons. AStA Advances in Statistical Analysis 107(1-2): 251–269 . Volossovitch and Debanne [2021] Volossovitch, A. and T. Debanne. 2021. Home advantage in handball. Home Advantage in Sport: Causes and the Effect on Performance: 220–227 . Ötting, M., R. Michels, R. Langrock, and C. Deutscher. 2024. Demand for live betting: An analysis using state-space models. Applied Stochastic Models in Business and Industry . Pelechrinis and Winston [2021] Pelechrinis, K. and W. Winston. 2021. A Skellam regression model for quantifying positional value in soccer. Journal of Quantitative Analysis in Sports 17(3): 187–201 . Prieto et al. [2016] Prieto, J., M.Á. Gómez, A. Volossovitch, and J. Sampaio. 2016. Effects of team timeouts on the teams’ scoring performance in elite handball close games. Kinesiology 48(1.): 115–123 . Singh et al. [2023] Singh, A., P. Scarf, and R. Baker. 2023. A unified theory for bivariate scores in possessive ball-sports: The case of handball. European Journal of Operational Research 304(3): 1099–1112 . Skellam [1946] Skellam, J. 1946. The frequency distribution of the difference between two Poisson variates belonging to different populations. Journal of the Royal Statistical Society. Series A 109(3): 296–296 . Smiatek and Heuer [2012] Smiatek, J. and A. Heuer. 2012. A statistical view on team handball results: home advantage, team fitness and prediction of match outcomes. arXiv preprint arXiv:1207.0700 . Tomy and Veena [2022] Tomy, L. and G. Veena. 2022. A retrospective study on Skellam and related distributions. Austrian Journal of Statistics 51(1): 102–111 . Van Eetvelde et al. [2023] Van Eetvelde, H., L.M. Hvattum, and C. Ley. 2023. The probabilistic final standing calculator: a fair stochastic tool to handle abruptly stopped football seasons. AStA Advances in Statistical Analysis 107(1-2): 251–269 . Volossovitch and Debanne [2021] Volossovitch, A. and T. Debanne. 2021. Home advantage in handball. Home Advantage in Sport: Causes and the Effect on Performance: 220–227 . Pelechrinis, K. and W. Winston. 2021. A Skellam regression model for quantifying positional value in soccer. Journal of Quantitative Analysis in Sports 17(3): 187–201 . Prieto et al. [2016] Prieto, J., M.Á. Gómez, A. Volossovitch, and J. Sampaio. 2016. Effects of team timeouts on the teams’ scoring performance in elite handball close games. Kinesiology 48(1.): 115–123 . Singh et al. [2023] Singh, A., P. Scarf, and R. Baker. 2023. A unified theory for bivariate scores in possessive ball-sports: The case of handball. European Journal of Operational Research 304(3): 1099–1112 . Skellam [1946] Skellam, J. 1946. The frequency distribution of the difference between two Poisson variates belonging to different populations. Journal of the Royal Statistical Society. Series A 109(3): 296–296 . Smiatek and Heuer [2012] Smiatek, J. and A. Heuer. 2012. A statistical view on team handball results: home advantage, team fitness and prediction of match outcomes. arXiv preprint arXiv:1207.0700 . Tomy and Veena [2022] Tomy, L. and G. Veena. 2022. A retrospective study on Skellam and related distributions. Austrian Journal of Statistics 51(1): 102–111 . Van Eetvelde et al. [2023] Van Eetvelde, H., L.M. Hvattum, and C. Ley. 2023. The probabilistic final standing calculator: a fair stochastic tool to handle abruptly stopped football seasons. AStA Advances in Statistical Analysis 107(1-2): 251–269 . Volossovitch and Debanne [2021] Volossovitch, A. and T. Debanne. 2021. Home advantage in handball. Home Advantage in Sport: Causes and the Effect on Performance: 220–227 . Prieto, J., M.Á. Gómez, A. Volossovitch, and J. Sampaio. 2016. Effects of team timeouts on the teams’ scoring performance in elite handball close games. Kinesiology 48(1.): 115–123 . Singh et al. [2023] Singh, A., P. Scarf, and R. Baker. 2023. A unified theory for bivariate scores in possessive ball-sports: The case of handball. European Journal of Operational Research 304(3): 1099–1112 . Skellam [1946] Skellam, J. 1946. The frequency distribution of the difference between two Poisson variates belonging to different populations. Journal of the Royal Statistical Society. Series A 109(3): 296–296 . Smiatek and Heuer [2012] Smiatek, J. and A. Heuer. 2012. A statistical view on team handball results: home advantage, team fitness and prediction of match outcomes. arXiv preprint arXiv:1207.0700 . Tomy and Veena [2022] Tomy, L. and G. Veena. 2022. A retrospective study on Skellam and related distributions. Austrian Journal of Statistics 51(1): 102–111 . Van Eetvelde et al. [2023] Van Eetvelde, H., L.M. Hvattum, and C. Ley. 2023. The probabilistic final standing calculator: a fair stochastic tool to handle abruptly stopped football seasons. AStA Advances in Statistical Analysis 107(1-2): 251–269 . Volossovitch and Debanne [2021] Volossovitch, A. and T. Debanne. 2021. Home advantage in handball. Home Advantage in Sport: Causes and the Effect on Performance: 220–227 . Singh, A., P. Scarf, and R. Baker. 2023. A unified theory for bivariate scores in possessive ball-sports: The case of handball. European Journal of Operational Research 304(3): 1099–1112 . Skellam [1946] Skellam, J. 1946. The frequency distribution of the difference between two Poisson variates belonging to different populations. Journal of the Royal Statistical Society. Series A 109(3): 296–296 . Smiatek and Heuer [2012] Smiatek, J. and A. Heuer. 2012. A statistical view on team handball results: home advantage, team fitness and prediction of match outcomes. arXiv preprint arXiv:1207.0700 . Tomy and Veena [2022] Tomy, L. and G. Veena. 2022. A retrospective study on Skellam and related distributions. Austrian Journal of Statistics 51(1): 102–111 . Van Eetvelde et al. [2023] Van Eetvelde, H., L.M. Hvattum, and C. Ley. 2023. The probabilistic final standing calculator: a fair stochastic tool to handle abruptly stopped football seasons. AStA Advances in Statistical Analysis 107(1-2): 251–269 . Volossovitch and Debanne [2021] Volossovitch, A. and T. Debanne. 2021. Home advantage in handball. Home Advantage in Sport: Causes and the Effect on Performance: 220–227 . Skellam, J. 1946. The frequency distribution of the difference between two Poisson variates belonging to different populations. Journal of the Royal Statistical Society. Series A 109(3): 296–296 . Smiatek and Heuer [2012] Smiatek, J. and A. Heuer. 2012. A statistical view on team handball results: home advantage, team fitness and prediction of match outcomes. arXiv preprint arXiv:1207.0700 . Tomy and Veena [2022] Tomy, L. and G. Veena. 2022. A retrospective study on Skellam and related distributions. Austrian Journal of Statistics 51(1): 102–111 . Van Eetvelde et al. [2023] Van Eetvelde, H., L.M. Hvattum, and C. Ley. 2023. The probabilistic final standing calculator: a fair stochastic tool to handle abruptly stopped football seasons. AStA Advances in Statistical Analysis 107(1-2): 251–269 . Volossovitch and Debanne [2021] Volossovitch, A. and T. Debanne. 2021. Home advantage in handball. Home Advantage in Sport: Causes and the Effect on Performance: 220–227 . Smiatek, J. and A. Heuer. 2012. A statistical view on team handball results: home advantage, team fitness and prediction of match outcomes. arXiv preprint arXiv:1207.0700 . Tomy and Veena [2022] Tomy, L. and G. Veena. 2022. A retrospective study on Skellam and related distributions. Austrian Journal of Statistics 51(1): 102–111 . Van Eetvelde et al. [2023] Van Eetvelde, H., L.M. Hvattum, and C. Ley. 2023. The probabilistic final standing calculator: a fair stochastic tool to handle abruptly stopped football seasons. AStA Advances in Statistical Analysis 107(1-2): 251–269 . Volossovitch and Debanne [2021] Volossovitch, A. and T. Debanne. 2021. Home advantage in handball. Home Advantage in Sport: Causes and the Effect on Performance: 220–227 . Tomy, L. and G. Veena. 2022. A retrospective study on Skellam and related distributions. Austrian Journal of Statistics 51(1): 102–111 . Van Eetvelde et al. [2023] Van Eetvelde, H., L.M. Hvattum, and C. Ley. 2023. The probabilistic final standing calculator: a fair stochastic tool to handle abruptly stopped football seasons. AStA Advances in Statistical Analysis 107(1-2): 251–269 . Volossovitch and Debanne [2021] Volossovitch, A. and T. Debanne. 2021. Home advantage in handball. Home Advantage in Sport: Causes and the Effect on Performance: 220–227 . Van Eetvelde, H., L.M. Hvattum, and C. Ley. 2023. The probabilistic final standing calculator: a fair stochastic tool to handle abruptly stopped football seasons. AStA Advances in Statistical Analysis 107(1-2): 251–269 . Volossovitch and Debanne [2021] Volossovitch, A. and T. Debanne. 2021. Home advantage in handball. Home Advantage in Sport: Causes and the Effect on Performance: 220–227 . Volossovitch, A. and T. Debanne. 2021. Home advantage in handball. Home Advantage in Sport: Causes and the Effect on Performance: 220–227 .
- Irwin, J.O. 1937. The frequency distribution of the difference between two independent variates following the same Poisson distribution. Journal of the Royal Statistical Society 100(3): 415–416 . Jiang et al. [2014] Jiang, L., K. Mao, and R. Wu. 2014. A Skellam model to identify differential patterns of gene expression induced by environmental signals. BMC Genomics 15(1): 1–9 . Karlis and Mamode Khan [2023] Karlis, D. and N. Mamode Khan. 2023. Models for integer data. Annual Review of Statistics and its Application 10: 297–323 . Karlis and Ntzoufras [2006] Karlis, D. and I. Ntzoufras. 2006. Bayesian analysis of the differences of count data. Statistics in Medicine 25(11): 1885–1905 . Koopman et al. [2017] Koopman, S.J., R. Lit, and A. Lucas. 2017. Intraday stochastic volatility in discrete price changes: the dynamic Skellam model. Journal of the American Statistical Association 112(520): 1490–1503 . Lago-Peñas et al. [2013] Lago-Peñas, C., M.A. Gomez, J. Viaño, and I. González-García. 2013. Home advantage in elite handball: the impact of the quality of opposition on team performance. International Journal of Performance Analysis in Sport 13(3): 724–733 . Maher [1982] Maher, M.J. 1982. Modelling association football scores. Statistica Neerlandica 36(3): 109–118 . McHale and Scarf [2007] McHale, I. and P. Scarf. 2007. Modelling soccer matches using bivariate discrete distributions with general dependence structure. Statistica Neerlandica 61(4): 432–445 . Michels et al. [2023] Michels, R., M. Ötting, and D. Karlis. 2023. Extending the Dixon and Coles model: an application to women’s football data. arXiv preprint arXiv:2307.02139 . Michels et al. [2023] Michels, R., M. Ötting, and R. Langrock. 2023. Bettors’ reaction to match dynamics: Evidence from in-game betting. European Journal of Operational Research 310(3): 1118–1127 . Ntzoufras et al. [2021] Ntzoufras, I., V. Palaskas, and S. Drikos. 2021. Bayesian models for prediction of the set-difference in volleyball. IMA Journal of Management Mathematics 32(4): 491–518 . Ötting et al. [2024] Ötting, M., R. Michels, R. Langrock, and C. Deutscher. 2024. Demand for live betting: An analysis using state-space models. Applied Stochastic Models in Business and Industry . Pelechrinis and Winston [2021] Pelechrinis, K. and W. Winston. 2021. A Skellam regression model for quantifying positional value in soccer. Journal of Quantitative Analysis in Sports 17(3): 187–201 . Prieto et al. [2016] Prieto, J., M.Á. Gómez, A. Volossovitch, and J. Sampaio. 2016. Effects of team timeouts on the teams’ scoring performance in elite handball close games. Kinesiology 48(1.): 115–123 . Singh et al. [2023] Singh, A., P. Scarf, and R. Baker. 2023. A unified theory for bivariate scores in possessive ball-sports: The case of handball. European Journal of Operational Research 304(3): 1099–1112 . Skellam [1946] Skellam, J. 1946. The frequency distribution of the difference between two Poisson variates belonging to different populations. Journal of the Royal Statistical Society. Series A 109(3): 296–296 . Smiatek and Heuer [2012] Smiatek, J. and A. Heuer. 2012. A statistical view on team handball results: home advantage, team fitness and prediction of match outcomes. arXiv preprint arXiv:1207.0700 . Tomy and Veena [2022] Tomy, L. and G. Veena. 2022. A retrospective study on Skellam and related distributions. Austrian Journal of Statistics 51(1): 102–111 . Van Eetvelde et al. [2023] Van Eetvelde, H., L.M. Hvattum, and C. Ley. 2023. The probabilistic final standing calculator: a fair stochastic tool to handle abruptly stopped football seasons. AStA Advances in Statistical Analysis 107(1-2): 251–269 . Volossovitch and Debanne [2021] Volossovitch, A. and T. Debanne. 2021. Home advantage in handball. Home Advantage in Sport: Causes and the Effect on Performance: 220–227 . Jiang, L., K. Mao, and R. Wu. 2014. A Skellam model to identify differential patterns of gene expression induced by environmental signals. BMC Genomics 15(1): 1–9 . Karlis and Mamode Khan [2023] Karlis, D. and N. Mamode Khan. 2023. Models for integer data. Annual Review of Statistics and its Application 10: 297–323 . Karlis and Ntzoufras [2006] Karlis, D. and I. Ntzoufras. 2006. Bayesian analysis of the differences of count data. Statistics in Medicine 25(11): 1885–1905 . Koopman et al. [2017] Koopman, S.J., R. Lit, and A. Lucas. 2017. Intraday stochastic volatility in discrete price changes: the dynamic Skellam model. Journal of the American Statistical Association 112(520): 1490–1503 . Lago-Peñas et al. [2013] Lago-Peñas, C., M.A. Gomez, J. Viaño, and I. González-García. 2013. Home advantage in elite handball: the impact of the quality of opposition on team performance. International Journal of Performance Analysis in Sport 13(3): 724–733 . Maher [1982] Maher, M.J. 1982. Modelling association football scores. Statistica Neerlandica 36(3): 109–118 . McHale and Scarf [2007] McHale, I. and P. Scarf. 2007. Modelling soccer matches using bivariate discrete distributions with general dependence structure. Statistica Neerlandica 61(4): 432–445 . Michels et al. [2023] Michels, R., M. Ötting, and D. Karlis. 2023. Extending the Dixon and Coles model: an application to women’s football data. arXiv preprint arXiv:2307.02139 . Michels et al. [2023] Michels, R., M. Ötting, and R. Langrock. 2023. Bettors’ reaction to match dynamics: Evidence from in-game betting. European Journal of Operational Research 310(3): 1118–1127 . Ntzoufras et al. [2021] Ntzoufras, I., V. Palaskas, and S. Drikos. 2021. Bayesian models for prediction of the set-difference in volleyball. IMA Journal of Management Mathematics 32(4): 491–518 . Ötting et al. [2024] Ötting, M., R. Michels, R. Langrock, and C. Deutscher. 2024. Demand for live betting: An analysis using state-space models. Applied Stochastic Models in Business and Industry . Pelechrinis and Winston [2021] Pelechrinis, K. and W. Winston. 2021. A Skellam regression model for quantifying positional value in soccer. Journal of Quantitative Analysis in Sports 17(3): 187–201 . Prieto et al. [2016] Prieto, J., M.Á. Gómez, A. Volossovitch, and J. Sampaio. 2016. Effects of team timeouts on the teams’ scoring performance in elite handball close games. Kinesiology 48(1.): 115–123 . Singh et al. [2023] Singh, A., P. Scarf, and R. Baker. 2023. A unified theory for bivariate scores in possessive ball-sports: The case of handball. European Journal of Operational Research 304(3): 1099–1112 . Skellam [1946] Skellam, J. 1946. The frequency distribution of the difference between two Poisson variates belonging to different populations. Journal of the Royal Statistical Society. Series A 109(3): 296–296 . Smiatek and Heuer [2012] Smiatek, J. and A. Heuer. 2012. A statistical view on team handball results: home advantage, team fitness and prediction of match outcomes. arXiv preprint arXiv:1207.0700 . Tomy and Veena [2022] Tomy, L. and G. Veena. 2022. A retrospective study on Skellam and related distributions. Austrian Journal of Statistics 51(1): 102–111 . Van Eetvelde et al. [2023] Van Eetvelde, H., L.M. Hvattum, and C. Ley. 2023. The probabilistic final standing calculator: a fair stochastic tool to handle abruptly stopped football seasons. AStA Advances in Statistical Analysis 107(1-2): 251–269 . Volossovitch and Debanne [2021] Volossovitch, A. and T. Debanne. 2021. Home advantage in handball. Home Advantage in Sport: Causes and the Effect on Performance: 220–227 . Karlis, D. and N. Mamode Khan. 2023. Models for integer data. Annual Review of Statistics and its Application 10: 297–323 . Karlis and Ntzoufras [2006] Karlis, D. and I. Ntzoufras. 2006. Bayesian analysis of the differences of count data. Statistics in Medicine 25(11): 1885–1905 . Koopman et al. [2017] Koopman, S.J., R. Lit, and A. Lucas. 2017. Intraday stochastic volatility in discrete price changes: the dynamic Skellam model. Journal of the American Statistical Association 112(520): 1490–1503 . Lago-Peñas et al. [2013] Lago-Peñas, C., M.A. Gomez, J. Viaño, and I. González-García. 2013. Home advantage in elite handball: the impact of the quality of opposition on team performance. International Journal of Performance Analysis in Sport 13(3): 724–733 . Maher [1982] Maher, M.J. 1982. Modelling association football scores. Statistica Neerlandica 36(3): 109–118 . McHale and Scarf [2007] McHale, I. and P. Scarf. 2007. Modelling soccer matches using bivariate discrete distributions with general dependence structure. Statistica Neerlandica 61(4): 432–445 . Michels et al. [2023] Michels, R., M. Ötting, and D. Karlis. 2023. Extending the Dixon and Coles model: an application to women’s football data. arXiv preprint arXiv:2307.02139 . Michels et al. [2023] Michels, R., M. Ötting, and R. Langrock. 2023. Bettors’ reaction to match dynamics: Evidence from in-game betting. European Journal of Operational Research 310(3): 1118–1127 . Ntzoufras et al. [2021] Ntzoufras, I., V. Palaskas, and S. Drikos. 2021. Bayesian models for prediction of the set-difference in volleyball. IMA Journal of Management Mathematics 32(4): 491–518 . Ötting et al. [2024] Ötting, M., R. Michels, R. Langrock, and C. Deutscher. 2024. Demand for live betting: An analysis using state-space models. Applied Stochastic Models in Business and Industry . Pelechrinis and Winston [2021] Pelechrinis, K. and W. Winston. 2021. A Skellam regression model for quantifying positional value in soccer. Journal of Quantitative Analysis in Sports 17(3): 187–201 . Prieto et al. [2016] Prieto, J., M.Á. Gómez, A. Volossovitch, and J. Sampaio. 2016. Effects of team timeouts on the teams’ scoring performance in elite handball close games. Kinesiology 48(1.): 115–123 . Singh et al. [2023] Singh, A., P. Scarf, and R. Baker. 2023. A unified theory for bivariate scores in possessive ball-sports: The case of handball. European Journal of Operational Research 304(3): 1099–1112 . Skellam [1946] Skellam, J. 1946. The frequency distribution of the difference between two Poisson variates belonging to different populations. Journal of the Royal Statistical Society. Series A 109(3): 296–296 . Smiatek and Heuer [2012] Smiatek, J. and A. Heuer. 2012. A statistical view on team handball results: home advantage, team fitness and prediction of match outcomes. arXiv preprint arXiv:1207.0700 . Tomy and Veena [2022] Tomy, L. and G. Veena. 2022. A retrospective study on Skellam and related distributions. Austrian Journal of Statistics 51(1): 102–111 . Van Eetvelde et al. [2023] Van Eetvelde, H., L.M. Hvattum, and C. Ley. 2023. The probabilistic final standing calculator: a fair stochastic tool to handle abruptly stopped football seasons. AStA Advances in Statistical Analysis 107(1-2): 251–269 . Volossovitch and Debanne [2021] Volossovitch, A. and T. Debanne. 2021. Home advantage in handball. Home Advantage in Sport: Causes and the Effect on Performance: 220–227 . Karlis, D. and I. Ntzoufras. 2006. Bayesian analysis of the differences of count data. Statistics in Medicine 25(11): 1885–1905 . Koopman et al. [2017] Koopman, S.J., R. Lit, and A. Lucas. 2017. Intraday stochastic volatility in discrete price changes: the dynamic Skellam model. Journal of the American Statistical Association 112(520): 1490–1503 . Lago-Peñas et al. [2013] Lago-Peñas, C., M.A. Gomez, J. Viaño, and I. González-García. 2013. Home advantage in elite handball: the impact of the quality of opposition on team performance. International Journal of Performance Analysis in Sport 13(3): 724–733 . Maher [1982] Maher, M.J. 1982. Modelling association football scores. Statistica Neerlandica 36(3): 109–118 . McHale and Scarf [2007] McHale, I. and P. Scarf. 2007. Modelling soccer matches using bivariate discrete distributions with general dependence structure. Statistica Neerlandica 61(4): 432–445 . Michels et al. [2023] Michels, R., M. Ötting, and D. Karlis. 2023. Extending the Dixon and Coles model: an application to women’s football data. arXiv preprint arXiv:2307.02139 . Michels et al. [2023] Michels, R., M. Ötting, and R. Langrock. 2023. Bettors’ reaction to match dynamics: Evidence from in-game betting. European Journal of Operational Research 310(3): 1118–1127 . Ntzoufras et al. [2021] Ntzoufras, I., V. Palaskas, and S. Drikos. 2021. Bayesian models for prediction of the set-difference in volleyball. IMA Journal of Management Mathematics 32(4): 491–518 . Ötting et al. [2024] Ötting, M., R. Michels, R. Langrock, and C. Deutscher. 2024. Demand for live betting: An analysis using state-space models. Applied Stochastic Models in Business and Industry . Pelechrinis and Winston [2021] Pelechrinis, K. and W. Winston. 2021. A Skellam regression model for quantifying positional value in soccer. Journal of Quantitative Analysis in Sports 17(3): 187–201 . Prieto et al. [2016] Prieto, J., M.Á. Gómez, A. Volossovitch, and J. Sampaio. 2016. Effects of team timeouts on the teams’ scoring performance in elite handball close games. Kinesiology 48(1.): 115–123 . Singh et al. [2023] Singh, A., P. Scarf, and R. Baker. 2023. A unified theory for bivariate scores in possessive ball-sports: The case of handball. European Journal of Operational Research 304(3): 1099–1112 . Skellam [1946] Skellam, J. 1946. The frequency distribution of the difference between two Poisson variates belonging to different populations. Journal of the Royal Statistical Society. Series A 109(3): 296–296 . Smiatek and Heuer [2012] Smiatek, J. and A. Heuer. 2012. A statistical view on team handball results: home advantage, team fitness and prediction of match outcomes. arXiv preprint arXiv:1207.0700 . Tomy and Veena [2022] Tomy, L. and G. Veena. 2022. A retrospective study on Skellam and related distributions. Austrian Journal of Statistics 51(1): 102–111 . Van Eetvelde et al. [2023] Van Eetvelde, H., L.M. Hvattum, and C. Ley. 2023. The probabilistic final standing calculator: a fair stochastic tool to handle abruptly stopped football seasons. AStA Advances in Statistical Analysis 107(1-2): 251–269 . Volossovitch and Debanne [2021] Volossovitch, A. and T. Debanne. 2021. Home advantage in handball. Home Advantage in Sport: Causes and the Effect on Performance: 220–227 . Koopman, S.J., R. Lit, and A. Lucas. 2017. Intraday stochastic volatility in discrete price changes: the dynamic Skellam model. Journal of the American Statistical Association 112(520): 1490–1503 . Lago-Peñas et al. [2013] Lago-Peñas, C., M.A. Gomez, J. Viaño, and I. González-García. 2013. Home advantage in elite handball: the impact of the quality of opposition on team performance. International Journal of Performance Analysis in Sport 13(3): 724–733 . Maher [1982] Maher, M.J. 1982. Modelling association football scores. Statistica Neerlandica 36(3): 109–118 . McHale and Scarf [2007] McHale, I. and P. Scarf. 2007. Modelling soccer matches using bivariate discrete distributions with general dependence structure. Statistica Neerlandica 61(4): 432–445 . Michels et al. [2023] Michels, R., M. Ötting, and D. Karlis. 2023. Extending the Dixon and Coles model: an application to women’s football data. arXiv preprint arXiv:2307.02139 . Michels et al. [2023] Michels, R., M. Ötting, and R. Langrock. 2023. Bettors’ reaction to match dynamics: Evidence from in-game betting. European Journal of Operational Research 310(3): 1118–1127 . Ntzoufras et al. [2021] Ntzoufras, I., V. Palaskas, and S. Drikos. 2021. Bayesian models for prediction of the set-difference in volleyball. IMA Journal of Management Mathematics 32(4): 491–518 . Ötting et al. [2024] Ötting, M., R. Michels, R. Langrock, and C. Deutscher. 2024. Demand for live betting: An analysis using state-space models. Applied Stochastic Models in Business and Industry . Pelechrinis and Winston [2021] Pelechrinis, K. and W. Winston. 2021. A Skellam regression model for quantifying positional value in soccer. Journal of Quantitative Analysis in Sports 17(3): 187–201 . Prieto et al. [2016] Prieto, J., M.Á. Gómez, A. Volossovitch, and J. Sampaio. 2016. Effects of team timeouts on the teams’ scoring performance in elite handball close games. Kinesiology 48(1.): 115–123 . Singh et al. [2023] Singh, A., P. Scarf, and R. Baker. 2023. A unified theory for bivariate scores in possessive ball-sports: The case of handball. European Journal of Operational Research 304(3): 1099–1112 . Skellam [1946] Skellam, J. 1946. The frequency distribution of the difference between two Poisson variates belonging to different populations. Journal of the Royal Statistical Society. Series A 109(3): 296–296 . Smiatek and Heuer [2012] Smiatek, J. and A. Heuer. 2012. A statistical view on team handball results: home advantage, team fitness and prediction of match outcomes. arXiv preprint arXiv:1207.0700 . Tomy and Veena [2022] Tomy, L. and G. Veena. 2022. A retrospective study on Skellam and related distributions. Austrian Journal of Statistics 51(1): 102–111 . Van Eetvelde et al. [2023] Van Eetvelde, H., L.M. Hvattum, and C. Ley. 2023. The probabilistic final standing calculator: a fair stochastic tool to handle abruptly stopped football seasons. AStA Advances in Statistical Analysis 107(1-2): 251–269 . Volossovitch and Debanne [2021] Volossovitch, A. and T. Debanne. 2021. Home advantage in handball. Home Advantage in Sport: Causes and the Effect on Performance: 220–227 . Lago-Peñas, C., M.A. Gomez, J. Viaño, and I. González-García. 2013. Home advantage in elite handball: the impact of the quality of opposition on team performance. International Journal of Performance Analysis in Sport 13(3): 724–733 . Maher [1982] Maher, M.J. 1982. Modelling association football scores. Statistica Neerlandica 36(3): 109–118 . McHale and Scarf [2007] McHale, I. and P. Scarf. 2007. Modelling soccer matches using bivariate discrete distributions with general dependence structure. Statistica Neerlandica 61(4): 432–445 . Michels et al. [2023] Michels, R., M. Ötting, and D. Karlis. 2023. Extending the Dixon and Coles model: an application to women’s football data. arXiv preprint arXiv:2307.02139 . Michels et al. [2023] Michels, R., M. Ötting, and R. Langrock. 2023. Bettors’ reaction to match dynamics: Evidence from in-game betting. European Journal of Operational Research 310(3): 1118–1127 . Ntzoufras et al. [2021] Ntzoufras, I., V. Palaskas, and S. Drikos. 2021. Bayesian models for prediction of the set-difference in volleyball. IMA Journal of Management Mathematics 32(4): 491–518 . Ötting et al. [2024] Ötting, M., R. Michels, R. Langrock, and C. Deutscher. 2024. Demand for live betting: An analysis using state-space models. Applied Stochastic Models in Business and Industry . Pelechrinis and Winston [2021] Pelechrinis, K. and W. Winston. 2021. A Skellam regression model for quantifying positional value in soccer. Journal of Quantitative Analysis in Sports 17(3): 187–201 . Prieto et al. [2016] Prieto, J., M.Á. Gómez, A. Volossovitch, and J. Sampaio. 2016. Effects of team timeouts on the teams’ scoring performance in elite handball close games. Kinesiology 48(1.): 115–123 . Singh et al. [2023] Singh, A., P. Scarf, and R. Baker. 2023. A unified theory for bivariate scores in possessive ball-sports: The case of handball. European Journal of Operational Research 304(3): 1099–1112 . Skellam [1946] Skellam, J. 1946. The frequency distribution of the difference between two Poisson variates belonging to different populations. Journal of the Royal Statistical Society. Series A 109(3): 296–296 . Smiatek and Heuer [2012] Smiatek, J. and A. Heuer. 2012. A statistical view on team handball results: home advantage, team fitness and prediction of match outcomes. arXiv preprint arXiv:1207.0700 . Tomy and Veena [2022] Tomy, L. and G. Veena. 2022. A retrospective study on Skellam and related distributions. Austrian Journal of Statistics 51(1): 102–111 . Van Eetvelde et al. [2023] Van Eetvelde, H., L.M. Hvattum, and C. Ley. 2023. The probabilistic final standing calculator: a fair stochastic tool to handle abruptly stopped football seasons. AStA Advances in Statistical Analysis 107(1-2): 251–269 . Volossovitch and Debanne [2021] Volossovitch, A. and T. Debanne. 2021. Home advantage in handball. Home Advantage in Sport: Causes and the Effect on Performance: 220–227 . Maher, M.J. 1982. Modelling association football scores. Statistica Neerlandica 36(3): 109–118 . McHale and Scarf [2007] McHale, I. and P. Scarf. 2007. Modelling soccer matches using bivariate discrete distributions with general dependence structure. Statistica Neerlandica 61(4): 432–445 . Michels et al. [2023] Michels, R., M. Ötting, and D. Karlis. 2023. Extending the Dixon and Coles model: an application to women’s football data. arXiv preprint arXiv:2307.02139 . Michels et al. [2023] Michels, R., M. Ötting, and R. Langrock. 2023. Bettors’ reaction to match dynamics: Evidence from in-game betting. European Journal of Operational Research 310(3): 1118–1127 . Ntzoufras et al. [2021] Ntzoufras, I., V. Palaskas, and S. Drikos. 2021. Bayesian models for prediction of the set-difference in volleyball. IMA Journal of Management Mathematics 32(4): 491–518 . Ötting et al. [2024] Ötting, M., R. Michels, R. Langrock, and C. Deutscher. 2024. Demand for live betting: An analysis using state-space models. Applied Stochastic Models in Business and Industry . Pelechrinis and Winston [2021] Pelechrinis, K. and W. Winston. 2021. A Skellam regression model for quantifying positional value in soccer. Journal of Quantitative Analysis in Sports 17(3): 187–201 . Prieto et al. [2016] Prieto, J., M.Á. Gómez, A. Volossovitch, and J. Sampaio. 2016. Effects of team timeouts on the teams’ scoring performance in elite handball close games. Kinesiology 48(1.): 115–123 . Singh et al. [2023] Singh, A., P. Scarf, and R. Baker. 2023. A unified theory for bivariate scores in possessive ball-sports: The case of handball. European Journal of Operational Research 304(3): 1099–1112 . Skellam [1946] Skellam, J. 1946. The frequency distribution of the difference between two Poisson variates belonging to different populations. Journal of the Royal Statistical Society. Series A 109(3): 296–296 . Smiatek and Heuer [2012] Smiatek, J. and A. Heuer. 2012. A statistical view on team handball results: home advantage, team fitness and prediction of match outcomes. arXiv preprint arXiv:1207.0700 . Tomy and Veena [2022] Tomy, L. and G. Veena. 2022. A retrospective study on Skellam and related distributions. Austrian Journal of Statistics 51(1): 102–111 . Van Eetvelde et al. [2023] Van Eetvelde, H., L.M. Hvattum, and C. Ley. 2023. The probabilistic final standing calculator: a fair stochastic tool to handle abruptly stopped football seasons. AStA Advances in Statistical Analysis 107(1-2): 251–269 . Volossovitch and Debanne [2021] Volossovitch, A. and T. Debanne. 2021. Home advantage in handball. Home Advantage in Sport: Causes and the Effect on Performance: 220–227 . McHale, I. and P. Scarf. 2007. Modelling soccer matches using bivariate discrete distributions with general dependence structure. Statistica Neerlandica 61(4): 432–445 . Michels et al. [2023] Michels, R., M. Ötting, and D. Karlis. 2023. Extending the Dixon and Coles model: an application to women’s football data. arXiv preprint arXiv:2307.02139 . Michels et al. [2023] Michels, R., M. Ötting, and R. Langrock. 2023. Bettors’ reaction to match dynamics: Evidence from in-game betting. European Journal of Operational Research 310(3): 1118–1127 . Ntzoufras et al. [2021] Ntzoufras, I., V. Palaskas, and S. Drikos. 2021. Bayesian models for prediction of the set-difference in volleyball. IMA Journal of Management Mathematics 32(4): 491–518 . Ötting et al. [2024] Ötting, M., R. Michels, R. Langrock, and C. Deutscher. 2024. Demand for live betting: An analysis using state-space models. Applied Stochastic Models in Business and Industry . Pelechrinis and Winston [2021] Pelechrinis, K. and W. Winston. 2021. A Skellam regression model for quantifying positional value in soccer. Journal of Quantitative Analysis in Sports 17(3): 187–201 . Prieto et al. [2016] Prieto, J., M.Á. Gómez, A. Volossovitch, and J. Sampaio. 2016. Effects of team timeouts on the teams’ scoring performance in elite handball close games. Kinesiology 48(1.): 115–123 . Singh et al. [2023] Singh, A., P. Scarf, and R. Baker. 2023. A unified theory for bivariate scores in possessive ball-sports: The case of handball. European Journal of Operational Research 304(3): 1099–1112 . Skellam [1946] Skellam, J. 1946. The frequency distribution of the difference between two Poisson variates belonging to different populations. Journal of the Royal Statistical Society. Series A 109(3): 296–296 . Smiatek and Heuer [2012] Smiatek, J. and A. Heuer. 2012. A statistical view on team handball results: home advantage, team fitness and prediction of match outcomes. arXiv preprint arXiv:1207.0700 . Tomy and Veena [2022] Tomy, L. and G. Veena. 2022. A retrospective study on Skellam and related distributions. Austrian Journal of Statistics 51(1): 102–111 . Van Eetvelde et al. [2023] Van Eetvelde, H., L.M. Hvattum, and C. Ley. 2023. The probabilistic final standing calculator: a fair stochastic tool to handle abruptly stopped football seasons. AStA Advances in Statistical Analysis 107(1-2): 251–269 . Volossovitch and Debanne [2021] Volossovitch, A. and T. Debanne. 2021. Home advantage in handball. Home Advantage in Sport: Causes and the Effect on Performance: 220–227 . Michels, R., M. Ötting, and D. Karlis. 2023. Extending the Dixon and Coles model: an application to women’s football data. arXiv preprint arXiv:2307.02139 . Michels et al. [2023] Michels, R., M. Ötting, and R. Langrock. 2023. Bettors’ reaction to match dynamics: Evidence from in-game betting. European Journal of Operational Research 310(3): 1118–1127 . Ntzoufras et al. [2021] Ntzoufras, I., V. Palaskas, and S. Drikos. 2021. Bayesian models for prediction of the set-difference in volleyball. IMA Journal of Management Mathematics 32(4): 491–518 . Ötting et al. [2024] Ötting, M., R. Michels, R. Langrock, and C. Deutscher. 2024. Demand for live betting: An analysis using state-space models. Applied Stochastic Models in Business and Industry . Pelechrinis and Winston [2021] Pelechrinis, K. and W. Winston. 2021. A Skellam regression model for quantifying positional value in soccer. Journal of Quantitative Analysis in Sports 17(3): 187–201 . Prieto et al. [2016] Prieto, J., M.Á. Gómez, A. Volossovitch, and J. Sampaio. 2016. Effects of team timeouts on the teams’ scoring performance in elite handball close games. Kinesiology 48(1.): 115–123 . Singh et al. [2023] Singh, A., P. Scarf, and R. Baker. 2023. A unified theory for bivariate scores in possessive ball-sports: The case of handball. European Journal of Operational Research 304(3): 1099–1112 . Skellam [1946] Skellam, J. 1946. The frequency distribution of the difference between two Poisson variates belonging to different populations. Journal of the Royal Statistical Society. Series A 109(3): 296–296 . Smiatek and Heuer [2012] Smiatek, J. and A. Heuer. 2012. A statistical view on team handball results: home advantage, team fitness and prediction of match outcomes. arXiv preprint arXiv:1207.0700 . Tomy and Veena [2022] Tomy, L. and G. Veena. 2022. A retrospective study on Skellam and related distributions. Austrian Journal of Statistics 51(1): 102–111 . Van Eetvelde et al. [2023] Van Eetvelde, H., L.M. Hvattum, and C. Ley. 2023. The probabilistic final standing calculator: a fair stochastic tool to handle abruptly stopped football seasons. AStA Advances in Statistical Analysis 107(1-2): 251–269 . Volossovitch and Debanne [2021] Volossovitch, A. and T. Debanne. 2021. Home advantage in handball. Home Advantage in Sport: Causes and the Effect on Performance: 220–227 . Michels, R., M. Ötting, and R. Langrock. 2023. Bettors’ reaction to match dynamics: Evidence from in-game betting. European Journal of Operational Research 310(3): 1118–1127 . Ntzoufras et al. [2021] Ntzoufras, I., V. Palaskas, and S. Drikos. 2021. Bayesian models for prediction of the set-difference in volleyball. IMA Journal of Management Mathematics 32(4): 491–518 . Ötting et al. [2024] Ötting, M., R. Michels, R. Langrock, and C. Deutscher. 2024. Demand for live betting: An analysis using state-space models. Applied Stochastic Models in Business and Industry . Pelechrinis and Winston [2021] Pelechrinis, K. and W. Winston. 2021. A Skellam regression model for quantifying positional value in soccer. Journal of Quantitative Analysis in Sports 17(3): 187–201 . Prieto et al. [2016] Prieto, J., M.Á. Gómez, A. Volossovitch, and J. Sampaio. 2016. Effects of team timeouts on the teams’ scoring performance in elite handball close games. Kinesiology 48(1.): 115–123 . Singh et al. [2023] Singh, A., P. Scarf, and R. Baker. 2023. A unified theory for bivariate scores in possessive ball-sports: The case of handball. European Journal of Operational Research 304(3): 1099–1112 . Skellam [1946] Skellam, J. 1946. The frequency distribution of the difference between two Poisson variates belonging to different populations. Journal of the Royal Statistical Society. Series A 109(3): 296–296 . Smiatek and Heuer [2012] Smiatek, J. and A. Heuer. 2012. A statistical view on team handball results: home advantage, team fitness and prediction of match outcomes. arXiv preprint arXiv:1207.0700 . Tomy and Veena [2022] Tomy, L. and G. Veena. 2022. A retrospective study on Skellam and related distributions. Austrian Journal of Statistics 51(1): 102–111 . Van Eetvelde et al. [2023] Van Eetvelde, H., L.M. Hvattum, and C. Ley. 2023. The probabilistic final standing calculator: a fair stochastic tool to handle abruptly stopped football seasons. AStA Advances in Statistical Analysis 107(1-2): 251–269 . Volossovitch and Debanne [2021] Volossovitch, A. and T. Debanne. 2021. Home advantage in handball. Home Advantage in Sport: Causes and the Effect on Performance: 220–227 . Ntzoufras, I., V. Palaskas, and S. Drikos. 2021. Bayesian models for prediction of the set-difference in volleyball. IMA Journal of Management Mathematics 32(4): 491–518 . Ötting et al. [2024] Ötting, M., R. Michels, R. Langrock, and C. Deutscher. 2024. Demand for live betting: An analysis using state-space models. Applied Stochastic Models in Business and Industry . Pelechrinis and Winston [2021] Pelechrinis, K. and W. Winston. 2021. A Skellam regression model for quantifying positional value in soccer. Journal of Quantitative Analysis in Sports 17(3): 187–201 . Prieto et al. [2016] Prieto, J., M.Á. Gómez, A. Volossovitch, and J. Sampaio. 2016. Effects of team timeouts on the teams’ scoring performance in elite handball close games. Kinesiology 48(1.): 115–123 . Singh et al. [2023] Singh, A., P. Scarf, and R. Baker. 2023. A unified theory for bivariate scores in possessive ball-sports: The case of handball. European Journal of Operational Research 304(3): 1099–1112 . Skellam [1946] Skellam, J. 1946. The frequency distribution of the difference between two Poisson variates belonging to different populations. Journal of the Royal Statistical Society. Series A 109(3): 296–296 . Smiatek and Heuer [2012] Smiatek, J. and A. Heuer. 2012. A statistical view on team handball results: home advantage, team fitness and prediction of match outcomes. arXiv preprint arXiv:1207.0700 . Tomy and Veena [2022] Tomy, L. and G. Veena. 2022. A retrospective study on Skellam and related distributions. Austrian Journal of Statistics 51(1): 102–111 . Van Eetvelde et al. [2023] Van Eetvelde, H., L.M. Hvattum, and C. Ley. 2023. The probabilistic final standing calculator: a fair stochastic tool to handle abruptly stopped football seasons. AStA Advances in Statistical Analysis 107(1-2): 251–269 . Volossovitch and Debanne [2021] Volossovitch, A. and T. Debanne. 2021. Home advantage in handball. Home Advantage in Sport: Causes and the Effect on Performance: 220–227 . Ötting, M., R. Michels, R. Langrock, and C. Deutscher. 2024. Demand for live betting: An analysis using state-space models. Applied Stochastic Models in Business and Industry . Pelechrinis and Winston [2021] Pelechrinis, K. and W. Winston. 2021. A Skellam regression model for quantifying positional value in soccer. Journal of Quantitative Analysis in Sports 17(3): 187–201 . Prieto et al. [2016] Prieto, J., M.Á. Gómez, A. Volossovitch, and J. Sampaio. 2016. Effects of team timeouts on the teams’ scoring performance in elite handball close games. Kinesiology 48(1.): 115–123 . Singh et al. [2023] Singh, A., P. Scarf, and R. Baker. 2023. A unified theory for bivariate scores in possessive ball-sports: The case of handball. European Journal of Operational Research 304(3): 1099–1112 . Skellam [1946] Skellam, J. 1946. The frequency distribution of the difference between two Poisson variates belonging to different populations. Journal of the Royal Statistical Society. Series A 109(3): 296–296 . Smiatek and Heuer [2012] Smiatek, J. and A. Heuer. 2012. A statistical view on team handball results: home advantage, team fitness and prediction of match outcomes. arXiv preprint arXiv:1207.0700 . Tomy and Veena [2022] Tomy, L. and G. Veena. 2022. A retrospective study on Skellam and related distributions. Austrian Journal of Statistics 51(1): 102–111 . Van Eetvelde et al. [2023] Van Eetvelde, H., L.M. Hvattum, and C. Ley. 2023. The probabilistic final standing calculator: a fair stochastic tool to handle abruptly stopped football seasons. AStA Advances in Statistical Analysis 107(1-2): 251–269 . Volossovitch and Debanne [2021] Volossovitch, A. and T. Debanne. 2021. Home advantage in handball. Home Advantage in Sport: Causes and the Effect on Performance: 220–227 . Pelechrinis, K. and W. Winston. 2021. A Skellam regression model for quantifying positional value in soccer. Journal of Quantitative Analysis in Sports 17(3): 187–201 . Prieto et al. [2016] Prieto, J., M.Á. Gómez, A. Volossovitch, and J. Sampaio. 2016. Effects of team timeouts on the teams’ scoring performance in elite handball close games. Kinesiology 48(1.): 115–123 . Singh et al. [2023] Singh, A., P. Scarf, and R. Baker. 2023. A unified theory for bivariate scores in possessive ball-sports: The case of handball. European Journal of Operational Research 304(3): 1099–1112 . Skellam [1946] Skellam, J. 1946. The frequency distribution of the difference between two Poisson variates belonging to different populations. Journal of the Royal Statistical Society. Series A 109(3): 296–296 . Smiatek and Heuer [2012] Smiatek, J. and A. Heuer. 2012. A statistical view on team handball results: home advantage, team fitness and prediction of match outcomes. arXiv preprint arXiv:1207.0700 . Tomy and Veena [2022] Tomy, L. and G. Veena. 2022. A retrospective study on Skellam and related distributions. Austrian Journal of Statistics 51(1): 102–111 . Van Eetvelde et al. [2023] Van Eetvelde, H., L.M. Hvattum, and C. Ley. 2023. The probabilistic final standing calculator: a fair stochastic tool to handle abruptly stopped football seasons. AStA Advances in Statistical Analysis 107(1-2): 251–269 . Volossovitch and Debanne [2021] Volossovitch, A. and T. Debanne. 2021. Home advantage in handball. Home Advantage in Sport: Causes and the Effect on Performance: 220–227 . Prieto, J., M.Á. Gómez, A. Volossovitch, and J. Sampaio. 2016. Effects of team timeouts on the teams’ scoring performance in elite handball close games. Kinesiology 48(1.): 115–123 . Singh et al. [2023] Singh, A., P. Scarf, and R. Baker. 2023. A unified theory for bivariate scores in possessive ball-sports: The case of handball. European Journal of Operational Research 304(3): 1099–1112 . Skellam [1946] Skellam, J. 1946. The frequency distribution of the difference between two Poisson variates belonging to different populations. Journal of the Royal Statistical Society. Series A 109(3): 296–296 . Smiatek and Heuer [2012] Smiatek, J. and A. Heuer. 2012. A statistical view on team handball results: home advantage, team fitness and prediction of match outcomes. arXiv preprint arXiv:1207.0700 . Tomy and Veena [2022] Tomy, L. and G. Veena. 2022. A retrospective study on Skellam and related distributions. Austrian Journal of Statistics 51(1): 102–111 . Van Eetvelde et al. [2023] Van Eetvelde, H., L.M. Hvattum, and C. Ley. 2023. The probabilistic final standing calculator: a fair stochastic tool to handle abruptly stopped football seasons. AStA Advances in Statistical Analysis 107(1-2): 251–269 . Volossovitch and Debanne [2021] Volossovitch, A. and T. Debanne. 2021. Home advantage in handball. Home Advantage in Sport: Causes and the Effect on Performance: 220–227 . Singh, A., P. Scarf, and R. Baker. 2023. A unified theory for bivariate scores in possessive ball-sports: The case of handball. European Journal of Operational Research 304(3): 1099–1112 . Skellam [1946] Skellam, J. 1946. The frequency distribution of the difference between two Poisson variates belonging to different populations. Journal of the Royal Statistical Society. Series A 109(3): 296–296 . Smiatek and Heuer [2012] Smiatek, J. and A. Heuer. 2012. A statistical view on team handball results: home advantage, team fitness and prediction of match outcomes. arXiv preprint arXiv:1207.0700 . Tomy and Veena [2022] Tomy, L. and G. Veena. 2022. A retrospective study on Skellam and related distributions. Austrian Journal of Statistics 51(1): 102–111 . Van Eetvelde et al. [2023] Van Eetvelde, H., L.M. Hvattum, and C. Ley. 2023. The probabilistic final standing calculator: a fair stochastic tool to handle abruptly stopped football seasons. AStA Advances in Statistical Analysis 107(1-2): 251–269 . Volossovitch and Debanne [2021] Volossovitch, A. and T. Debanne. 2021. Home advantage in handball. Home Advantage in Sport: Causes and the Effect on Performance: 220–227 . Skellam, J. 1946. The frequency distribution of the difference between two Poisson variates belonging to different populations. Journal of the Royal Statistical Society. Series A 109(3): 296–296 . Smiatek and Heuer [2012] Smiatek, J. and A. Heuer. 2012. A statistical view on team handball results: home advantage, team fitness and prediction of match outcomes. arXiv preprint arXiv:1207.0700 . Tomy and Veena [2022] Tomy, L. and G. Veena. 2022. A retrospective study on Skellam and related distributions. Austrian Journal of Statistics 51(1): 102–111 . Van Eetvelde et al. [2023] Van Eetvelde, H., L.M. Hvattum, and C. Ley. 2023. The probabilistic final standing calculator: a fair stochastic tool to handle abruptly stopped football seasons. AStA Advances in Statistical Analysis 107(1-2): 251–269 . Volossovitch and Debanne [2021] Volossovitch, A. and T. Debanne. 2021. Home advantage in handball. Home Advantage in Sport: Causes and the Effect on Performance: 220–227 . Smiatek, J. and A. Heuer. 2012. A statistical view on team handball results: home advantage, team fitness and prediction of match outcomes. arXiv preprint arXiv:1207.0700 . Tomy and Veena [2022] Tomy, L. and G. Veena. 2022. A retrospective study on Skellam and related distributions. Austrian Journal of Statistics 51(1): 102–111 . Van Eetvelde et al. [2023] Van Eetvelde, H., L.M. Hvattum, and C. Ley. 2023. The probabilistic final standing calculator: a fair stochastic tool to handle abruptly stopped football seasons. AStA Advances in Statistical Analysis 107(1-2): 251–269 . Volossovitch and Debanne [2021] Volossovitch, A. and T. Debanne. 2021. Home advantage in handball. Home Advantage in Sport: Causes and the Effect on Performance: 220–227 . Tomy, L. and G. Veena. 2022. A retrospective study on Skellam and related distributions. Austrian Journal of Statistics 51(1): 102–111 . Van Eetvelde et al. [2023] Van Eetvelde, H., L.M. Hvattum, and C. Ley. 2023. The probabilistic final standing calculator: a fair stochastic tool to handle abruptly stopped football seasons. AStA Advances in Statistical Analysis 107(1-2): 251–269 . Volossovitch and Debanne [2021] Volossovitch, A. and T. Debanne. 2021. Home advantage in handball. Home Advantage in Sport: Causes and the Effect on Performance: 220–227 . Van Eetvelde, H., L.M. Hvattum, and C. Ley. 2023. The probabilistic final standing calculator: a fair stochastic tool to handle abruptly stopped football seasons. AStA Advances in Statistical Analysis 107(1-2): 251–269 . Volossovitch and Debanne [2021] Volossovitch, A. and T. Debanne. 2021. Home advantage in handball. Home Advantage in Sport: Causes and the Effect on Performance: 220–227 . Volossovitch, A. and T. Debanne. 2021. Home advantage in handball. Home Advantage in Sport: Causes and the Effect on Performance: 220–227 .
- A Skellam model to identify differential patterns of gene expression induced by environmental signals. BMC Genomics 15(1): 1–9 . Karlis and Mamode Khan [2023] Karlis, D. and N. Mamode Khan. 2023. Models for integer data. Annual Review of Statistics and its Application 10: 297–323 . Karlis and Ntzoufras [2006] Karlis, D. and I. Ntzoufras. 2006. Bayesian analysis of the differences of count data. Statistics in Medicine 25(11): 1885–1905 . Koopman et al. [2017] Koopman, S.J., R. Lit, and A. Lucas. 2017. Intraday stochastic volatility in discrete price changes: the dynamic Skellam model. Journal of the American Statistical Association 112(520): 1490–1503 . Lago-Peñas et al. [2013] Lago-Peñas, C., M.A. Gomez, J. Viaño, and I. González-García. 2013. Home advantage in elite handball: the impact of the quality of opposition on team performance. International Journal of Performance Analysis in Sport 13(3): 724–733 . Maher [1982] Maher, M.J. 1982. Modelling association football scores. Statistica Neerlandica 36(3): 109–118 . McHale and Scarf [2007] McHale, I. and P. Scarf. 2007. Modelling soccer matches using bivariate discrete distributions with general dependence structure. Statistica Neerlandica 61(4): 432–445 . Michels et al. [2023] Michels, R., M. Ötting, and D. Karlis. 2023. Extending the Dixon and Coles model: an application to women’s football data. arXiv preprint arXiv:2307.02139 . Michels et al. [2023] Michels, R., M. Ötting, and R. Langrock. 2023. Bettors’ reaction to match dynamics: Evidence from in-game betting. European Journal of Operational Research 310(3): 1118–1127 . Ntzoufras et al. [2021] Ntzoufras, I., V. Palaskas, and S. Drikos. 2021. Bayesian models for prediction of the set-difference in volleyball. IMA Journal of Management Mathematics 32(4): 491–518 . Ötting et al. [2024] Ötting, M., R. Michels, R. Langrock, and C. Deutscher. 2024. Demand for live betting: An analysis using state-space models. Applied Stochastic Models in Business and Industry . Pelechrinis and Winston [2021] Pelechrinis, K. and W. Winston. 2021. A Skellam regression model for quantifying positional value in soccer. Journal of Quantitative Analysis in Sports 17(3): 187–201 . Prieto et al. [2016] Prieto, J., M.Á. Gómez, A. Volossovitch, and J. Sampaio. 2016. Effects of team timeouts on the teams’ scoring performance in elite handball close games. Kinesiology 48(1.): 115–123 . Singh et al. [2023] Singh, A., P. Scarf, and R. Baker. 2023. A unified theory for bivariate scores in possessive ball-sports: The case of handball. European Journal of Operational Research 304(3): 1099–1112 . Skellam [1946] Skellam, J. 1946. The frequency distribution of the difference between two Poisson variates belonging to different populations. Journal of the Royal Statistical Society. Series A 109(3): 296–296 . Smiatek and Heuer [2012] Smiatek, J. and A. Heuer. 2012. A statistical view on team handball results: home advantage, team fitness and prediction of match outcomes. arXiv preprint arXiv:1207.0700 . Tomy and Veena [2022] Tomy, L. and G. Veena. 2022. A retrospective study on Skellam and related distributions. Austrian Journal of Statistics 51(1): 102–111 . Van Eetvelde et al. [2023] Van Eetvelde, H., L.M. Hvattum, and C. Ley. 2023. The probabilistic final standing calculator: a fair stochastic tool to handle abruptly stopped football seasons. AStA Advances in Statistical Analysis 107(1-2): 251–269 . Volossovitch and Debanne [2021] Volossovitch, A. and T. Debanne. 2021. Home advantage in handball. Home Advantage in Sport: Causes and the Effect on Performance: 220–227 . Karlis, D. and N. Mamode Khan. 2023. Models for integer data. Annual Review of Statistics and its Application 10: 297–323 . Karlis and Ntzoufras [2006] Karlis, D. and I. Ntzoufras. 2006. Bayesian analysis of the differences of count data. Statistics in Medicine 25(11): 1885–1905 . Koopman et al. [2017] Koopman, S.J., R. Lit, and A. Lucas. 2017. Intraday stochastic volatility in discrete price changes: the dynamic Skellam model. Journal of the American Statistical Association 112(520): 1490–1503 . Lago-Peñas et al. [2013] Lago-Peñas, C., M.A. Gomez, J. Viaño, and I. González-García. 2013. Home advantage in elite handball: the impact of the quality of opposition on team performance. International Journal of Performance Analysis in Sport 13(3): 724–733 . Maher [1982] Maher, M.J. 1982. Modelling association football scores. Statistica Neerlandica 36(3): 109–118 . McHale and Scarf [2007] McHale, I. and P. Scarf. 2007. Modelling soccer matches using bivariate discrete distributions with general dependence structure. Statistica Neerlandica 61(4): 432–445 . Michels et al. [2023] Michels, R., M. Ötting, and D. Karlis. 2023. Extending the Dixon and Coles model: an application to women’s football data. arXiv preprint arXiv:2307.02139 . Michels et al. [2023] Michels, R., M. Ötting, and R. Langrock. 2023. Bettors’ reaction to match dynamics: Evidence from in-game betting. European Journal of Operational Research 310(3): 1118–1127 . Ntzoufras et al. [2021] Ntzoufras, I., V. Palaskas, and S. Drikos. 2021. Bayesian models for prediction of the set-difference in volleyball. IMA Journal of Management Mathematics 32(4): 491–518 . Ötting et al. [2024] Ötting, M., R. Michels, R. Langrock, and C. Deutscher. 2024. Demand for live betting: An analysis using state-space models. Applied Stochastic Models in Business and Industry . Pelechrinis and Winston [2021] Pelechrinis, K. and W. Winston. 2021. A Skellam regression model for quantifying positional value in soccer. Journal of Quantitative Analysis in Sports 17(3): 187–201 . Prieto et al. [2016] Prieto, J., M.Á. Gómez, A. Volossovitch, and J. Sampaio. 2016. Effects of team timeouts on the teams’ scoring performance in elite handball close games. Kinesiology 48(1.): 115–123 . Singh et al. [2023] Singh, A., P. Scarf, and R. Baker. 2023. A unified theory for bivariate scores in possessive ball-sports: The case of handball. European Journal of Operational Research 304(3): 1099–1112 . Skellam [1946] Skellam, J. 1946. The frequency distribution of the difference between two Poisson variates belonging to different populations. Journal of the Royal Statistical Society. Series A 109(3): 296–296 . Smiatek and Heuer [2012] Smiatek, J. and A. Heuer. 2012. A statistical view on team handball results: home advantage, team fitness and prediction of match outcomes. arXiv preprint arXiv:1207.0700 . Tomy and Veena [2022] Tomy, L. and G. Veena. 2022. A retrospective study on Skellam and related distributions. Austrian Journal of Statistics 51(1): 102–111 . Van Eetvelde et al. [2023] Van Eetvelde, H., L.M. Hvattum, and C. Ley. 2023. The probabilistic final standing calculator: a fair stochastic tool to handle abruptly stopped football seasons. AStA Advances in Statistical Analysis 107(1-2): 251–269 . Volossovitch and Debanne [2021] Volossovitch, A. and T. Debanne. 2021. Home advantage in handball. Home Advantage in Sport: Causes and the Effect on Performance: 220–227 . Karlis, D. and I. Ntzoufras. 2006. Bayesian analysis of the differences of count data. Statistics in Medicine 25(11): 1885–1905 . Koopman et al. [2017] Koopman, S.J., R. Lit, and A. Lucas. 2017. Intraday stochastic volatility in discrete price changes: the dynamic Skellam model. Journal of the American Statistical Association 112(520): 1490–1503 . Lago-Peñas et al. [2013] Lago-Peñas, C., M.A. Gomez, J. Viaño, and I. González-García. 2013. Home advantage in elite handball: the impact of the quality of opposition on team performance. International Journal of Performance Analysis in Sport 13(3): 724–733 . Maher [1982] Maher, M.J. 1982. Modelling association football scores. Statistica Neerlandica 36(3): 109–118 . McHale and Scarf [2007] McHale, I. and P. Scarf. 2007. Modelling soccer matches using bivariate discrete distributions with general dependence structure. Statistica Neerlandica 61(4): 432–445 . Michels et al. [2023] Michels, R., M. Ötting, and D. Karlis. 2023. Extending the Dixon and Coles model: an application to women’s football data. arXiv preprint arXiv:2307.02139 . Michels et al. [2023] Michels, R., M. Ötting, and R. Langrock. 2023. Bettors’ reaction to match dynamics: Evidence from in-game betting. European Journal of Operational Research 310(3): 1118–1127 . Ntzoufras et al. [2021] Ntzoufras, I., V. Palaskas, and S. Drikos. 2021. Bayesian models for prediction of the set-difference in volleyball. IMA Journal of Management Mathematics 32(4): 491–518 . Ötting et al. [2024] Ötting, M., R. Michels, R. Langrock, and C. Deutscher. 2024. Demand for live betting: An analysis using state-space models. Applied Stochastic Models in Business and Industry . Pelechrinis and Winston [2021] Pelechrinis, K. and W. Winston. 2021. A Skellam regression model for quantifying positional value in soccer. Journal of Quantitative Analysis in Sports 17(3): 187–201 . Prieto et al. [2016] Prieto, J., M.Á. Gómez, A. Volossovitch, and J. Sampaio. 2016. Effects of team timeouts on the teams’ scoring performance in elite handball close games. Kinesiology 48(1.): 115–123 . Singh et al. [2023] Singh, A., P. Scarf, and R. Baker. 2023. A unified theory for bivariate scores in possessive ball-sports: The case of handball. European Journal of Operational Research 304(3): 1099–1112 . Skellam [1946] Skellam, J. 1946. The frequency distribution of the difference between two Poisson variates belonging to different populations. Journal of the Royal Statistical Society. Series A 109(3): 296–296 . Smiatek and Heuer [2012] Smiatek, J. and A. Heuer. 2012. A statistical view on team handball results: home advantage, team fitness and prediction of match outcomes. arXiv preprint arXiv:1207.0700 . Tomy and Veena [2022] Tomy, L. and G. Veena. 2022. A retrospective study on Skellam and related distributions. Austrian Journal of Statistics 51(1): 102–111 . Van Eetvelde et al. [2023] Van Eetvelde, H., L.M. Hvattum, and C. Ley. 2023. The probabilistic final standing calculator: a fair stochastic tool to handle abruptly stopped football seasons. AStA Advances in Statistical Analysis 107(1-2): 251–269 . Volossovitch and Debanne [2021] Volossovitch, A. and T. Debanne. 2021. Home advantage in handball. Home Advantage in Sport: Causes and the Effect on Performance: 220–227 . Koopman, S.J., R. Lit, and A. Lucas. 2017. Intraday stochastic volatility in discrete price changes: the dynamic Skellam model. Journal of the American Statistical Association 112(520): 1490–1503 . Lago-Peñas et al. [2013] Lago-Peñas, C., M.A. Gomez, J. Viaño, and I. González-García. 2013. Home advantage in elite handball: the impact of the quality of opposition on team performance. International Journal of Performance Analysis in Sport 13(3): 724–733 . Maher [1982] Maher, M.J. 1982. Modelling association football scores. Statistica Neerlandica 36(3): 109–118 . McHale and Scarf [2007] McHale, I. and P. Scarf. 2007. Modelling soccer matches using bivariate discrete distributions with general dependence structure. Statistica Neerlandica 61(4): 432–445 . Michels et al. [2023] Michels, R., M. Ötting, and D. Karlis. 2023. Extending the Dixon and Coles model: an application to women’s football data. arXiv preprint arXiv:2307.02139 . Michels et al. [2023] Michels, R., M. Ötting, and R. Langrock. 2023. Bettors’ reaction to match dynamics: Evidence from in-game betting. European Journal of Operational Research 310(3): 1118–1127 . Ntzoufras et al. [2021] Ntzoufras, I., V. Palaskas, and S. Drikos. 2021. Bayesian models for prediction of the set-difference in volleyball. IMA Journal of Management Mathematics 32(4): 491–518 . Ötting et al. [2024] Ötting, M., R. Michels, R. Langrock, and C. Deutscher. 2024. Demand for live betting: An analysis using state-space models. Applied Stochastic Models in Business and Industry . Pelechrinis and Winston [2021] Pelechrinis, K. and W. Winston. 2021. A Skellam regression model for quantifying positional value in soccer. Journal of Quantitative Analysis in Sports 17(3): 187–201 . Prieto et al. [2016] Prieto, J., M.Á. Gómez, A. Volossovitch, and J. Sampaio. 2016. Effects of team timeouts on the teams’ scoring performance in elite handball close games. Kinesiology 48(1.): 115–123 . Singh et al. [2023] Singh, A., P. Scarf, and R. Baker. 2023. A unified theory for bivariate scores in possessive ball-sports: The case of handball. European Journal of Operational Research 304(3): 1099–1112 . Skellam [1946] Skellam, J. 1946. The frequency distribution of the difference between two Poisson variates belonging to different populations. Journal of the Royal Statistical Society. Series A 109(3): 296–296 . Smiatek and Heuer [2012] Smiatek, J. and A. Heuer. 2012. A statistical view on team handball results: home advantage, team fitness and prediction of match outcomes. arXiv preprint arXiv:1207.0700 . Tomy and Veena [2022] Tomy, L. and G. Veena. 2022. A retrospective study on Skellam and related distributions. Austrian Journal of Statistics 51(1): 102–111 . Van Eetvelde et al. [2023] Van Eetvelde, H., L.M. Hvattum, and C. Ley. 2023. The probabilistic final standing calculator: a fair stochastic tool to handle abruptly stopped football seasons. AStA Advances in Statistical Analysis 107(1-2): 251–269 . Volossovitch and Debanne [2021] Volossovitch, A. and T. Debanne. 2021. Home advantage in handball. Home Advantage in Sport: Causes and the Effect on Performance: 220–227 . Lago-Peñas, C., M.A. Gomez, J. Viaño, and I. González-García. 2013. Home advantage in elite handball: the impact of the quality of opposition on team performance. International Journal of Performance Analysis in Sport 13(3): 724–733 . Maher [1982] Maher, M.J. 1982. Modelling association football scores. Statistica Neerlandica 36(3): 109–118 . McHale and Scarf [2007] McHale, I. and P. Scarf. 2007. Modelling soccer matches using bivariate discrete distributions with general dependence structure. Statistica Neerlandica 61(4): 432–445 . Michels et al. [2023] Michels, R., M. Ötting, and D. Karlis. 2023. Extending the Dixon and Coles model: an application to women’s football data. arXiv preprint arXiv:2307.02139 . Michels et al. [2023] Michels, R., M. Ötting, and R. Langrock. 2023. Bettors’ reaction to match dynamics: Evidence from in-game betting. European Journal of Operational Research 310(3): 1118–1127 . Ntzoufras et al. [2021] Ntzoufras, I., V. Palaskas, and S. Drikos. 2021. Bayesian models for prediction of the set-difference in volleyball. IMA Journal of Management Mathematics 32(4): 491–518 . Ötting et al. [2024] Ötting, M., R. Michels, R. Langrock, and C. Deutscher. 2024. Demand for live betting: An analysis using state-space models. Applied Stochastic Models in Business and Industry . Pelechrinis and Winston [2021] Pelechrinis, K. and W. Winston. 2021. A Skellam regression model for quantifying positional value in soccer. Journal of Quantitative Analysis in Sports 17(3): 187–201 . Prieto et al. [2016] Prieto, J., M.Á. Gómez, A. Volossovitch, and J. Sampaio. 2016. Effects of team timeouts on the teams’ scoring performance in elite handball close games. Kinesiology 48(1.): 115–123 . Singh et al. [2023] Singh, A., P. Scarf, and R. Baker. 2023. A unified theory for bivariate scores in possessive ball-sports: The case of handball. European Journal of Operational Research 304(3): 1099–1112 . Skellam [1946] Skellam, J. 1946. The frequency distribution of the difference between two Poisson variates belonging to different populations. Journal of the Royal Statistical Society. Series A 109(3): 296–296 . Smiatek and Heuer [2012] Smiatek, J. and A. Heuer. 2012. A statistical view on team handball results: home advantage, team fitness and prediction of match outcomes. arXiv preprint arXiv:1207.0700 . Tomy and Veena [2022] Tomy, L. and G. Veena. 2022. A retrospective study on Skellam and related distributions. Austrian Journal of Statistics 51(1): 102–111 . Van Eetvelde et al. [2023] Van Eetvelde, H., L.M. Hvattum, and C. Ley. 2023. The probabilistic final standing calculator: a fair stochastic tool to handle abruptly stopped football seasons. AStA Advances in Statistical Analysis 107(1-2): 251–269 . Volossovitch and Debanne [2021] Volossovitch, A. and T. Debanne. 2021. Home advantage in handball. Home Advantage in Sport: Causes and the Effect on Performance: 220–227 . Maher, M.J. 1982. Modelling association football scores. Statistica Neerlandica 36(3): 109–118 . McHale and Scarf [2007] McHale, I. and P. Scarf. 2007. Modelling soccer matches using bivariate discrete distributions with general dependence structure. Statistica Neerlandica 61(4): 432–445 . Michels et al. [2023] Michels, R., M. Ötting, and D. Karlis. 2023. Extending the Dixon and Coles model: an application to women’s football data. arXiv preprint arXiv:2307.02139 . Michels et al. [2023] Michels, R., M. Ötting, and R. Langrock. 2023. Bettors’ reaction to match dynamics: Evidence from in-game betting. European Journal of Operational Research 310(3): 1118–1127 . Ntzoufras et al. [2021] Ntzoufras, I., V. Palaskas, and S. Drikos. 2021. Bayesian models for prediction of the set-difference in volleyball. IMA Journal of Management Mathematics 32(4): 491–518 . Ötting et al. [2024] Ötting, M., R. Michels, R. Langrock, and C. Deutscher. 2024. Demand for live betting: An analysis using state-space models. Applied Stochastic Models in Business and Industry . Pelechrinis and Winston [2021] Pelechrinis, K. and W. Winston. 2021. A Skellam regression model for quantifying positional value in soccer. Journal of Quantitative Analysis in Sports 17(3): 187–201 . Prieto et al. [2016] Prieto, J., M.Á. Gómez, A. Volossovitch, and J. Sampaio. 2016. Effects of team timeouts on the teams’ scoring performance in elite handball close games. Kinesiology 48(1.): 115–123 . Singh et al. [2023] Singh, A., P. Scarf, and R. Baker. 2023. A unified theory for bivariate scores in possessive ball-sports: The case of handball. European Journal of Operational Research 304(3): 1099–1112 . Skellam [1946] Skellam, J. 1946. The frequency distribution of the difference between two Poisson variates belonging to different populations. Journal of the Royal Statistical Society. Series A 109(3): 296–296 . Smiatek and Heuer [2012] Smiatek, J. and A. Heuer. 2012. A statistical view on team handball results: home advantage, team fitness and prediction of match outcomes. arXiv preprint arXiv:1207.0700 . Tomy and Veena [2022] Tomy, L. and G. Veena. 2022. A retrospective study on Skellam and related distributions. Austrian Journal of Statistics 51(1): 102–111 . Van Eetvelde et al. [2023] Van Eetvelde, H., L.M. Hvattum, and C. Ley. 2023. The probabilistic final standing calculator: a fair stochastic tool to handle abruptly stopped football seasons. AStA Advances in Statistical Analysis 107(1-2): 251–269 . Volossovitch and Debanne [2021] Volossovitch, A. and T. Debanne. 2021. Home advantage in handball. Home Advantage in Sport: Causes and the Effect on Performance: 220–227 . McHale, I. and P. Scarf. 2007. Modelling soccer matches using bivariate discrete distributions with general dependence structure. Statistica Neerlandica 61(4): 432–445 . Michels et al. [2023] Michels, R., M. Ötting, and D. Karlis. 2023. Extending the Dixon and Coles model: an application to women’s football data. arXiv preprint arXiv:2307.02139 . Michels et al. [2023] Michels, R., M. Ötting, and R. Langrock. 2023. Bettors’ reaction to match dynamics: Evidence from in-game betting. European Journal of Operational Research 310(3): 1118–1127 . Ntzoufras et al. [2021] Ntzoufras, I., V. Palaskas, and S. Drikos. 2021. Bayesian models for prediction of the set-difference in volleyball. IMA Journal of Management Mathematics 32(4): 491–518 . Ötting et al. [2024] Ötting, M., R. Michels, R. Langrock, and C. Deutscher. 2024. Demand for live betting: An analysis using state-space models. Applied Stochastic Models in Business and Industry . Pelechrinis and Winston [2021] Pelechrinis, K. and W. Winston. 2021. A Skellam regression model for quantifying positional value in soccer. Journal of Quantitative Analysis in Sports 17(3): 187–201 . Prieto et al. [2016] Prieto, J., M.Á. Gómez, A. Volossovitch, and J. Sampaio. 2016. Effects of team timeouts on the teams’ scoring performance in elite handball close games. Kinesiology 48(1.): 115–123 . Singh et al. [2023] Singh, A., P. Scarf, and R. Baker. 2023. A unified theory for bivariate scores in possessive ball-sports: The case of handball. European Journal of Operational Research 304(3): 1099–1112 . Skellam [1946] Skellam, J. 1946. The frequency distribution of the difference between two Poisson variates belonging to different populations. Journal of the Royal Statistical Society. Series A 109(3): 296–296 . Smiatek and Heuer [2012] Smiatek, J. and A. Heuer. 2012. A statistical view on team handball results: home advantage, team fitness and prediction of match outcomes. arXiv preprint arXiv:1207.0700 . Tomy and Veena [2022] Tomy, L. and G. Veena. 2022. A retrospective study on Skellam and related distributions. Austrian Journal of Statistics 51(1): 102–111 . Van Eetvelde et al. [2023] Van Eetvelde, H., L.M. Hvattum, and C. Ley. 2023. The probabilistic final standing calculator: a fair stochastic tool to handle abruptly stopped football seasons. AStA Advances in Statistical Analysis 107(1-2): 251–269 . Volossovitch and Debanne [2021] Volossovitch, A. and T. Debanne. 2021. Home advantage in handball. Home Advantage in Sport: Causes and the Effect on Performance: 220–227 . Michels, R., M. Ötting, and D. Karlis. 2023. Extending the Dixon and Coles model: an application to women’s football data. arXiv preprint arXiv:2307.02139 . Michels et al. [2023] Michels, R., M. Ötting, and R. Langrock. 2023. Bettors’ reaction to match dynamics: Evidence from in-game betting. European Journal of Operational Research 310(3): 1118–1127 . Ntzoufras et al. [2021] Ntzoufras, I., V. Palaskas, and S. Drikos. 2021. Bayesian models for prediction of the set-difference in volleyball. IMA Journal of Management Mathematics 32(4): 491–518 . Ötting et al. [2024] Ötting, M., R. Michels, R. Langrock, and C. Deutscher. 2024. Demand for live betting: An analysis using state-space models. Applied Stochastic Models in Business and Industry . Pelechrinis and Winston [2021] Pelechrinis, K. and W. Winston. 2021. A Skellam regression model for quantifying positional value in soccer. Journal of Quantitative Analysis in Sports 17(3): 187–201 . Prieto et al. [2016] Prieto, J., M.Á. Gómez, A. Volossovitch, and J. Sampaio. 2016. Effects of team timeouts on the teams’ scoring performance in elite handball close games. Kinesiology 48(1.): 115–123 . Singh et al. [2023] Singh, A., P. Scarf, and R. Baker. 2023. A unified theory for bivariate scores in possessive ball-sports: The case of handball. European Journal of Operational Research 304(3): 1099–1112 . Skellam [1946] Skellam, J. 1946. The frequency distribution of the difference between two Poisson variates belonging to different populations. Journal of the Royal Statistical Society. Series A 109(3): 296–296 . Smiatek and Heuer [2012] Smiatek, J. and A. Heuer. 2012. A statistical view on team handball results: home advantage, team fitness and prediction of match outcomes. arXiv preprint arXiv:1207.0700 . Tomy and Veena [2022] Tomy, L. and G. Veena. 2022. A retrospective study on Skellam and related distributions. Austrian Journal of Statistics 51(1): 102–111 . Van Eetvelde et al. [2023] Van Eetvelde, H., L.M. Hvattum, and C. Ley. 2023. The probabilistic final standing calculator: a fair stochastic tool to handle abruptly stopped football seasons. AStA Advances in Statistical Analysis 107(1-2): 251–269 . Volossovitch and Debanne [2021] Volossovitch, A. and T. Debanne. 2021. Home advantage in handball. Home Advantage in Sport: Causes and the Effect on Performance: 220–227 . Michels, R., M. Ötting, and R. Langrock. 2023. Bettors’ reaction to match dynamics: Evidence from in-game betting. European Journal of Operational Research 310(3): 1118–1127 . Ntzoufras et al. [2021] Ntzoufras, I., V. Palaskas, and S. Drikos. 2021. Bayesian models for prediction of the set-difference in volleyball. IMA Journal of Management Mathematics 32(4): 491–518 . Ötting et al. [2024] Ötting, M., R. Michels, R. Langrock, and C. Deutscher. 2024. Demand for live betting: An analysis using state-space models. Applied Stochastic Models in Business and Industry . Pelechrinis and Winston [2021] Pelechrinis, K. and W. Winston. 2021. A Skellam regression model for quantifying positional value in soccer. Journal of Quantitative Analysis in Sports 17(3): 187–201 . Prieto et al. [2016] Prieto, J., M.Á. Gómez, A. Volossovitch, and J. Sampaio. 2016. Effects of team timeouts on the teams’ scoring performance in elite handball close games. Kinesiology 48(1.): 115–123 . Singh et al. [2023] Singh, A., P. Scarf, and R. Baker. 2023. A unified theory for bivariate scores in possessive ball-sports: The case of handball. European Journal of Operational Research 304(3): 1099–1112 . Skellam [1946] Skellam, J. 1946. The frequency distribution of the difference between two Poisson variates belonging to different populations. Journal of the Royal Statistical Society. Series A 109(3): 296–296 . Smiatek and Heuer [2012] Smiatek, J. and A. Heuer. 2012. A statistical view on team handball results: home advantage, team fitness and prediction of match outcomes. arXiv preprint arXiv:1207.0700 . Tomy and Veena [2022] Tomy, L. and G. Veena. 2022. A retrospective study on Skellam and related distributions. Austrian Journal of Statistics 51(1): 102–111 . Van Eetvelde et al. [2023] Van Eetvelde, H., L.M. Hvattum, and C. Ley. 2023. The probabilistic final standing calculator: a fair stochastic tool to handle abruptly stopped football seasons. AStA Advances in Statistical Analysis 107(1-2): 251–269 . Volossovitch and Debanne [2021] Volossovitch, A. and T. Debanne. 2021. Home advantage in handball. Home Advantage in Sport: Causes and the Effect on Performance: 220–227 . Ntzoufras, I., V. Palaskas, and S. Drikos. 2021. Bayesian models for prediction of the set-difference in volleyball. IMA Journal of Management Mathematics 32(4): 491–518 . Ötting et al. [2024] Ötting, M., R. Michels, R. Langrock, and C. Deutscher. 2024. Demand for live betting: An analysis using state-space models. Applied Stochastic Models in Business and Industry . Pelechrinis and Winston [2021] Pelechrinis, K. and W. Winston. 2021. A Skellam regression model for quantifying positional value in soccer. Journal of Quantitative Analysis in Sports 17(3): 187–201 . Prieto et al. [2016] Prieto, J., M.Á. Gómez, A. Volossovitch, and J. Sampaio. 2016. Effects of team timeouts on the teams’ scoring performance in elite handball close games. Kinesiology 48(1.): 115–123 . Singh et al. [2023] Singh, A., P. Scarf, and R. Baker. 2023. A unified theory for bivariate scores in possessive ball-sports: The case of handball. European Journal of Operational Research 304(3): 1099–1112 . Skellam [1946] Skellam, J. 1946. The frequency distribution of the difference between two Poisson variates belonging to different populations. Journal of the Royal Statistical Society. Series A 109(3): 296–296 . Smiatek and Heuer [2012] Smiatek, J. and A. Heuer. 2012. A statistical view on team handball results: home advantage, team fitness and prediction of match outcomes. arXiv preprint arXiv:1207.0700 . Tomy and Veena [2022] Tomy, L. and G. Veena. 2022. A retrospective study on Skellam and related distributions. Austrian Journal of Statistics 51(1): 102–111 . Van Eetvelde et al. [2023] Van Eetvelde, H., L.M. Hvattum, and C. Ley. 2023. The probabilistic final standing calculator: a fair stochastic tool to handle abruptly stopped football seasons. AStA Advances in Statistical Analysis 107(1-2): 251–269 . Volossovitch and Debanne [2021] Volossovitch, A. and T. Debanne. 2021. Home advantage in handball. Home Advantage in Sport: Causes and the Effect on Performance: 220–227 . Ötting, M., R. Michels, R. Langrock, and C. Deutscher. 2024. Demand for live betting: An analysis using state-space models. Applied Stochastic Models in Business and Industry . Pelechrinis and Winston [2021] Pelechrinis, K. and W. Winston. 2021. A Skellam regression model for quantifying positional value in soccer. Journal of Quantitative Analysis in Sports 17(3): 187–201 . Prieto et al. [2016] Prieto, J., M.Á. Gómez, A. Volossovitch, and J. Sampaio. 2016. Effects of team timeouts on the teams’ scoring performance in elite handball close games. Kinesiology 48(1.): 115–123 . Singh et al. [2023] Singh, A., P. Scarf, and R. Baker. 2023. A unified theory for bivariate scores in possessive ball-sports: The case of handball. European Journal of Operational Research 304(3): 1099–1112 . Skellam [1946] Skellam, J. 1946. The frequency distribution of the difference between two Poisson variates belonging to different populations. Journal of the Royal Statistical Society. Series A 109(3): 296–296 . Smiatek and Heuer [2012] Smiatek, J. and A. Heuer. 2012. A statistical view on team handball results: home advantage, team fitness and prediction of match outcomes. arXiv preprint arXiv:1207.0700 . Tomy and Veena [2022] Tomy, L. and G. Veena. 2022. A retrospective study on Skellam and related distributions. Austrian Journal of Statistics 51(1): 102–111 . Van Eetvelde et al. [2023] Van Eetvelde, H., L.M. Hvattum, and C. Ley. 2023. The probabilistic final standing calculator: a fair stochastic tool to handle abruptly stopped football seasons. AStA Advances in Statistical Analysis 107(1-2): 251–269 . Volossovitch and Debanne [2021] Volossovitch, A. and T. Debanne. 2021. Home advantage in handball. Home Advantage in Sport: Causes and the Effect on Performance: 220–227 . Pelechrinis, K. and W. Winston. 2021. A Skellam regression model for quantifying positional value in soccer. Journal of Quantitative Analysis in Sports 17(3): 187–201 . Prieto et al. [2016] Prieto, J., M.Á. Gómez, A. Volossovitch, and J. Sampaio. 2016. Effects of team timeouts on the teams’ scoring performance in elite handball close games. Kinesiology 48(1.): 115–123 . Singh et al. [2023] Singh, A., P. Scarf, and R. Baker. 2023. A unified theory for bivariate scores in possessive ball-sports: The case of handball. European Journal of Operational Research 304(3): 1099–1112 . Skellam [1946] Skellam, J. 1946. The frequency distribution of the difference between two Poisson variates belonging to different populations. Journal of the Royal Statistical Society. Series A 109(3): 296–296 . Smiatek and Heuer [2012] Smiatek, J. and A. Heuer. 2012. A statistical view on team handball results: home advantage, team fitness and prediction of match outcomes. arXiv preprint arXiv:1207.0700 . Tomy and Veena [2022] Tomy, L. and G. Veena. 2022. A retrospective study on Skellam and related distributions. Austrian Journal of Statistics 51(1): 102–111 . Van Eetvelde et al. [2023] Van Eetvelde, H., L.M. Hvattum, and C. Ley. 2023. The probabilistic final standing calculator: a fair stochastic tool to handle abruptly stopped football seasons. AStA Advances in Statistical Analysis 107(1-2): 251–269 . Volossovitch and Debanne [2021] Volossovitch, A. and T. Debanne. 2021. Home advantage in handball. Home Advantage in Sport: Causes and the Effect on Performance: 220–227 . Prieto, J., M.Á. Gómez, A. Volossovitch, and J. Sampaio. 2016. Effects of team timeouts on the teams’ scoring performance in elite handball close games. Kinesiology 48(1.): 115–123 . Singh et al. [2023] Singh, A., P. Scarf, and R. Baker. 2023. A unified theory for bivariate scores in possessive ball-sports: The case of handball. European Journal of Operational Research 304(3): 1099–1112 . Skellam [1946] Skellam, J. 1946. The frequency distribution of the difference between two Poisson variates belonging to different populations. Journal of the Royal Statistical Society. Series A 109(3): 296–296 . Smiatek and Heuer [2012] Smiatek, J. and A. Heuer. 2012. A statistical view on team handball results: home advantage, team fitness and prediction of match outcomes. arXiv preprint arXiv:1207.0700 . Tomy and Veena [2022] Tomy, L. and G. Veena. 2022. A retrospective study on Skellam and related distributions. Austrian Journal of Statistics 51(1): 102–111 . Van Eetvelde et al. [2023] Van Eetvelde, H., L.M. Hvattum, and C. Ley. 2023. The probabilistic final standing calculator: a fair stochastic tool to handle abruptly stopped football seasons. AStA Advances in Statistical Analysis 107(1-2): 251–269 . Volossovitch and Debanne [2021] Volossovitch, A. and T. Debanne. 2021. Home advantage in handball. Home Advantage in Sport: Causes and the Effect on Performance: 220–227 . Singh, A., P. Scarf, and R. Baker. 2023. A unified theory for bivariate scores in possessive ball-sports: The case of handball. European Journal of Operational Research 304(3): 1099–1112 . Skellam [1946] Skellam, J. 1946. The frequency distribution of the difference between two Poisson variates belonging to different populations. Journal of the Royal Statistical Society. Series A 109(3): 296–296 . Smiatek and Heuer [2012] Smiatek, J. and A. Heuer. 2012. A statistical view on team handball results: home advantage, team fitness and prediction of match outcomes. arXiv preprint arXiv:1207.0700 . Tomy and Veena [2022] Tomy, L. and G. Veena. 2022. A retrospective study on Skellam and related distributions. Austrian Journal of Statistics 51(1): 102–111 . Van Eetvelde et al. [2023] Van Eetvelde, H., L.M. Hvattum, and C. Ley. 2023. The probabilistic final standing calculator: a fair stochastic tool to handle abruptly stopped football seasons. AStA Advances in Statistical Analysis 107(1-2): 251–269 . Volossovitch and Debanne [2021] Volossovitch, A. and T. Debanne. 2021. Home advantage in handball. Home Advantage in Sport: Causes and the Effect on Performance: 220–227 . Skellam, J. 1946. The frequency distribution of the difference between two Poisson variates belonging to different populations. Journal of the Royal Statistical Society. Series A 109(3): 296–296 . Smiatek and Heuer [2012] Smiatek, J. and A. Heuer. 2012. A statistical view on team handball results: home advantage, team fitness and prediction of match outcomes. arXiv preprint arXiv:1207.0700 . Tomy and Veena [2022] Tomy, L. and G. Veena. 2022. A retrospective study on Skellam and related distributions. Austrian Journal of Statistics 51(1): 102–111 . Van Eetvelde et al. [2023] Van Eetvelde, H., L.M. Hvattum, and C. Ley. 2023. The probabilistic final standing calculator: a fair stochastic tool to handle abruptly stopped football seasons. AStA Advances in Statistical Analysis 107(1-2): 251–269 . Volossovitch and Debanne [2021] Volossovitch, A. and T. Debanne. 2021. Home advantage in handball. Home Advantage in Sport: Causes and the Effect on Performance: 220–227 . Smiatek, J. and A. Heuer. 2012. A statistical view on team handball results: home advantage, team fitness and prediction of match outcomes. arXiv preprint arXiv:1207.0700 . Tomy and Veena [2022] Tomy, L. and G. Veena. 2022. A retrospective study on Skellam and related distributions. Austrian Journal of Statistics 51(1): 102–111 . Van Eetvelde et al. [2023] Van Eetvelde, H., L.M. Hvattum, and C. Ley. 2023. The probabilistic final standing calculator: a fair stochastic tool to handle abruptly stopped football seasons. AStA Advances in Statistical Analysis 107(1-2): 251–269 . Volossovitch and Debanne [2021] Volossovitch, A. and T. Debanne. 2021. Home advantage in handball. Home Advantage in Sport: Causes and the Effect on Performance: 220–227 . Tomy, L. and G. Veena. 2022. A retrospective study on Skellam and related distributions. Austrian Journal of Statistics 51(1): 102–111 . Van Eetvelde et al. [2023] Van Eetvelde, H., L.M. Hvattum, and C. Ley. 2023. The probabilistic final standing calculator: a fair stochastic tool to handle abruptly stopped football seasons. AStA Advances in Statistical Analysis 107(1-2): 251–269 . Volossovitch and Debanne [2021] Volossovitch, A. and T. Debanne. 2021. Home advantage in handball. Home Advantage in Sport: Causes and the Effect on Performance: 220–227 . Van Eetvelde, H., L.M. Hvattum, and C. Ley. 2023. The probabilistic final standing calculator: a fair stochastic tool to handle abruptly stopped football seasons. AStA Advances in Statistical Analysis 107(1-2): 251–269 . Volossovitch and Debanne [2021] Volossovitch, A. and T. Debanne. 2021. Home advantage in handball. Home Advantage in Sport: Causes and the Effect on Performance: 220–227 . Volossovitch, A. and T. Debanne. 2021. Home advantage in handball. Home Advantage in Sport: Causes and the Effect on Performance: 220–227 .
- Models for integer data. Annual Review of Statistics and its Application 10: 297–323 . Karlis and Ntzoufras [2006] Karlis, D. and I. Ntzoufras. 2006. Bayesian analysis of the differences of count data. Statistics in Medicine 25(11): 1885–1905 . Koopman et al. [2017] Koopman, S.J., R. Lit, and A. Lucas. 2017. Intraday stochastic volatility in discrete price changes: the dynamic Skellam model. Journal of the American Statistical Association 112(520): 1490–1503 . Lago-Peñas et al. [2013] Lago-Peñas, C., M.A. Gomez, J. Viaño, and I. González-García. 2013. Home advantage in elite handball: the impact of the quality of opposition on team performance. International Journal of Performance Analysis in Sport 13(3): 724–733 . Maher [1982] Maher, M.J. 1982. Modelling association football scores. Statistica Neerlandica 36(3): 109–118 . McHale and Scarf [2007] McHale, I. and P. Scarf. 2007. Modelling soccer matches using bivariate discrete distributions with general dependence structure. Statistica Neerlandica 61(4): 432–445 . Michels et al. [2023] Michels, R., M. Ötting, and D. Karlis. 2023. Extending the Dixon and Coles model: an application to women’s football data. arXiv preprint arXiv:2307.02139 . Michels et al. [2023] Michels, R., M. Ötting, and R. Langrock. 2023. Bettors’ reaction to match dynamics: Evidence from in-game betting. European Journal of Operational Research 310(3): 1118–1127 . Ntzoufras et al. [2021] Ntzoufras, I., V. Palaskas, and S. Drikos. 2021. Bayesian models for prediction of the set-difference in volleyball. IMA Journal of Management Mathematics 32(4): 491–518 . Ötting et al. [2024] Ötting, M., R. Michels, R. Langrock, and C. Deutscher. 2024. Demand for live betting: An analysis using state-space models. Applied Stochastic Models in Business and Industry . Pelechrinis and Winston [2021] Pelechrinis, K. and W. Winston. 2021. A Skellam regression model for quantifying positional value in soccer. Journal of Quantitative Analysis in Sports 17(3): 187–201 . Prieto et al. [2016] Prieto, J., M.Á. Gómez, A. Volossovitch, and J. Sampaio. 2016. Effects of team timeouts on the teams’ scoring performance in elite handball close games. Kinesiology 48(1.): 115–123 . Singh et al. [2023] Singh, A., P. Scarf, and R. Baker. 2023. A unified theory for bivariate scores in possessive ball-sports: The case of handball. European Journal of Operational Research 304(3): 1099–1112 . Skellam [1946] Skellam, J. 1946. The frequency distribution of the difference between two Poisson variates belonging to different populations. Journal of the Royal Statistical Society. Series A 109(3): 296–296 . Smiatek and Heuer [2012] Smiatek, J. and A. Heuer. 2012. A statistical view on team handball results: home advantage, team fitness and prediction of match outcomes. arXiv preprint arXiv:1207.0700 . Tomy and Veena [2022] Tomy, L. and G. Veena. 2022. A retrospective study on Skellam and related distributions. Austrian Journal of Statistics 51(1): 102–111 . Van Eetvelde et al. [2023] Van Eetvelde, H., L.M. Hvattum, and C. Ley. 2023. The probabilistic final standing calculator: a fair stochastic tool to handle abruptly stopped football seasons. AStA Advances in Statistical Analysis 107(1-2): 251–269 . Volossovitch and Debanne [2021] Volossovitch, A. and T. Debanne. 2021. Home advantage in handball. Home Advantage in Sport: Causes and the Effect on Performance: 220–227 . Karlis, D. and I. Ntzoufras. 2006. Bayesian analysis of the differences of count data. Statistics in Medicine 25(11): 1885–1905 . Koopman et al. [2017] Koopman, S.J., R. Lit, and A. Lucas. 2017. Intraday stochastic volatility in discrete price changes: the dynamic Skellam model. Journal of the American Statistical Association 112(520): 1490–1503 . Lago-Peñas et al. [2013] Lago-Peñas, C., M.A. Gomez, J. Viaño, and I. González-García. 2013. Home advantage in elite handball: the impact of the quality of opposition on team performance. International Journal of Performance Analysis in Sport 13(3): 724–733 . Maher [1982] Maher, M.J. 1982. Modelling association football scores. Statistica Neerlandica 36(3): 109–118 . McHale and Scarf [2007] McHale, I. and P. Scarf. 2007. Modelling soccer matches using bivariate discrete distributions with general dependence structure. Statistica Neerlandica 61(4): 432–445 . Michels et al. [2023] Michels, R., M. Ötting, and D. Karlis. 2023. Extending the Dixon and Coles model: an application to women’s football data. arXiv preprint arXiv:2307.02139 . Michels et al. [2023] Michels, R., M. Ötting, and R. Langrock. 2023. Bettors’ reaction to match dynamics: Evidence from in-game betting. European Journal of Operational Research 310(3): 1118–1127 . Ntzoufras et al. [2021] Ntzoufras, I., V. Palaskas, and S. Drikos. 2021. Bayesian models for prediction of the set-difference in volleyball. IMA Journal of Management Mathematics 32(4): 491–518 . Ötting et al. [2024] Ötting, M., R. Michels, R. Langrock, and C. Deutscher. 2024. Demand for live betting: An analysis using state-space models. Applied Stochastic Models in Business and Industry . Pelechrinis and Winston [2021] Pelechrinis, K. and W. Winston. 2021. A Skellam regression model for quantifying positional value in soccer. Journal of Quantitative Analysis in Sports 17(3): 187–201 . Prieto et al. [2016] Prieto, J., M.Á. Gómez, A. Volossovitch, and J. Sampaio. 2016. Effects of team timeouts on the teams’ scoring performance in elite handball close games. Kinesiology 48(1.): 115–123 . Singh et al. [2023] Singh, A., P. Scarf, and R. Baker. 2023. A unified theory for bivariate scores in possessive ball-sports: The case of handball. European Journal of Operational Research 304(3): 1099–1112 . Skellam [1946] Skellam, J. 1946. The frequency distribution of the difference between two Poisson variates belonging to different populations. Journal of the Royal Statistical Society. Series A 109(3): 296–296 . Smiatek and Heuer [2012] Smiatek, J. and A. Heuer. 2012. A statistical view on team handball results: home advantage, team fitness and prediction of match outcomes. arXiv preprint arXiv:1207.0700 . Tomy and Veena [2022] Tomy, L. and G. Veena. 2022. A retrospective study on Skellam and related distributions. Austrian Journal of Statistics 51(1): 102–111 . Van Eetvelde et al. [2023] Van Eetvelde, H., L.M. Hvattum, and C. Ley. 2023. The probabilistic final standing calculator: a fair stochastic tool to handle abruptly stopped football seasons. AStA Advances in Statistical Analysis 107(1-2): 251–269 . Volossovitch and Debanne [2021] Volossovitch, A. and T. Debanne. 2021. Home advantage in handball. Home Advantage in Sport: Causes and the Effect on Performance: 220–227 . Koopman, S.J., R. Lit, and A. Lucas. 2017. Intraday stochastic volatility in discrete price changes: the dynamic Skellam model. Journal of the American Statistical Association 112(520): 1490–1503 . Lago-Peñas et al. [2013] Lago-Peñas, C., M.A. Gomez, J. Viaño, and I. González-García. 2013. Home advantage in elite handball: the impact of the quality of opposition on team performance. International Journal of Performance Analysis in Sport 13(3): 724–733 . Maher [1982] Maher, M.J. 1982. Modelling association football scores. Statistica Neerlandica 36(3): 109–118 . McHale and Scarf [2007] McHale, I. and P. Scarf. 2007. Modelling soccer matches using bivariate discrete distributions with general dependence structure. Statistica Neerlandica 61(4): 432–445 . Michels et al. [2023] Michels, R., M. Ötting, and D. Karlis. 2023. Extending the Dixon and Coles model: an application to women’s football data. arXiv preprint arXiv:2307.02139 . Michels et al. [2023] Michels, R., M. Ötting, and R. Langrock. 2023. Bettors’ reaction to match dynamics: Evidence from in-game betting. European Journal of Operational Research 310(3): 1118–1127 . Ntzoufras et al. [2021] Ntzoufras, I., V. Palaskas, and S. Drikos. 2021. Bayesian models for prediction of the set-difference in volleyball. IMA Journal of Management Mathematics 32(4): 491–518 . Ötting et al. [2024] Ötting, M., R. Michels, R. Langrock, and C. Deutscher. 2024. Demand for live betting: An analysis using state-space models. Applied Stochastic Models in Business and Industry . Pelechrinis and Winston [2021] Pelechrinis, K. and W. Winston. 2021. A Skellam regression model for quantifying positional value in soccer. Journal of Quantitative Analysis in Sports 17(3): 187–201 . Prieto et al. [2016] Prieto, J., M.Á. Gómez, A. Volossovitch, and J. Sampaio. 2016. Effects of team timeouts on the teams’ scoring performance in elite handball close games. Kinesiology 48(1.): 115–123 . Singh et al. [2023] Singh, A., P. Scarf, and R. Baker. 2023. A unified theory for bivariate scores in possessive ball-sports: The case of handball. European Journal of Operational Research 304(3): 1099–1112 . Skellam [1946] Skellam, J. 1946. The frequency distribution of the difference between two Poisson variates belonging to different populations. Journal of the Royal Statistical Society. Series A 109(3): 296–296 . Smiatek and Heuer [2012] Smiatek, J. and A. Heuer. 2012. A statistical view on team handball results: home advantage, team fitness and prediction of match outcomes. arXiv preprint arXiv:1207.0700 . Tomy and Veena [2022] Tomy, L. and G. Veena. 2022. A retrospective study on Skellam and related distributions. Austrian Journal of Statistics 51(1): 102–111 . Van Eetvelde et al. [2023] Van Eetvelde, H., L.M. Hvattum, and C. Ley. 2023. The probabilistic final standing calculator: a fair stochastic tool to handle abruptly stopped football seasons. AStA Advances in Statistical Analysis 107(1-2): 251–269 . Volossovitch and Debanne [2021] Volossovitch, A. and T. Debanne. 2021. Home advantage in handball. Home Advantage in Sport: Causes and the Effect on Performance: 220–227 . Lago-Peñas, C., M.A. Gomez, J. Viaño, and I. González-García. 2013. Home advantage in elite handball: the impact of the quality of opposition on team performance. International Journal of Performance Analysis in Sport 13(3): 724–733 . Maher [1982] Maher, M.J. 1982. Modelling association football scores. Statistica Neerlandica 36(3): 109–118 . McHale and Scarf [2007] McHale, I. and P. Scarf. 2007. Modelling soccer matches using bivariate discrete distributions with general dependence structure. Statistica Neerlandica 61(4): 432–445 . Michels et al. [2023] Michels, R., M. Ötting, and D. Karlis. 2023. Extending the Dixon and Coles model: an application to women’s football data. arXiv preprint arXiv:2307.02139 . Michels et al. [2023] Michels, R., M. Ötting, and R. Langrock. 2023. Bettors’ reaction to match dynamics: Evidence from in-game betting. European Journal of Operational Research 310(3): 1118–1127 . Ntzoufras et al. [2021] Ntzoufras, I., V. Palaskas, and S. Drikos. 2021. Bayesian models for prediction of the set-difference in volleyball. IMA Journal of Management Mathematics 32(4): 491–518 . Ötting et al. [2024] Ötting, M., R. Michels, R. Langrock, and C. Deutscher. 2024. Demand for live betting: An analysis using state-space models. Applied Stochastic Models in Business and Industry . Pelechrinis and Winston [2021] Pelechrinis, K. and W. Winston. 2021. A Skellam regression model for quantifying positional value in soccer. Journal of Quantitative Analysis in Sports 17(3): 187–201 . Prieto et al. [2016] Prieto, J., M.Á. Gómez, A. Volossovitch, and J. Sampaio. 2016. Effects of team timeouts on the teams’ scoring performance in elite handball close games. Kinesiology 48(1.): 115–123 . Singh et al. [2023] Singh, A., P. Scarf, and R. Baker. 2023. A unified theory for bivariate scores in possessive ball-sports: The case of handball. European Journal of Operational Research 304(3): 1099–1112 . Skellam [1946] Skellam, J. 1946. The frequency distribution of the difference between two Poisson variates belonging to different populations. Journal of the Royal Statistical Society. Series A 109(3): 296–296 . Smiatek and Heuer [2012] Smiatek, J. and A. Heuer. 2012. A statistical view on team handball results: home advantage, team fitness and prediction of match outcomes. arXiv preprint arXiv:1207.0700 . Tomy and Veena [2022] Tomy, L. and G. Veena. 2022. A retrospective study on Skellam and related distributions. Austrian Journal of Statistics 51(1): 102–111 . Van Eetvelde et al. [2023] Van Eetvelde, H., L.M. Hvattum, and C. Ley. 2023. The probabilistic final standing calculator: a fair stochastic tool to handle abruptly stopped football seasons. AStA Advances in Statistical Analysis 107(1-2): 251–269 . Volossovitch and Debanne [2021] Volossovitch, A. and T. Debanne. 2021. Home advantage in handball. Home Advantage in Sport: Causes and the Effect on Performance: 220–227 . Maher, M.J. 1982. Modelling association football scores. Statistica Neerlandica 36(3): 109–118 . McHale and Scarf [2007] McHale, I. and P. Scarf. 2007. Modelling soccer matches using bivariate discrete distributions with general dependence structure. Statistica Neerlandica 61(4): 432–445 . Michels et al. [2023] Michels, R., M. Ötting, and D. Karlis. 2023. Extending the Dixon and Coles model: an application to women’s football data. arXiv preprint arXiv:2307.02139 . Michels et al. [2023] Michels, R., M. Ötting, and R. Langrock. 2023. Bettors’ reaction to match dynamics: Evidence from in-game betting. European Journal of Operational Research 310(3): 1118–1127 . Ntzoufras et al. [2021] Ntzoufras, I., V. Palaskas, and S. Drikos. 2021. Bayesian models for prediction of the set-difference in volleyball. IMA Journal of Management Mathematics 32(4): 491–518 . Ötting et al. [2024] Ötting, M., R. Michels, R. Langrock, and C. Deutscher. 2024. Demand for live betting: An analysis using state-space models. Applied Stochastic Models in Business and Industry . Pelechrinis and Winston [2021] Pelechrinis, K. and W. Winston. 2021. A Skellam regression model for quantifying positional value in soccer. Journal of Quantitative Analysis in Sports 17(3): 187–201 . Prieto et al. [2016] Prieto, J., M.Á. Gómez, A. Volossovitch, and J. Sampaio. 2016. Effects of team timeouts on the teams’ scoring performance in elite handball close games. Kinesiology 48(1.): 115–123 . Singh et al. [2023] Singh, A., P. Scarf, and R. Baker. 2023. A unified theory for bivariate scores in possessive ball-sports: The case of handball. European Journal of Operational Research 304(3): 1099–1112 . Skellam [1946] Skellam, J. 1946. The frequency distribution of the difference between two Poisson variates belonging to different populations. Journal of the Royal Statistical Society. Series A 109(3): 296–296 . Smiatek and Heuer [2012] Smiatek, J. and A. Heuer. 2012. A statistical view on team handball results: home advantage, team fitness and prediction of match outcomes. arXiv preprint arXiv:1207.0700 . Tomy and Veena [2022] Tomy, L. and G. Veena. 2022. A retrospective study on Skellam and related distributions. Austrian Journal of Statistics 51(1): 102–111 . Van Eetvelde et al. [2023] Van Eetvelde, H., L.M. Hvattum, and C. Ley. 2023. The probabilistic final standing calculator: a fair stochastic tool to handle abruptly stopped football seasons. AStA Advances in Statistical Analysis 107(1-2): 251–269 . Volossovitch and Debanne [2021] Volossovitch, A. and T. Debanne. 2021. Home advantage in handball. Home Advantage in Sport: Causes and the Effect on Performance: 220–227 . McHale, I. and P. Scarf. 2007. Modelling soccer matches using bivariate discrete distributions with general dependence structure. Statistica Neerlandica 61(4): 432–445 . Michels et al. [2023] Michels, R., M. Ötting, and D. Karlis. 2023. Extending the Dixon and Coles model: an application to women’s football data. arXiv preprint arXiv:2307.02139 . Michels et al. [2023] Michels, R., M. Ötting, and R. Langrock. 2023. Bettors’ reaction to match dynamics: Evidence from in-game betting. European Journal of Operational Research 310(3): 1118–1127 . Ntzoufras et al. [2021] Ntzoufras, I., V. Palaskas, and S. Drikos. 2021. Bayesian models for prediction of the set-difference in volleyball. IMA Journal of Management Mathematics 32(4): 491–518 . Ötting et al. [2024] Ötting, M., R. Michels, R. Langrock, and C. Deutscher. 2024. Demand for live betting: An analysis using state-space models. Applied Stochastic Models in Business and Industry . Pelechrinis and Winston [2021] Pelechrinis, K. and W. Winston. 2021. A Skellam regression model for quantifying positional value in soccer. Journal of Quantitative Analysis in Sports 17(3): 187–201 . Prieto et al. [2016] Prieto, J., M.Á. Gómez, A. Volossovitch, and J. Sampaio. 2016. Effects of team timeouts on the teams’ scoring performance in elite handball close games. Kinesiology 48(1.): 115–123 . Singh et al. [2023] Singh, A., P. Scarf, and R. Baker. 2023. A unified theory for bivariate scores in possessive ball-sports: The case of handball. European Journal of Operational Research 304(3): 1099–1112 . Skellam [1946] Skellam, J. 1946. The frequency distribution of the difference between two Poisson variates belonging to different populations. Journal of the Royal Statistical Society. Series A 109(3): 296–296 . Smiatek and Heuer [2012] Smiatek, J. and A. Heuer. 2012. A statistical view on team handball results: home advantage, team fitness and prediction of match outcomes. arXiv preprint arXiv:1207.0700 . Tomy and Veena [2022] Tomy, L. and G. Veena. 2022. A retrospective study on Skellam and related distributions. Austrian Journal of Statistics 51(1): 102–111 . Van Eetvelde et al. [2023] Van Eetvelde, H., L.M. Hvattum, and C. Ley. 2023. The probabilistic final standing calculator: a fair stochastic tool to handle abruptly stopped football seasons. AStA Advances in Statistical Analysis 107(1-2): 251–269 . Volossovitch and Debanne [2021] Volossovitch, A. and T. Debanne. 2021. Home advantage in handball. Home Advantage in Sport: Causes and the Effect on Performance: 220–227 . Michels, R., M. Ötting, and D. Karlis. 2023. Extending the Dixon and Coles model: an application to women’s football data. arXiv preprint arXiv:2307.02139 . Michels et al. [2023] Michels, R., M. Ötting, and R. Langrock. 2023. Bettors’ reaction to match dynamics: Evidence from in-game betting. European Journal of Operational Research 310(3): 1118–1127 . Ntzoufras et al. [2021] Ntzoufras, I., V. Palaskas, and S. Drikos. 2021. Bayesian models for prediction of the set-difference in volleyball. IMA Journal of Management Mathematics 32(4): 491–518 . Ötting et al. [2024] Ötting, M., R. Michels, R. Langrock, and C. Deutscher. 2024. Demand for live betting: An analysis using state-space models. Applied Stochastic Models in Business and Industry . Pelechrinis and Winston [2021] Pelechrinis, K. and W. Winston. 2021. A Skellam regression model for quantifying positional value in soccer. Journal of Quantitative Analysis in Sports 17(3): 187–201 . Prieto et al. [2016] Prieto, J., M.Á. Gómez, A. Volossovitch, and J. Sampaio. 2016. Effects of team timeouts on the teams’ scoring performance in elite handball close games. Kinesiology 48(1.): 115–123 . Singh et al. [2023] Singh, A., P. Scarf, and R. Baker. 2023. A unified theory for bivariate scores in possessive ball-sports: The case of handball. European Journal of Operational Research 304(3): 1099–1112 . Skellam [1946] Skellam, J. 1946. The frequency distribution of the difference between two Poisson variates belonging to different populations. Journal of the Royal Statistical Society. Series A 109(3): 296–296 . Smiatek and Heuer [2012] Smiatek, J. and A. Heuer. 2012. A statistical view on team handball results: home advantage, team fitness and prediction of match outcomes. arXiv preprint arXiv:1207.0700 . Tomy and Veena [2022] Tomy, L. and G. Veena. 2022. A retrospective study on Skellam and related distributions. Austrian Journal of Statistics 51(1): 102–111 . Van Eetvelde et al. [2023] Van Eetvelde, H., L.M. Hvattum, and C. Ley. 2023. The probabilistic final standing calculator: a fair stochastic tool to handle abruptly stopped football seasons. AStA Advances in Statistical Analysis 107(1-2): 251–269 . Volossovitch and Debanne [2021] Volossovitch, A. and T. Debanne. 2021. Home advantage in handball. Home Advantage in Sport: Causes and the Effect on Performance: 220–227 . Michels, R., M. Ötting, and R. Langrock. 2023. Bettors’ reaction to match dynamics: Evidence from in-game betting. European Journal of Operational Research 310(3): 1118–1127 . Ntzoufras et al. [2021] Ntzoufras, I., V. Palaskas, and S. Drikos. 2021. Bayesian models for prediction of the set-difference in volleyball. IMA Journal of Management Mathematics 32(4): 491–518 . Ötting et al. [2024] Ötting, M., R. Michels, R. Langrock, and C. Deutscher. 2024. Demand for live betting: An analysis using state-space models. Applied Stochastic Models in Business and Industry . Pelechrinis and Winston [2021] Pelechrinis, K. and W. Winston. 2021. A Skellam regression model for quantifying positional value in soccer. Journal of Quantitative Analysis in Sports 17(3): 187–201 . Prieto et al. [2016] Prieto, J., M.Á. Gómez, A. Volossovitch, and J. Sampaio. 2016. Effects of team timeouts on the teams’ scoring performance in elite handball close games. Kinesiology 48(1.): 115–123 . Singh et al. [2023] Singh, A., P. Scarf, and R. Baker. 2023. A unified theory for bivariate scores in possessive ball-sports: The case of handball. European Journal of Operational Research 304(3): 1099–1112 . Skellam [1946] Skellam, J. 1946. The frequency distribution of the difference between two Poisson variates belonging to different populations. Journal of the Royal Statistical Society. Series A 109(3): 296–296 . Smiatek and Heuer [2012] Smiatek, J. and A. Heuer. 2012. A statistical view on team handball results: home advantage, team fitness and prediction of match outcomes. arXiv preprint arXiv:1207.0700 . Tomy and Veena [2022] Tomy, L. and G. Veena. 2022. A retrospective study on Skellam and related distributions. Austrian Journal of Statistics 51(1): 102–111 . Van Eetvelde et al. [2023] Van Eetvelde, H., L.M. Hvattum, and C. Ley. 2023. The probabilistic final standing calculator: a fair stochastic tool to handle abruptly stopped football seasons. AStA Advances in Statistical Analysis 107(1-2): 251–269 . Volossovitch and Debanne [2021] Volossovitch, A. and T. Debanne. 2021. Home advantage in handball. Home Advantage in Sport: Causes and the Effect on Performance: 220–227 . Ntzoufras, I., V. Palaskas, and S. Drikos. 2021. Bayesian models for prediction of the set-difference in volleyball. IMA Journal of Management Mathematics 32(4): 491–518 . Ötting et al. [2024] Ötting, M., R. Michels, R. Langrock, and C. Deutscher. 2024. Demand for live betting: An analysis using state-space models. Applied Stochastic Models in Business and Industry . Pelechrinis and Winston [2021] Pelechrinis, K. and W. Winston. 2021. A Skellam regression model for quantifying positional value in soccer. Journal of Quantitative Analysis in Sports 17(3): 187–201 . Prieto et al. [2016] Prieto, J., M.Á. Gómez, A. Volossovitch, and J. Sampaio. 2016. Effects of team timeouts on the teams’ scoring performance in elite handball close games. Kinesiology 48(1.): 115–123 . Singh et al. [2023] Singh, A., P. Scarf, and R. Baker. 2023. A unified theory for bivariate scores in possessive ball-sports: The case of handball. European Journal of Operational Research 304(3): 1099–1112 . Skellam [1946] Skellam, J. 1946. The frequency distribution of the difference between two Poisson variates belonging to different populations. Journal of the Royal Statistical Society. Series A 109(3): 296–296 . Smiatek and Heuer [2012] Smiatek, J. and A. Heuer. 2012. A statistical view on team handball results: home advantage, team fitness and prediction of match outcomes. arXiv preprint arXiv:1207.0700 . Tomy and Veena [2022] Tomy, L. and G. Veena. 2022. A retrospective study on Skellam and related distributions. Austrian Journal of Statistics 51(1): 102–111 . Van Eetvelde et al. [2023] Van Eetvelde, H., L.M. Hvattum, and C. Ley. 2023. The probabilistic final standing calculator: a fair stochastic tool to handle abruptly stopped football seasons. AStA Advances in Statistical Analysis 107(1-2): 251–269 . Volossovitch and Debanne [2021] Volossovitch, A. and T. Debanne. 2021. Home advantage in handball. Home Advantage in Sport: Causes and the Effect on Performance: 220–227 . Ötting, M., R. Michels, R. Langrock, and C. Deutscher. 2024. Demand for live betting: An analysis using state-space models. Applied Stochastic Models in Business and Industry . Pelechrinis and Winston [2021] Pelechrinis, K. and W. Winston. 2021. A Skellam regression model for quantifying positional value in soccer. Journal of Quantitative Analysis in Sports 17(3): 187–201 . Prieto et al. [2016] Prieto, J., M.Á. Gómez, A. Volossovitch, and J. Sampaio. 2016. Effects of team timeouts on the teams’ scoring performance in elite handball close games. Kinesiology 48(1.): 115–123 . Singh et al. [2023] Singh, A., P. Scarf, and R. Baker. 2023. A unified theory for bivariate scores in possessive ball-sports: The case of handball. European Journal of Operational Research 304(3): 1099–1112 . Skellam [1946] Skellam, J. 1946. The frequency distribution of the difference between two Poisson variates belonging to different populations. Journal of the Royal Statistical Society. Series A 109(3): 296–296 . Smiatek and Heuer [2012] Smiatek, J. and A. Heuer. 2012. A statistical view on team handball results: home advantage, team fitness and prediction of match outcomes. arXiv preprint arXiv:1207.0700 . Tomy and Veena [2022] Tomy, L. and G. Veena. 2022. A retrospective study on Skellam and related distributions. Austrian Journal of Statistics 51(1): 102–111 . Van Eetvelde et al. [2023] Van Eetvelde, H., L.M. Hvattum, and C. Ley. 2023. The probabilistic final standing calculator: a fair stochastic tool to handle abruptly stopped football seasons. AStA Advances in Statistical Analysis 107(1-2): 251–269 . Volossovitch and Debanne [2021] Volossovitch, A. and T. Debanne. 2021. Home advantage in handball. Home Advantage in Sport: Causes and the Effect on Performance: 220–227 . Pelechrinis, K. and W. Winston. 2021. A Skellam regression model for quantifying positional value in soccer. Journal of Quantitative Analysis in Sports 17(3): 187–201 . Prieto et al. [2016] Prieto, J., M.Á. Gómez, A. Volossovitch, and J. Sampaio. 2016. Effects of team timeouts on the teams’ scoring performance in elite handball close games. Kinesiology 48(1.): 115–123 . Singh et al. [2023] Singh, A., P. Scarf, and R. Baker. 2023. A unified theory for bivariate scores in possessive ball-sports: The case of handball. European Journal of Operational Research 304(3): 1099–1112 . Skellam [1946] Skellam, J. 1946. The frequency distribution of the difference between two Poisson variates belonging to different populations. Journal of the Royal Statistical Society. Series A 109(3): 296–296 . Smiatek and Heuer [2012] Smiatek, J. and A. Heuer. 2012. A statistical view on team handball results: home advantage, team fitness and prediction of match outcomes. arXiv preprint arXiv:1207.0700 . Tomy and Veena [2022] Tomy, L. and G. Veena. 2022. A retrospective study on Skellam and related distributions. Austrian Journal of Statistics 51(1): 102–111 . Van Eetvelde et al. [2023] Van Eetvelde, H., L.M. Hvattum, and C. Ley. 2023. The probabilistic final standing calculator: a fair stochastic tool to handle abruptly stopped football seasons. AStA Advances in Statistical Analysis 107(1-2): 251–269 . Volossovitch and Debanne [2021] Volossovitch, A. and T. Debanne. 2021. Home advantage in handball. Home Advantage in Sport: Causes and the Effect on Performance: 220–227 . Prieto, J., M.Á. Gómez, A. Volossovitch, and J. Sampaio. 2016. Effects of team timeouts on the teams’ scoring performance in elite handball close games. Kinesiology 48(1.): 115–123 . Singh et al. [2023] Singh, A., P. Scarf, and R. Baker. 2023. A unified theory for bivariate scores in possessive ball-sports: The case of handball. European Journal of Operational Research 304(3): 1099–1112 . Skellam [1946] Skellam, J. 1946. The frequency distribution of the difference between two Poisson variates belonging to different populations. Journal of the Royal Statistical Society. Series A 109(3): 296–296 . Smiatek and Heuer [2012] Smiatek, J. and A. Heuer. 2012. A statistical view on team handball results: home advantage, team fitness and prediction of match outcomes. arXiv preprint arXiv:1207.0700 . Tomy and Veena [2022] Tomy, L. and G. Veena. 2022. A retrospective study on Skellam and related distributions. Austrian Journal of Statistics 51(1): 102–111 . Van Eetvelde et al. [2023] Van Eetvelde, H., L.M. Hvattum, and C. Ley. 2023. The probabilistic final standing calculator: a fair stochastic tool to handle abruptly stopped football seasons. AStA Advances in Statistical Analysis 107(1-2): 251–269 . Volossovitch and Debanne [2021] Volossovitch, A. and T. Debanne. 2021. Home advantage in handball. Home Advantage in Sport: Causes and the Effect on Performance: 220–227 . Singh, A., P. Scarf, and R. Baker. 2023. A unified theory for bivariate scores in possessive ball-sports: The case of handball. European Journal of Operational Research 304(3): 1099–1112 . Skellam [1946] Skellam, J. 1946. The frequency distribution of the difference between two Poisson variates belonging to different populations. Journal of the Royal Statistical Society. Series A 109(3): 296–296 . Smiatek and Heuer [2012] Smiatek, J. and A. Heuer. 2012. A statistical view on team handball results: home advantage, team fitness and prediction of match outcomes. arXiv preprint arXiv:1207.0700 . Tomy and Veena [2022] Tomy, L. and G. Veena. 2022. A retrospective study on Skellam and related distributions. Austrian Journal of Statistics 51(1): 102–111 . Van Eetvelde et al. [2023] Van Eetvelde, H., L.M. Hvattum, and C. Ley. 2023. The probabilistic final standing calculator: a fair stochastic tool to handle abruptly stopped football seasons. AStA Advances in Statistical Analysis 107(1-2): 251–269 . Volossovitch and Debanne [2021] Volossovitch, A. and T. Debanne. 2021. Home advantage in handball. Home Advantage in Sport: Causes and the Effect on Performance: 220–227 . Skellam, J. 1946. The frequency distribution of the difference between two Poisson variates belonging to different populations. Journal of the Royal Statistical Society. Series A 109(3): 296–296 . Smiatek and Heuer [2012] Smiatek, J. and A. Heuer. 2012. A statistical view on team handball results: home advantage, team fitness and prediction of match outcomes. arXiv preprint arXiv:1207.0700 . Tomy and Veena [2022] Tomy, L. and G. Veena. 2022. A retrospective study on Skellam and related distributions. Austrian Journal of Statistics 51(1): 102–111 . Van Eetvelde et al. [2023] Van Eetvelde, H., L.M. Hvattum, and C. Ley. 2023. The probabilistic final standing calculator: a fair stochastic tool to handle abruptly stopped football seasons. AStA Advances in Statistical Analysis 107(1-2): 251–269 . Volossovitch and Debanne [2021] Volossovitch, A. and T. Debanne. 2021. Home advantage in handball. Home Advantage in Sport: Causes and the Effect on Performance: 220–227 . Smiatek, J. and A. Heuer. 2012. A statistical view on team handball results: home advantage, team fitness and prediction of match outcomes. arXiv preprint arXiv:1207.0700 . Tomy and Veena [2022] Tomy, L. and G. Veena. 2022. A retrospective study on Skellam and related distributions. Austrian Journal of Statistics 51(1): 102–111 . Van Eetvelde et al. [2023] Van Eetvelde, H., L.M. Hvattum, and C. Ley. 2023. The probabilistic final standing calculator: a fair stochastic tool to handle abruptly stopped football seasons. AStA Advances in Statistical Analysis 107(1-2): 251–269 . Volossovitch and Debanne [2021] Volossovitch, A. and T. Debanne. 2021. Home advantage in handball. Home Advantage in Sport: Causes and the Effect on Performance: 220–227 . Tomy, L. and G. Veena. 2022. A retrospective study on Skellam and related distributions. Austrian Journal of Statistics 51(1): 102–111 . Van Eetvelde et al. [2023] Van Eetvelde, H., L.M. Hvattum, and C. Ley. 2023. The probabilistic final standing calculator: a fair stochastic tool to handle abruptly stopped football seasons. AStA Advances in Statistical Analysis 107(1-2): 251–269 . Volossovitch and Debanne [2021] Volossovitch, A. and T. Debanne. 2021. Home advantage in handball. Home Advantage in Sport: Causes and the Effect on Performance: 220–227 . Van Eetvelde, H., L.M. Hvattum, and C. Ley. 2023. The probabilistic final standing calculator: a fair stochastic tool to handle abruptly stopped football seasons. AStA Advances in Statistical Analysis 107(1-2): 251–269 . Volossovitch and Debanne [2021] Volossovitch, A. and T. Debanne. 2021. Home advantage in handball. Home Advantage in Sport: Causes and the Effect on Performance: 220–227 . Volossovitch, A. and T. Debanne. 2021. Home advantage in handball. 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Extending the Dixon and Coles model: an application to women’s football data. arXiv preprint arXiv:2307.02139 . Michels et al. [2023] Michels, R., M. Ötting, and R. Langrock. 2023. Bettors’ reaction to match dynamics: Evidence from in-game betting. European Journal of Operational Research 310(3): 1118–1127 . Ntzoufras et al. [2021] Ntzoufras, I., V. Palaskas, and S. Drikos. 2021. Bayesian models for prediction of the set-difference in volleyball. IMA Journal of Management Mathematics 32(4): 491–518 . Ötting et al. [2024] Ötting, M., R. Michels, R. Langrock, and C. Deutscher. 2024. Demand for live betting: An analysis using state-space models. Applied Stochastic Models in Business and Industry . Pelechrinis and Winston [2021] Pelechrinis, K. and W. Winston. 2021. A Skellam regression model for quantifying positional value in soccer. Journal of Quantitative Analysis in Sports 17(3): 187–201 . Prieto et al. [2016] Prieto, J., M.Á. Gómez, A. Volossovitch, and J. Sampaio. 2016. Effects of team timeouts on the teams’ scoring performance in elite handball close games. Kinesiology 48(1.): 115–123 . Singh et al. [2023] Singh, A., P. Scarf, and R. Baker. 2023. A unified theory for bivariate scores in possessive ball-sports: The case of handball. European Journal of Operational Research 304(3): 1099–1112 . Skellam [1946] Skellam, J. 1946. The frequency distribution of the difference between two Poisson variates belonging to different populations. Journal of the Royal Statistical Society. Series A 109(3): 296–296 . Smiatek and Heuer [2012] Smiatek, J. and A. Heuer. 2012. A statistical view on team handball results: home advantage, team fitness and prediction of match outcomes. arXiv preprint arXiv:1207.0700 . Tomy and Veena [2022] Tomy, L. and G. Veena. 2022. A retrospective study on Skellam and related distributions. Austrian Journal of Statistics 51(1): 102–111 . Van Eetvelde et al. [2023] Van Eetvelde, H., L.M. Hvattum, and C. Ley. 2023. The probabilistic final standing calculator: a fair stochastic tool to handle abruptly stopped football seasons. AStA Advances in Statistical Analysis 107(1-2): 251–269 . Volossovitch and Debanne [2021] Volossovitch, A. and T. Debanne. 2021. Home advantage in handball. Home Advantage in Sport: Causes and the Effect on Performance: 220–227 . Koopman, S.J., R. Lit, and A. Lucas. 2017. Intraday stochastic volatility in discrete price changes: the dynamic Skellam model. Journal of the American Statistical Association 112(520): 1490–1503 . Lago-Peñas et al. [2013] Lago-Peñas, C., M.A. Gomez, J. Viaño, and I. González-García. 2013. Home advantage in elite handball: the impact of the quality of opposition on team performance. International Journal of Performance Analysis in Sport 13(3): 724–733 . Maher [1982] Maher, M.J. 1982. Modelling association football scores. Statistica Neerlandica 36(3): 109–118 . McHale and Scarf [2007] McHale, I. and P. Scarf. 2007. Modelling soccer matches using bivariate discrete distributions with general dependence structure. Statistica Neerlandica 61(4): 432–445 . Michels et al. [2023] Michels, R., M. Ötting, and D. Karlis. 2023. Extending the Dixon and Coles model: an application to women’s football data. arXiv preprint arXiv:2307.02139 . Michels et al. [2023] Michels, R., M. Ötting, and R. Langrock. 2023. Bettors’ reaction to match dynamics: Evidence from in-game betting. European Journal of Operational Research 310(3): 1118–1127 . Ntzoufras et al. [2021] Ntzoufras, I., V. Palaskas, and S. Drikos. 2021. Bayesian models for prediction of the set-difference in volleyball. IMA Journal of Management Mathematics 32(4): 491–518 . Ötting et al. [2024] Ötting, M., R. Michels, R. Langrock, and C. Deutscher. 2024. Demand for live betting: An analysis using state-space models. Applied Stochastic Models in Business and Industry . Pelechrinis and Winston [2021] Pelechrinis, K. and W. Winston. 2021. A Skellam regression model for quantifying positional value in soccer. Journal of Quantitative Analysis in Sports 17(3): 187–201 . Prieto et al. [2016] Prieto, J., M.Á. Gómez, A. Volossovitch, and J. Sampaio. 2016. Effects of team timeouts on the teams’ scoring performance in elite handball close games. Kinesiology 48(1.): 115–123 . Singh et al. [2023] Singh, A., P. Scarf, and R. Baker. 2023. A unified theory for bivariate scores in possessive ball-sports: The case of handball. European Journal of Operational Research 304(3): 1099–1112 . Skellam [1946] Skellam, J. 1946. The frequency distribution of the difference between two Poisson variates belonging to different populations. Journal of the Royal Statistical Society. Series A 109(3): 296–296 . Smiatek and Heuer [2012] Smiatek, J. and A. Heuer. 2012. A statistical view on team handball results: home advantage, team fitness and prediction of match outcomes. arXiv preprint arXiv:1207.0700 . Tomy and Veena [2022] Tomy, L. and G. Veena. 2022. A retrospective study on Skellam and related distributions. Austrian Journal of Statistics 51(1): 102–111 . Van Eetvelde et al. [2023] Van Eetvelde, H., L.M. Hvattum, and C. Ley. 2023. The probabilistic final standing calculator: a fair stochastic tool to handle abruptly stopped football seasons. AStA Advances in Statistical Analysis 107(1-2): 251–269 . Volossovitch and Debanne [2021] Volossovitch, A. and T. Debanne. 2021. Home advantage in handball. Home Advantage in Sport: Causes and the Effect on Performance: 220–227 . Lago-Peñas, C., M.A. Gomez, J. Viaño, and I. González-García. 2013. Home advantage in elite handball: the impact of the quality of opposition on team performance. International Journal of Performance Analysis in Sport 13(3): 724–733 . Maher [1982] Maher, M.J. 1982. Modelling association football scores. Statistica Neerlandica 36(3): 109–118 . McHale and Scarf [2007] McHale, I. and P. Scarf. 2007. Modelling soccer matches using bivariate discrete distributions with general dependence structure. Statistica Neerlandica 61(4): 432–445 . Michels et al. [2023] Michels, R., M. Ötting, and D. Karlis. 2023. Extending the Dixon and Coles model: an application to women’s football data. arXiv preprint arXiv:2307.02139 . Michels et al. [2023] Michels, R., M. Ötting, and R. Langrock. 2023. Bettors’ reaction to match dynamics: Evidence from in-game betting. European Journal of Operational Research 310(3): 1118–1127 . Ntzoufras et al. [2021] Ntzoufras, I., V. Palaskas, and S. Drikos. 2021. Bayesian models for prediction of the set-difference in volleyball. IMA Journal of Management Mathematics 32(4): 491–518 . Ötting et al. [2024] Ötting, M., R. Michels, R. Langrock, and C. Deutscher. 2024. Demand for live betting: An analysis using state-space models. Applied Stochastic Models in Business and Industry . Pelechrinis and Winston [2021] Pelechrinis, K. and W. Winston. 2021. A Skellam regression model for quantifying positional value in soccer. Journal of Quantitative Analysis in Sports 17(3): 187–201 . Prieto et al. [2016] Prieto, J., M.Á. Gómez, A. Volossovitch, and J. Sampaio. 2016. Effects of team timeouts on the teams’ scoring performance in elite handball close games. Kinesiology 48(1.): 115–123 . Singh et al. [2023] Singh, A., P. Scarf, and R. Baker. 2023. A unified theory for bivariate scores in possessive ball-sports: The case of handball. European Journal of Operational Research 304(3): 1099–1112 . Skellam [1946] Skellam, J. 1946. The frequency distribution of the difference between two Poisson variates belonging to different populations. Journal of the Royal Statistical Society. Series A 109(3): 296–296 . Smiatek and Heuer [2012] Smiatek, J. and A. Heuer. 2012. A statistical view on team handball results: home advantage, team fitness and prediction of match outcomes. arXiv preprint arXiv:1207.0700 . Tomy and Veena [2022] Tomy, L. and G. Veena. 2022. A retrospective study on Skellam and related distributions. Austrian Journal of Statistics 51(1): 102–111 . Van Eetvelde et al. [2023] Van Eetvelde, H., L.M. Hvattum, and C. Ley. 2023. The probabilistic final standing calculator: a fair stochastic tool to handle abruptly stopped football seasons. AStA Advances in Statistical Analysis 107(1-2): 251–269 . Volossovitch and Debanne [2021] Volossovitch, A. and T. Debanne. 2021. Home advantage in handball. Home Advantage in Sport: Causes and the Effect on Performance: 220–227 . Maher, M.J. 1982. Modelling association football scores. Statistica Neerlandica 36(3): 109–118 . McHale and Scarf [2007] McHale, I. and P. Scarf. 2007. Modelling soccer matches using bivariate discrete distributions with general dependence structure. Statistica Neerlandica 61(4): 432–445 . Michels et al. [2023] Michels, R., M. Ötting, and D. Karlis. 2023. Extending the Dixon and Coles model: an application to women’s football data. arXiv preprint arXiv:2307.02139 . Michels et al. [2023] Michels, R., M. Ötting, and R. Langrock. 2023. Bettors’ reaction to match dynamics: Evidence from in-game betting. European Journal of Operational Research 310(3): 1118–1127 . Ntzoufras et al. [2021] Ntzoufras, I., V. Palaskas, and S. Drikos. 2021. Bayesian models for prediction of the set-difference in volleyball. IMA Journal of Management Mathematics 32(4): 491–518 . Ötting et al. [2024] Ötting, M., R. Michels, R. Langrock, and C. Deutscher. 2024. Demand for live betting: An analysis using state-space models. Applied Stochastic Models in Business and Industry . Pelechrinis and Winston [2021] Pelechrinis, K. and W. Winston. 2021. A Skellam regression model for quantifying positional value in soccer. Journal of Quantitative Analysis in Sports 17(3): 187–201 . Prieto et al. [2016] Prieto, J., M.Á. Gómez, A. Volossovitch, and J. Sampaio. 2016. Effects of team timeouts on the teams’ scoring performance in elite handball close games. Kinesiology 48(1.): 115–123 . Singh et al. [2023] Singh, A., P. Scarf, and R. Baker. 2023. A unified theory for bivariate scores in possessive ball-sports: The case of handball. European Journal of Operational Research 304(3): 1099–1112 . Skellam [1946] Skellam, J. 1946. The frequency distribution of the difference between two Poisson variates belonging to different populations. Journal of the Royal Statistical Society. Series A 109(3): 296–296 . Smiatek and Heuer [2012] Smiatek, J. and A. Heuer. 2012. A statistical view on team handball results: home advantage, team fitness and prediction of match outcomes. arXiv preprint arXiv:1207.0700 . Tomy and Veena [2022] Tomy, L. and G. Veena. 2022. A retrospective study on Skellam and related distributions. Austrian Journal of Statistics 51(1): 102–111 . Van Eetvelde et al. [2023] Van Eetvelde, H., L.M. Hvattum, and C. Ley. 2023. The probabilistic final standing calculator: a fair stochastic tool to handle abruptly stopped football seasons. AStA Advances in Statistical Analysis 107(1-2): 251–269 . Volossovitch and Debanne [2021] Volossovitch, A. and T. Debanne. 2021. Home advantage in handball. Home Advantage in Sport: Causes and the Effect on Performance: 220–227 . McHale, I. and P. Scarf. 2007. Modelling soccer matches using bivariate discrete distributions with general dependence structure. Statistica Neerlandica 61(4): 432–445 . Michels et al. [2023] Michels, R., M. Ötting, and D. Karlis. 2023. Extending the Dixon and Coles model: an application to women’s football data. arXiv preprint arXiv:2307.02139 . Michels et al. [2023] Michels, R., M. Ötting, and R. Langrock. 2023. Bettors’ reaction to match dynamics: Evidence from in-game betting. European Journal of Operational Research 310(3): 1118–1127 . Ntzoufras et al. [2021] Ntzoufras, I., V. Palaskas, and S. Drikos. 2021. Bayesian models for prediction of the set-difference in volleyball. IMA Journal of Management Mathematics 32(4): 491–518 . Ötting et al. [2024] Ötting, M., R. Michels, R. Langrock, and C. Deutscher. 2024. Demand for live betting: An analysis using state-space models. Applied Stochastic Models in Business and Industry . Pelechrinis and Winston [2021] Pelechrinis, K. and W. Winston. 2021. A Skellam regression model for quantifying positional value in soccer. Journal of Quantitative Analysis in Sports 17(3): 187–201 . Prieto et al. [2016] Prieto, J., M.Á. Gómez, A. Volossovitch, and J. Sampaio. 2016. Effects of team timeouts on the teams’ scoring performance in elite handball close games. Kinesiology 48(1.): 115–123 . Singh et al. [2023] Singh, A., P. Scarf, and R. Baker. 2023. A unified theory for bivariate scores in possessive ball-sports: The case of handball. European Journal of Operational Research 304(3): 1099–1112 . Skellam [1946] Skellam, J. 1946. The frequency distribution of the difference between two Poisson variates belonging to different populations. Journal of the Royal Statistical Society. Series A 109(3): 296–296 . Smiatek and Heuer [2012] Smiatek, J. and A. Heuer. 2012. A statistical view on team handball results: home advantage, team fitness and prediction of match outcomes. arXiv preprint arXiv:1207.0700 . Tomy and Veena [2022] Tomy, L. and G. Veena. 2022. A retrospective study on Skellam and related distributions. Austrian Journal of Statistics 51(1): 102–111 . Van Eetvelde et al. [2023] Van Eetvelde, H., L.M. Hvattum, and C. Ley. 2023. The probabilistic final standing calculator: a fair stochastic tool to handle abruptly stopped football seasons. AStA Advances in Statistical Analysis 107(1-2): 251–269 . Volossovitch and Debanne [2021] Volossovitch, A. and T. Debanne. 2021. Home advantage in handball. Home Advantage in Sport: Causes and the Effect on Performance: 220–227 . Michels, R., M. Ötting, and D. Karlis. 2023. Extending the Dixon and Coles model: an application to women’s football data. arXiv preprint arXiv:2307.02139 . Michels et al. [2023] Michels, R., M. Ötting, and R. Langrock. 2023. Bettors’ reaction to match dynamics: Evidence from in-game betting. European Journal of Operational Research 310(3): 1118–1127 . Ntzoufras et al. [2021] Ntzoufras, I., V. Palaskas, and S. Drikos. 2021. Bayesian models for prediction of the set-difference in volleyball. IMA Journal of Management Mathematics 32(4): 491–518 . Ötting et al. [2024] Ötting, M., R. Michels, R. Langrock, and C. Deutscher. 2024. Demand for live betting: An analysis using state-space models. Applied Stochastic Models in Business and Industry . Pelechrinis and Winston [2021] Pelechrinis, K. and W. Winston. 2021. A Skellam regression model for quantifying positional value in soccer. Journal of Quantitative Analysis in Sports 17(3): 187–201 . Prieto et al. [2016] Prieto, J., M.Á. Gómez, A. Volossovitch, and J. Sampaio. 2016. Effects of team timeouts on the teams’ scoring performance in elite handball close games. Kinesiology 48(1.): 115–123 . Singh et al. [2023] Singh, A., P. Scarf, and R. Baker. 2023. A unified theory for bivariate scores in possessive ball-sports: The case of handball. European Journal of Operational Research 304(3): 1099–1112 . Skellam [1946] Skellam, J. 1946. The frequency distribution of the difference between two Poisson variates belonging to different populations. Journal of the Royal Statistical Society. Series A 109(3): 296–296 . Smiatek and Heuer [2012] Smiatek, J. and A. Heuer. 2012. A statistical view on team handball results: home advantage, team fitness and prediction of match outcomes. arXiv preprint arXiv:1207.0700 . Tomy and Veena [2022] Tomy, L. and G. Veena. 2022. A retrospective study on Skellam and related distributions. Austrian Journal of Statistics 51(1): 102–111 . Van Eetvelde et al. [2023] Van Eetvelde, H., L.M. Hvattum, and C. Ley. 2023. The probabilistic final standing calculator: a fair stochastic tool to handle abruptly stopped football seasons. AStA Advances in Statistical Analysis 107(1-2): 251–269 . Volossovitch and Debanne [2021] Volossovitch, A. and T. Debanne. 2021. Home advantage in handball. Home Advantage in Sport: Causes and the Effect on Performance: 220–227 . Michels, R., M. Ötting, and R. Langrock. 2023. Bettors’ reaction to match dynamics: Evidence from in-game betting. European Journal of Operational Research 310(3): 1118–1127 . Ntzoufras et al. [2021] Ntzoufras, I., V. Palaskas, and S. Drikos. 2021. Bayesian models for prediction of the set-difference in volleyball. IMA Journal of Management Mathematics 32(4): 491–518 . Ötting et al. [2024] Ötting, M., R. Michels, R. Langrock, and C. Deutscher. 2024. Demand for live betting: An analysis using state-space models. Applied Stochastic Models in Business and Industry . Pelechrinis and Winston [2021] Pelechrinis, K. and W. Winston. 2021. A Skellam regression model for quantifying positional value in soccer. Journal of Quantitative Analysis in Sports 17(3): 187–201 . Prieto et al. [2016] Prieto, J., M.Á. Gómez, A. Volossovitch, and J. Sampaio. 2016. Effects of team timeouts on the teams’ scoring performance in elite handball close games. Kinesiology 48(1.): 115–123 . Singh et al. [2023] Singh, A., P. Scarf, and R. Baker. 2023. A unified theory for bivariate scores in possessive ball-sports: The case of handball. European Journal of Operational Research 304(3): 1099–1112 . Skellam [1946] Skellam, J. 1946. The frequency distribution of the difference between two Poisson variates belonging to different populations. Journal of the Royal Statistical Society. Series A 109(3): 296–296 . Smiatek and Heuer [2012] Smiatek, J. and A. Heuer. 2012. A statistical view on team handball results: home advantage, team fitness and prediction of match outcomes. arXiv preprint arXiv:1207.0700 . Tomy and Veena [2022] Tomy, L. and G. Veena. 2022. A retrospective study on Skellam and related distributions. Austrian Journal of Statistics 51(1): 102–111 . Van Eetvelde et al. [2023] Van Eetvelde, H., L.M. Hvattum, and C. Ley. 2023. The probabilistic final standing calculator: a fair stochastic tool to handle abruptly stopped football seasons. AStA Advances in Statistical Analysis 107(1-2): 251–269 . Volossovitch and Debanne [2021] Volossovitch, A. and T. Debanne. 2021. Home advantage in handball. Home Advantage in Sport: Causes and the Effect on Performance: 220–227 . Ntzoufras, I., V. Palaskas, and S. Drikos. 2021. Bayesian models for prediction of the set-difference in volleyball. IMA Journal of Management Mathematics 32(4): 491–518 . Ötting et al. [2024] Ötting, M., R. Michels, R. Langrock, and C. Deutscher. 2024. Demand for live betting: An analysis using state-space models. Applied Stochastic Models in Business and Industry . Pelechrinis and Winston [2021] Pelechrinis, K. and W. Winston. 2021. A Skellam regression model for quantifying positional value in soccer. Journal of Quantitative Analysis in Sports 17(3): 187–201 . Prieto et al. [2016] Prieto, J., M.Á. Gómez, A. Volossovitch, and J. Sampaio. 2016. Effects of team timeouts on the teams’ scoring performance in elite handball close games. Kinesiology 48(1.): 115–123 . Singh et al. [2023] Singh, A., P. Scarf, and R. Baker. 2023. A unified theory for bivariate scores in possessive ball-sports: The case of handball. European Journal of Operational Research 304(3): 1099–1112 . Skellam [1946] Skellam, J. 1946. The frequency distribution of the difference between two Poisson variates belonging to different populations. Journal of the Royal Statistical Society. Series A 109(3): 296–296 . Smiatek and Heuer [2012] Smiatek, J. and A. Heuer. 2012. A statistical view on team handball results: home advantage, team fitness and prediction of match outcomes. arXiv preprint arXiv:1207.0700 . Tomy and Veena [2022] Tomy, L. and G. Veena. 2022. A retrospective study on Skellam and related distributions. Austrian Journal of Statistics 51(1): 102–111 . Van Eetvelde et al. [2023] Van Eetvelde, H., L.M. Hvattum, and C. Ley. 2023. The probabilistic final standing calculator: a fair stochastic tool to handle abruptly stopped football seasons. AStA Advances in Statistical Analysis 107(1-2): 251–269 . Volossovitch and Debanne [2021] Volossovitch, A. and T. Debanne. 2021. Home advantage in handball. Home Advantage in Sport: Causes and the Effect on Performance: 220–227 . Ötting, M., R. Michels, R. Langrock, and C. Deutscher. 2024. Demand for live betting: An analysis using state-space models. Applied Stochastic Models in Business and Industry . Pelechrinis and Winston [2021] Pelechrinis, K. and W. Winston. 2021. A Skellam regression model for quantifying positional value in soccer. Journal of Quantitative Analysis in Sports 17(3): 187–201 . Prieto et al. [2016] Prieto, J., M.Á. Gómez, A. Volossovitch, and J. Sampaio. 2016. Effects of team timeouts on the teams’ scoring performance in elite handball close games. Kinesiology 48(1.): 115–123 . Singh et al. [2023] Singh, A., P. Scarf, and R. Baker. 2023. A unified theory for bivariate scores in possessive ball-sports: The case of handball. European Journal of Operational Research 304(3): 1099–1112 . Skellam [1946] Skellam, J. 1946. The frequency distribution of the difference between two Poisson variates belonging to different populations. Journal of the Royal Statistical Society. Series A 109(3): 296–296 . Smiatek and Heuer [2012] Smiatek, J. and A. Heuer. 2012. A statistical view on team handball results: home advantage, team fitness and prediction of match outcomes. arXiv preprint arXiv:1207.0700 . Tomy and Veena [2022] Tomy, L. and G. Veena. 2022. A retrospective study on Skellam and related distributions. Austrian Journal of Statistics 51(1): 102–111 . Van Eetvelde et al. [2023] Van Eetvelde, H., L.M. Hvattum, and C. Ley. 2023. The probabilistic final standing calculator: a fair stochastic tool to handle abruptly stopped football seasons. AStA Advances in Statistical Analysis 107(1-2): 251–269 . Volossovitch and Debanne [2021] Volossovitch, A. and T. Debanne. 2021. Home advantage in handball. Home Advantage in Sport: Causes and the Effect on Performance: 220–227 . Pelechrinis, K. and W. Winston. 2021. A Skellam regression model for quantifying positional value in soccer. Journal of Quantitative Analysis in Sports 17(3): 187–201 . Prieto et al. [2016] Prieto, J., M.Á. Gómez, A. Volossovitch, and J. Sampaio. 2016. Effects of team timeouts on the teams’ scoring performance in elite handball close games. Kinesiology 48(1.): 115–123 . Singh et al. [2023] Singh, A., P. Scarf, and R. Baker. 2023. A unified theory for bivariate scores in possessive ball-sports: The case of handball. European Journal of Operational Research 304(3): 1099–1112 . Skellam [1946] Skellam, J. 1946. The frequency distribution of the difference between two Poisson variates belonging to different populations. Journal of the Royal Statistical Society. Series A 109(3): 296–296 . Smiatek and Heuer [2012] Smiatek, J. and A. Heuer. 2012. A statistical view on team handball results: home advantage, team fitness and prediction of match outcomes. arXiv preprint arXiv:1207.0700 . Tomy and Veena [2022] Tomy, L. and G. Veena. 2022. A retrospective study on Skellam and related distributions. Austrian Journal of Statistics 51(1): 102–111 . Van Eetvelde et al. [2023] Van Eetvelde, H., L.M. Hvattum, and C. Ley. 2023. The probabilistic final standing calculator: a fair stochastic tool to handle abruptly stopped football seasons. AStA Advances in Statistical Analysis 107(1-2): 251–269 . Volossovitch and Debanne [2021] Volossovitch, A. and T. Debanne. 2021. Home advantage in handball. Home Advantage in Sport: Causes and the Effect on Performance: 220–227 . Prieto, J., M.Á. Gómez, A. Volossovitch, and J. Sampaio. 2016. Effects of team timeouts on the teams’ scoring performance in elite handball close games. Kinesiology 48(1.): 115–123 . Singh et al. [2023] Singh, A., P. Scarf, and R. Baker. 2023. A unified theory for bivariate scores in possessive ball-sports: The case of handball. European Journal of Operational Research 304(3): 1099–1112 . Skellam [1946] Skellam, J. 1946. The frequency distribution of the difference between two Poisson variates belonging to different populations. Journal of the Royal Statistical Society. Series A 109(3): 296–296 . Smiatek and Heuer [2012] Smiatek, J. and A. Heuer. 2012. A statistical view on team handball results: home advantage, team fitness and prediction of match outcomes. arXiv preprint arXiv:1207.0700 . Tomy and Veena [2022] Tomy, L. and G. Veena. 2022. A retrospective study on Skellam and related distributions. Austrian Journal of Statistics 51(1): 102–111 . Van Eetvelde et al. [2023] Van Eetvelde, H., L.M. Hvattum, and C. Ley. 2023. The probabilistic final standing calculator: a fair stochastic tool to handle abruptly stopped football seasons. AStA Advances in Statistical Analysis 107(1-2): 251–269 . Volossovitch and Debanne [2021] Volossovitch, A. and T. Debanne. 2021. Home advantage in handball. Home Advantage in Sport: Causes and the Effect on Performance: 220–227 . Singh, A., P. Scarf, and R. Baker. 2023. A unified theory for bivariate scores in possessive ball-sports: The case of handball. European Journal of Operational Research 304(3): 1099–1112 . Skellam [1946] Skellam, J. 1946. The frequency distribution of the difference between two Poisson variates belonging to different populations. Journal of the Royal Statistical Society. Series A 109(3): 296–296 . Smiatek and Heuer [2012] Smiatek, J. and A. Heuer. 2012. A statistical view on team handball results: home advantage, team fitness and prediction of match outcomes. arXiv preprint arXiv:1207.0700 . Tomy and Veena [2022] Tomy, L. and G. Veena. 2022. A retrospective study on Skellam and related distributions. Austrian Journal of Statistics 51(1): 102–111 . Van Eetvelde et al. [2023] Van Eetvelde, H., L.M. Hvattum, and C. Ley. 2023. The probabilistic final standing calculator: a fair stochastic tool to handle abruptly stopped football seasons. AStA Advances in Statistical Analysis 107(1-2): 251–269 . Volossovitch and Debanne [2021] Volossovitch, A. and T. Debanne. 2021. Home advantage in handball. Home Advantage in Sport: Causes and the Effect on Performance: 220–227 . Skellam, J. 1946. The frequency distribution of the difference between two Poisson variates belonging to different populations. Journal of the Royal Statistical Society. Series A 109(3): 296–296 . Smiatek and Heuer [2012] Smiatek, J. and A. Heuer. 2012. A statistical view on team handball results: home advantage, team fitness and prediction of match outcomes. arXiv preprint arXiv:1207.0700 . Tomy and Veena [2022] Tomy, L. and G. Veena. 2022. A retrospective study on Skellam and related distributions. Austrian Journal of Statistics 51(1): 102–111 . Van Eetvelde et al. [2023] Van Eetvelde, H., L.M. Hvattum, and C. Ley. 2023. The probabilistic final standing calculator: a fair stochastic tool to handle abruptly stopped football seasons. AStA Advances in Statistical Analysis 107(1-2): 251–269 . Volossovitch and Debanne [2021] Volossovitch, A. and T. Debanne. 2021. Home advantage in handball. Home Advantage in Sport: Causes and the Effect on Performance: 220–227 . Smiatek, J. and A. Heuer. 2012. A statistical view on team handball results: home advantage, team fitness and prediction of match outcomes. arXiv preprint arXiv:1207.0700 . Tomy and Veena [2022] Tomy, L. and G. Veena. 2022. A retrospective study on Skellam and related distributions. Austrian Journal of Statistics 51(1): 102–111 . Van Eetvelde et al. [2023] Van Eetvelde, H., L.M. Hvattum, and C. Ley. 2023. The probabilistic final standing calculator: a fair stochastic tool to handle abruptly stopped football seasons. AStA Advances in Statistical Analysis 107(1-2): 251–269 . Volossovitch and Debanne [2021] Volossovitch, A. and T. Debanne. 2021. Home advantage in handball. Home Advantage in Sport: Causes and the Effect on Performance: 220–227 . Tomy, L. and G. Veena. 2022. A retrospective study on Skellam and related distributions. Austrian Journal of Statistics 51(1): 102–111 . Van Eetvelde et al. [2023] Van Eetvelde, H., L.M. Hvattum, and C. Ley. 2023. The probabilistic final standing calculator: a fair stochastic tool to handle abruptly stopped football seasons. AStA Advances in Statistical Analysis 107(1-2): 251–269 . Volossovitch and Debanne [2021] Volossovitch, A. and T. Debanne. 2021. Home advantage in handball. Home Advantage in Sport: Causes and the Effect on Performance: 220–227 . Van Eetvelde, H., L.M. Hvattum, and C. Ley. 2023. The probabilistic final standing calculator: a fair stochastic tool to handle abruptly stopped football seasons. AStA Advances in Statistical Analysis 107(1-2): 251–269 . Volossovitch and Debanne [2021] Volossovitch, A. and T. Debanne. 2021. Home advantage in handball. Home Advantage in Sport: Causes and the Effect on Performance: 220–227 . Volossovitch, A. and T. Debanne. 2021. Home advantage in handball. Home Advantage in Sport: Causes and the Effect on Performance: 220–227 .
- Intraday stochastic volatility in discrete price changes: the dynamic Skellam model. Journal of the American Statistical Association 112(520): 1490–1503 . Lago-Peñas et al. [2013] Lago-Peñas, C., M.A. Gomez, J. Viaño, and I. González-García. 2013. Home advantage in elite handball: the impact of the quality of opposition on team performance. International Journal of Performance Analysis in Sport 13(3): 724–733 . Maher [1982] Maher, M.J. 1982. Modelling association football scores. Statistica Neerlandica 36(3): 109–118 . McHale and Scarf [2007] McHale, I. and P. Scarf. 2007. Modelling soccer matches using bivariate discrete distributions with general dependence structure. Statistica Neerlandica 61(4): 432–445 . Michels et al. [2023] Michels, R., M. Ötting, and D. Karlis. 2023. Extending the Dixon and Coles model: an application to women’s football data. arXiv preprint arXiv:2307.02139 . Michels et al. [2023] Michels, R., M. Ötting, and R. Langrock. 2023. Bettors’ reaction to match dynamics: Evidence from in-game betting. European Journal of Operational Research 310(3): 1118–1127 . Ntzoufras et al. [2021] Ntzoufras, I., V. Palaskas, and S. Drikos. 2021. Bayesian models for prediction of the set-difference in volleyball. IMA Journal of Management Mathematics 32(4): 491–518 . Ötting et al. [2024] Ötting, M., R. Michels, R. Langrock, and C. Deutscher. 2024. Demand for live betting: An analysis using state-space models. Applied Stochastic Models in Business and Industry . Pelechrinis and Winston [2021] Pelechrinis, K. and W. Winston. 2021. A Skellam regression model for quantifying positional value in soccer. Journal of Quantitative Analysis in Sports 17(3): 187–201 . Prieto et al. [2016] Prieto, J., M.Á. Gómez, A. Volossovitch, and J. Sampaio. 2016. Effects of team timeouts on the teams’ scoring performance in elite handball close games. Kinesiology 48(1.): 115–123 . Singh et al. [2023] Singh, A., P. Scarf, and R. Baker. 2023. A unified theory for bivariate scores in possessive ball-sports: The case of handball. European Journal of Operational Research 304(3): 1099–1112 . Skellam [1946] Skellam, J. 1946. The frequency distribution of the difference between two Poisson variates belonging to different populations. Journal of the Royal Statistical Society. Series A 109(3): 296–296 . Smiatek and Heuer [2012] Smiatek, J. and A. Heuer. 2012. A statistical view on team handball results: home advantage, team fitness and prediction of match outcomes. arXiv preprint arXiv:1207.0700 . Tomy and Veena [2022] Tomy, L. and G. Veena. 2022. A retrospective study on Skellam and related distributions. Austrian Journal of Statistics 51(1): 102–111 . Van Eetvelde et al. [2023] Van Eetvelde, H., L.M. Hvattum, and C. Ley. 2023. The probabilistic final standing calculator: a fair stochastic tool to handle abruptly stopped football seasons. AStA Advances in Statistical Analysis 107(1-2): 251–269 . Volossovitch and Debanne [2021] Volossovitch, A. and T. Debanne. 2021. Home advantage in handball. Home Advantage in Sport: Causes and the Effect on Performance: 220–227 . Lago-Peñas, C., M.A. Gomez, J. Viaño, and I. González-García. 2013. Home advantage in elite handball: the impact of the quality of opposition on team performance. International Journal of Performance Analysis in Sport 13(3): 724–733 . Maher [1982] Maher, M.J. 1982. Modelling association football scores. Statistica Neerlandica 36(3): 109–118 . McHale and Scarf [2007] McHale, I. and P. Scarf. 2007. Modelling soccer matches using bivariate discrete distributions with general dependence structure. Statistica Neerlandica 61(4): 432–445 . Michels et al. [2023] Michels, R., M. Ötting, and D. Karlis. 2023. Extending the Dixon and Coles model: an application to women’s football data. arXiv preprint arXiv:2307.02139 . Michels et al. [2023] Michels, R., M. Ötting, and R. Langrock. 2023. Bettors’ reaction to match dynamics: Evidence from in-game betting. European Journal of Operational Research 310(3): 1118–1127 . Ntzoufras et al. [2021] Ntzoufras, I., V. Palaskas, and S. Drikos. 2021. Bayesian models for prediction of the set-difference in volleyball. IMA Journal of Management Mathematics 32(4): 491–518 . Ötting et al. [2024] Ötting, M., R. Michels, R. Langrock, and C. Deutscher. 2024. Demand for live betting: An analysis using state-space models. Applied Stochastic Models in Business and Industry . Pelechrinis and Winston [2021] Pelechrinis, K. and W. Winston. 2021. A Skellam regression model for quantifying positional value in soccer. Journal of Quantitative Analysis in Sports 17(3): 187–201 . Prieto et al. [2016] Prieto, J., M.Á. Gómez, A. Volossovitch, and J. Sampaio. 2016. Effects of team timeouts on the teams’ scoring performance in elite handball close games. Kinesiology 48(1.): 115–123 . Singh et al. [2023] Singh, A., P. Scarf, and R. Baker. 2023. A unified theory for bivariate scores in possessive ball-sports: The case of handball. European Journal of Operational Research 304(3): 1099–1112 . Skellam [1946] Skellam, J. 1946. The frequency distribution of the difference between two Poisson variates belonging to different populations. Journal of the Royal Statistical Society. Series A 109(3): 296–296 . Smiatek and Heuer [2012] Smiatek, J. and A. Heuer. 2012. A statistical view on team handball results: home advantage, team fitness and prediction of match outcomes. arXiv preprint arXiv:1207.0700 . Tomy and Veena [2022] Tomy, L. and G. Veena. 2022. A retrospective study on Skellam and related distributions. Austrian Journal of Statistics 51(1): 102–111 . Van Eetvelde et al. [2023] Van Eetvelde, H., L.M. Hvattum, and C. Ley. 2023. The probabilistic final standing calculator: a fair stochastic tool to handle abruptly stopped football seasons. AStA Advances in Statistical Analysis 107(1-2): 251–269 . Volossovitch and Debanne [2021] Volossovitch, A. and T. Debanne. 2021. Home advantage in handball. Home Advantage in Sport: Causes and the Effect on Performance: 220–227 . Maher, M.J. 1982. Modelling association football scores. Statistica Neerlandica 36(3): 109–118 . McHale and Scarf [2007] McHale, I. and P. Scarf. 2007. Modelling soccer matches using bivariate discrete distributions with general dependence structure. Statistica Neerlandica 61(4): 432–445 . Michels et al. [2023] Michels, R., M. Ötting, and D. Karlis. 2023. Extending the Dixon and Coles model: an application to women’s football data. arXiv preprint arXiv:2307.02139 . Michels et al. [2023] Michels, R., M. Ötting, and R. Langrock. 2023. Bettors’ reaction to match dynamics: Evidence from in-game betting. European Journal of Operational Research 310(3): 1118–1127 . Ntzoufras et al. [2021] Ntzoufras, I., V. Palaskas, and S. Drikos. 2021. Bayesian models for prediction of the set-difference in volleyball. IMA Journal of Management Mathematics 32(4): 491–518 . Ötting et al. [2024] Ötting, M., R. Michels, R. Langrock, and C. Deutscher. 2024. Demand for live betting: An analysis using state-space models. Applied Stochastic Models in Business and Industry . Pelechrinis and Winston [2021] Pelechrinis, K. and W. Winston. 2021. A Skellam regression model for quantifying positional value in soccer. Journal of Quantitative Analysis in Sports 17(3): 187–201 . Prieto et al. [2016] Prieto, J., M.Á. Gómez, A. Volossovitch, and J. Sampaio. 2016. Effects of team timeouts on the teams’ scoring performance in elite handball close games. Kinesiology 48(1.): 115–123 . Singh et al. [2023] Singh, A., P. Scarf, and R. Baker. 2023. A unified theory for bivariate scores in possessive ball-sports: The case of handball. European Journal of Operational Research 304(3): 1099–1112 . Skellam [1946] Skellam, J. 1946. The frequency distribution of the difference between two Poisson variates belonging to different populations. Journal of the Royal Statistical Society. Series A 109(3): 296–296 . Smiatek and Heuer [2012] Smiatek, J. and A. Heuer. 2012. A statistical view on team handball results: home advantage, team fitness and prediction of match outcomes. arXiv preprint arXiv:1207.0700 . Tomy and Veena [2022] Tomy, L. and G. Veena. 2022. A retrospective study on Skellam and related distributions. Austrian Journal of Statistics 51(1): 102–111 . Van Eetvelde et al. [2023] Van Eetvelde, H., L.M. Hvattum, and C. Ley. 2023. The probabilistic final standing calculator: a fair stochastic tool to handle abruptly stopped football seasons. AStA Advances in Statistical Analysis 107(1-2): 251–269 . Volossovitch and Debanne [2021] Volossovitch, A. and T. Debanne. 2021. Home advantage in handball. Home Advantage in Sport: Causes and the Effect on Performance: 220–227 . McHale, I. and P. Scarf. 2007. Modelling soccer matches using bivariate discrete distributions with general dependence structure. Statistica Neerlandica 61(4): 432–445 . Michels et al. [2023] Michels, R., M. Ötting, and D. Karlis. 2023. Extending the Dixon and Coles model: an application to women’s football data. arXiv preprint arXiv:2307.02139 . Michels et al. [2023] Michels, R., M. Ötting, and R. Langrock. 2023. Bettors’ reaction to match dynamics: Evidence from in-game betting. European Journal of Operational Research 310(3): 1118–1127 . Ntzoufras et al. [2021] Ntzoufras, I., V. Palaskas, and S. Drikos. 2021. Bayesian models for prediction of the set-difference in volleyball. IMA Journal of Management Mathematics 32(4): 491–518 . Ötting et al. [2024] Ötting, M., R. Michels, R. Langrock, and C. Deutscher. 2024. Demand for live betting: An analysis using state-space models. Applied Stochastic Models in Business and Industry . Pelechrinis and Winston [2021] Pelechrinis, K. and W. Winston. 2021. A Skellam regression model for quantifying positional value in soccer. Journal of Quantitative Analysis in Sports 17(3): 187–201 . Prieto et al. [2016] Prieto, J., M.Á. Gómez, A. Volossovitch, and J. Sampaio. 2016. Effects of team timeouts on the teams’ scoring performance in elite handball close games. Kinesiology 48(1.): 115–123 . Singh et al. [2023] Singh, A., P. Scarf, and R. Baker. 2023. A unified theory for bivariate scores in possessive ball-sports: The case of handball. European Journal of Operational Research 304(3): 1099–1112 . Skellam [1946] Skellam, J. 1946. The frequency distribution of the difference between two Poisson variates belonging to different populations. Journal of the Royal Statistical Society. Series A 109(3): 296–296 . Smiatek and Heuer [2012] Smiatek, J. and A. Heuer. 2012. A statistical view on team handball results: home advantage, team fitness and prediction of match outcomes. arXiv preprint arXiv:1207.0700 . Tomy and Veena [2022] Tomy, L. and G. Veena. 2022. A retrospective study on Skellam and related distributions. Austrian Journal of Statistics 51(1): 102–111 . Van Eetvelde et al. [2023] Van Eetvelde, H., L.M. Hvattum, and C. Ley. 2023. The probabilistic final standing calculator: a fair stochastic tool to handle abruptly stopped football seasons. AStA Advances in Statistical Analysis 107(1-2): 251–269 . Volossovitch and Debanne [2021] Volossovitch, A. and T. Debanne. 2021. Home advantage in handball. Home Advantage in Sport: Causes and the Effect on Performance: 220–227 . Michels, R., M. Ötting, and D. Karlis. 2023. Extending the Dixon and Coles model: an application to women’s football data. arXiv preprint arXiv:2307.02139 . Michels et al. [2023] Michels, R., M. Ötting, and R. Langrock. 2023. Bettors’ reaction to match dynamics: Evidence from in-game betting. European Journal of Operational Research 310(3): 1118–1127 . Ntzoufras et al. [2021] Ntzoufras, I., V. Palaskas, and S. Drikos. 2021. Bayesian models for prediction of the set-difference in volleyball. IMA Journal of Management Mathematics 32(4): 491–518 . Ötting et al. [2024] Ötting, M., R. Michels, R. Langrock, and C. Deutscher. 2024. Demand for live betting: An analysis using state-space models. Applied Stochastic Models in Business and Industry . Pelechrinis and Winston [2021] Pelechrinis, K. and W. Winston. 2021. A Skellam regression model for quantifying positional value in soccer. Journal of Quantitative Analysis in Sports 17(3): 187–201 . Prieto et al. [2016] Prieto, J., M.Á. Gómez, A. Volossovitch, and J. Sampaio. 2016. Effects of team timeouts on the teams’ scoring performance in elite handball close games. Kinesiology 48(1.): 115–123 . Singh et al. [2023] Singh, A., P. Scarf, and R. Baker. 2023. A unified theory for bivariate scores in possessive ball-sports: The case of handball. European Journal of Operational Research 304(3): 1099–1112 . Skellam [1946] Skellam, J. 1946. The frequency distribution of the difference between two Poisson variates belonging to different populations. Journal of the Royal Statistical Society. Series A 109(3): 296–296 . Smiatek and Heuer [2012] Smiatek, J. and A. Heuer. 2012. A statistical view on team handball results: home advantage, team fitness and prediction of match outcomes. arXiv preprint arXiv:1207.0700 . Tomy and Veena [2022] Tomy, L. and G. Veena. 2022. A retrospective study on Skellam and related distributions. Austrian Journal of Statistics 51(1): 102–111 . Van Eetvelde et al. [2023] Van Eetvelde, H., L.M. Hvattum, and C. Ley. 2023. The probabilistic final standing calculator: a fair stochastic tool to handle abruptly stopped football seasons. AStA Advances in Statistical Analysis 107(1-2): 251–269 . Volossovitch and Debanne [2021] Volossovitch, A. and T. Debanne. 2021. Home advantage in handball. Home Advantage in Sport: Causes and the Effect on Performance: 220–227 . Michels, R., M. Ötting, and R. Langrock. 2023. Bettors’ reaction to match dynamics: Evidence from in-game betting. European Journal of Operational Research 310(3): 1118–1127 . Ntzoufras et al. [2021] Ntzoufras, I., V. Palaskas, and S. Drikos. 2021. Bayesian models for prediction of the set-difference in volleyball. IMA Journal of Management Mathematics 32(4): 491–518 . Ötting et al. [2024] Ötting, M., R. Michels, R. Langrock, and C. Deutscher. 2024. Demand for live betting: An analysis using state-space models. Applied Stochastic Models in Business and Industry . Pelechrinis and Winston [2021] Pelechrinis, K. and W. Winston. 2021. A Skellam regression model for quantifying positional value in soccer. Journal of Quantitative Analysis in Sports 17(3): 187–201 . Prieto et al. [2016] Prieto, J., M.Á. Gómez, A. Volossovitch, and J. Sampaio. 2016. Effects of team timeouts on the teams’ scoring performance in elite handball close games. Kinesiology 48(1.): 115–123 . Singh et al. [2023] Singh, A., P. Scarf, and R. Baker. 2023. A unified theory for bivariate scores in possessive ball-sports: The case of handball. European Journal of Operational Research 304(3): 1099–1112 . Skellam [1946] Skellam, J. 1946. The frequency distribution of the difference between two Poisson variates belonging to different populations. Journal of the Royal Statistical Society. Series A 109(3): 296–296 . Smiatek and Heuer [2012] Smiatek, J. and A. Heuer. 2012. A statistical view on team handball results: home advantage, team fitness and prediction of match outcomes. arXiv preprint arXiv:1207.0700 . Tomy and Veena [2022] Tomy, L. and G. Veena. 2022. A retrospective study on Skellam and related distributions. Austrian Journal of Statistics 51(1): 102–111 . Van Eetvelde et al. [2023] Van Eetvelde, H., L.M. Hvattum, and C. Ley. 2023. The probabilistic final standing calculator: a fair stochastic tool to handle abruptly stopped football seasons. AStA Advances in Statistical Analysis 107(1-2): 251–269 . Volossovitch and Debanne [2021] Volossovitch, A. and T. Debanne. 2021. Home advantage in handball. Home Advantage in Sport: Causes and the Effect on Performance: 220–227 . Ntzoufras, I., V. Palaskas, and S. Drikos. 2021. Bayesian models for prediction of the set-difference in volleyball. IMA Journal of Management Mathematics 32(4): 491–518 . Ötting et al. [2024] Ötting, M., R. Michels, R. Langrock, and C. Deutscher. 2024. Demand for live betting: An analysis using state-space models. Applied Stochastic Models in Business and Industry . Pelechrinis and Winston [2021] Pelechrinis, K. and W. Winston. 2021. A Skellam regression model for quantifying positional value in soccer. Journal of Quantitative Analysis in Sports 17(3): 187–201 . Prieto et al. [2016] Prieto, J., M.Á. Gómez, A. Volossovitch, and J. Sampaio. 2016. Effects of team timeouts on the teams’ scoring performance in elite handball close games. Kinesiology 48(1.): 115–123 . Singh et al. [2023] Singh, A., P. Scarf, and R. Baker. 2023. A unified theory for bivariate scores in possessive ball-sports: The case of handball. European Journal of Operational Research 304(3): 1099–1112 . Skellam [1946] Skellam, J. 1946. The frequency distribution of the difference between two Poisson variates belonging to different populations. Journal of the Royal Statistical Society. Series A 109(3): 296–296 . Smiatek and Heuer [2012] Smiatek, J. and A. Heuer. 2012. A statistical view on team handball results: home advantage, team fitness and prediction of match outcomes. arXiv preprint arXiv:1207.0700 . Tomy and Veena [2022] Tomy, L. and G. Veena. 2022. A retrospective study on Skellam and related distributions. Austrian Journal of Statistics 51(1): 102–111 . Van Eetvelde et al. [2023] Van Eetvelde, H., L.M. Hvattum, and C. Ley. 2023. The probabilistic final standing calculator: a fair stochastic tool to handle abruptly stopped football seasons. AStA Advances in Statistical Analysis 107(1-2): 251–269 . Volossovitch and Debanne [2021] Volossovitch, A. and T. Debanne. 2021. Home advantage in handball. Home Advantage in Sport: Causes and the Effect on Performance: 220–227 . Ötting, M., R. Michels, R. Langrock, and C. Deutscher. 2024. Demand for live betting: An analysis using state-space models. Applied Stochastic Models in Business and Industry . Pelechrinis and Winston [2021] Pelechrinis, K. and W. Winston. 2021. A Skellam regression model for quantifying positional value in soccer. Journal of Quantitative Analysis in Sports 17(3): 187–201 . Prieto et al. [2016] Prieto, J., M.Á. Gómez, A. Volossovitch, and J. Sampaio. 2016. Effects of team timeouts on the teams’ scoring performance in elite handball close games. Kinesiology 48(1.): 115–123 . Singh et al. [2023] Singh, A., P. Scarf, and R. Baker. 2023. A unified theory for bivariate scores in possessive ball-sports: The case of handball. European Journal of Operational Research 304(3): 1099–1112 . Skellam [1946] Skellam, J. 1946. The frequency distribution of the difference between two Poisson variates belonging to different populations. Journal of the Royal Statistical Society. Series A 109(3): 296–296 . Smiatek and Heuer [2012] Smiatek, J. and A. Heuer. 2012. A statistical view on team handball results: home advantage, team fitness and prediction of match outcomes. arXiv preprint arXiv:1207.0700 . Tomy and Veena [2022] Tomy, L. and G. Veena. 2022. A retrospective study on Skellam and related distributions. Austrian Journal of Statistics 51(1): 102–111 . Van Eetvelde et al. [2023] Van Eetvelde, H., L.M. Hvattum, and C. Ley. 2023. The probabilistic final standing calculator: a fair stochastic tool to handle abruptly stopped football seasons. AStA Advances in Statistical Analysis 107(1-2): 251–269 . Volossovitch and Debanne [2021] Volossovitch, A. and T. Debanne. 2021. Home advantage in handball. Home Advantage in Sport: Causes and the Effect on Performance: 220–227 . Pelechrinis, K. and W. Winston. 2021. A Skellam regression model for quantifying positional value in soccer. Journal of Quantitative Analysis in Sports 17(3): 187–201 . Prieto et al. [2016] Prieto, J., M.Á. Gómez, A. Volossovitch, and J. Sampaio. 2016. Effects of team timeouts on the teams’ scoring performance in elite handball close games. Kinesiology 48(1.): 115–123 . Singh et al. [2023] Singh, A., P. Scarf, and R. Baker. 2023. A unified theory for bivariate scores in possessive ball-sports: The case of handball. European Journal of Operational Research 304(3): 1099–1112 . Skellam [1946] Skellam, J. 1946. The frequency distribution of the difference between two Poisson variates belonging to different populations. Journal of the Royal Statistical Society. Series A 109(3): 296–296 . Smiatek and Heuer [2012] Smiatek, J. and A. Heuer. 2012. A statistical view on team handball results: home advantage, team fitness and prediction of match outcomes. arXiv preprint arXiv:1207.0700 . Tomy and Veena [2022] Tomy, L. and G. Veena. 2022. A retrospective study on Skellam and related distributions. Austrian Journal of Statistics 51(1): 102–111 . Van Eetvelde et al. [2023] Van Eetvelde, H., L.M. Hvattum, and C. Ley. 2023. The probabilistic final standing calculator: a fair stochastic tool to handle abruptly stopped football seasons. AStA Advances in Statistical Analysis 107(1-2): 251–269 . Volossovitch and Debanne [2021] Volossovitch, A. and T. Debanne. 2021. Home advantage in handball. Home Advantage in Sport: Causes and the Effect on Performance: 220–227 . Prieto, J., M.Á. Gómez, A. Volossovitch, and J. Sampaio. 2016. Effects of team timeouts on the teams’ scoring performance in elite handball close games. Kinesiology 48(1.): 115–123 . Singh et al. [2023] Singh, A., P. Scarf, and R. Baker. 2023. A unified theory for bivariate scores in possessive ball-sports: The case of handball. European Journal of Operational Research 304(3): 1099–1112 . Skellam [1946] Skellam, J. 1946. The frequency distribution of the difference between two Poisson variates belonging to different populations. Journal of the Royal Statistical Society. Series A 109(3): 296–296 . Smiatek and Heuer [2012] Smiatek, J. and A. Heuer. 2012. A statistical view on team handball results: home advantage, team fitness and prediction of match outcomes. arXiv preprint arXiv:1207.0700 . Tomy and Veena [2022] Tomy, L. and G. Veena. 2022. A retrospective study on Skellam and related distributions. Austrian Journal of Statistics 51(1): 102–111 . Van Eetvelde et al. [2023] Van Eetvelde, H., L.M. Hvattum, and C. Ley. 2023. The probabilistic final standing calculator: a fair stochastic tool to handle abruptly stopped football seasons. AStA Advances in Statistical Analysis 107(1-2): 251–269 . Volossovitch and Debanne [2021] Volossovitch, A. and T. Debanne. 2021. Home advantage in handball. Home Advantage in Sport: Causes and the Effect on Performance: 220–227 . Singh, A., P. Scarf, and R. Baker. 2023. A unified theory for bivariate scores in possessive ball-sports: The case of handball. European Journal of Operational Research 304(3): 1099–1112 . Skellam [1946] Skellam, J. 1946. The frequency distribution of the difference between two Poisson variates belonging to different populations. Journal of the Royal Statistical Society. Series A 109(3): 296–296 . Smiatek and Heuer [2012] Smiatek, J. and A. Heuer. 2012. A statistical view on team handball results: home advantage, team fitness and prediction of match outcomes. arXiv preprint arXiv:1207.0700 . Tomy and Veena [2022] Tomy, L. and G. Veena. 2022. A retrospective study on Skellam and related distributions. Austrian Journal of Statistics 51(1): 102–111 . Van Eetvelde et al. [2023] Van Eetvelde, H., L.M. Hvattum, and C. Ley. 2023. The probabilistic final standing calculator: a fair stochastic tool to handle abruptly stopped football seasons. AStA Advances in Statistical Analysis 107(1-2): 251–269 . Volossovitch and Debanne [2021] Volossovitch, A. and T. Debanne. 2021. Home advantage in handball. Home Advantage in Sport: Causes and the Effect on Performance: 220–227 . Skellam, J. 1946. The frequency distribution of the difference between two Poisson variates belonging to different populations. Journal of the Royal Statistical Society. Series A 109(3): 296–296 . Smiatek and Heuer [2012] Smiatek, J. and A. Heuer. 2012. A statistical view on team handball results: home advantage, team fitness and prediction of match outcomes. arXiv preprint arXiv:1207.0700 . Tomy and Veena [2022] Tomy, L. and G. Veena. 2022. A retrospective study on Skellam and related distributions. Austrian Journal of Statistics 51(1): 102–111 . Van Eetvelde et al. [2023] Van Eetvelde, H., L.M. Hvattum, and C. Ley. 2023. The probabilistic final standing calculator: a fair stochastic tool to handle abruptly stopped football seasons. AStA Advances in Statistical Analysis 107(1-2): 251–269 . Volossovitch and Debanne [2021] Volossovitch, A. and T. Debanne. 2021. Home advantage in handball. Home Advantage in Sport: Causes and the Effect on Performance: 220–227 . Smiatek, J. and A. Heuer. 2012. A statistical view on team handball results: home advantage, team fitness and prediction of match outcomes. arXiv preprint arXiv:1207.0700 . Tomy and Veena [2022] Tomy, L. and G. Veena. 2022. A retrospective study on Skellam and related distributions. Austrian Journal of Statistics 51(1): 102–111 . Van Eetvelde et al. [2023] Van Eetvelde, H., L.M. Hvattum, and C. Ley. 2023. The probabilistic final standing calculator: a fair stochastic tool to handle abruptly stopped football seasons. AStA Advances in Statistical Analysis 107(1-2): 251–269 . Volossovitch and Debanne [2021] Volossovitch, A. and T. Debanne. 2021. Home advantage in handball. Home Advantage in Sport: Causes and the Effect on Performance: 220–227 . Tomy, L. and G. Veena. 2022. A retrospective study on Skellam and related distributions. Austrian Journal of Statistics 51(1): 102–111 . Van Eetvelde et al. [2023] Van Eetvelde, H., L.M. Hvattum, and C. Ley. 2023. The probabilistic final standing calculator: a fair stochastic tool to handle abruptly stopped football seasons. AStA Advances in Statistical Analysis 107(1-2): 251–269 . Volossovitch and Debanne [2021] Volossovitch, A. and T. Debanne. 2021. Home advantage in handball. Home Advantage in Sport: Causes and the Effect on Performance: 220–227 . Van Eetvelde, H., L.M. Hvattum, and C. Ley. 2023. The probabilistic final standing calculator: a fair stochastic tool to handle abruptly stopped football seasons. AStA Advances in Statistical Analysis 107(1-2): 251–269 . Volossovitch and Debanne [2021] Volossovitch, A. and T. Debanne. 2021. Home advantage in handball. Home Advantage in Sport: Causes and the Effect on Performance: 220–227 . Volossovitch, A. and T. Debanne. 2021. Home advantage in handball. Home Advantage in Sport: Causes and the Effect on Performance: 220–227 .
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The frequency distribution of the difference between two Poisson variates belonging to different populations. Journal of the Royal Statistical Society. Series A 109(3): 296–296 . Smiatek and Heuer [2012] Smiatek, J. and A. Heuer. 2012. A statistical view on team handball results: home advantage, team fitness and prediction of match outcomes. arXiv preprint arXiv:1207.0700 . Tomy and Veena [2022] Tomy, L. and G. Veena. 2022. A retrospective study on Skellam and related distributions. Austrian Journal of Statistics 51(1): 102–111 . Van Eetvelde et al. [2023] Van Eetvelde, H., L.M. Hvattum, and C. Ley. 2023. The probabilistic final standing calculator: a fair stochastic tool to handle abruptly stopped football seasons. AStA Advances in Statistical Analysis 107(1-2): 251–269 . Volossovitch and Debanne [2021] Volossovitch, A. and T. Debanne. 2021. Home advantage in handball. Home Advantage in Sport: Causes and the Effect on Performance: 220–227 . Maher, M.J. 1982. Modelling association football scores. Statistica Neerlandica 36(3): 109–118 . McHale and Scarf [2007] McHale, I. and P. Scarf. 2007. Modelling soccer matches using bivariate discrete distributions with general dependence structure. Statistica Neerlandica 61(4): 432–445 . Michels et al. [2023] Michels, R., M. Ötting, and D. Karlis. 2023. Extending the Dixon and Coles model: an application to women’s football data. arXiv preprint arXiv:2307.02139 . Michels et al. [2023] Michels, R., M. Ötting, and R. Langrock. 2023. Bettors’ reaction to match dynamics: Evidence from in-game betting. European Journal of Operational Research 310(3): 1118–1127 . Ntzoufras et al. [2021] Ntzoufras, I., V. Palaskas, and S. Drikos. 2021. Bayesian models for prediction of the set-difference in volleyball. IMA Journal of Management Mathematics 32(4): 491–518 . Ötting et al. [2024] Ötting, M., R. Michels, R. Langrock, and C. Deutscher. 2024. Demand for live betting: An analysis using state-space models. Applied Stochastic Models in Business and Industry . Pelechrinis and Winston [2021] Pelechrinis, K. and W. Winston. 2021. A Skellam regression model for quantifying positional value in soccer. Journal of Quantitative Analysis in Sports 17(3): 187–201 . Prieto et al. [2016] Prieto, J., M.Á. Gómez, A. Volossovitch, and J. Sampaio. 2016. Effects of team timeouts on the teams’ scoring performance in elite handball close games. Kinesiology 48(1.): 115–123 . Singh et al. [2023] Singh, A., P. Scarf, and R. Baker. 2023. A unified theory for bivariate scores in possessive ball-sports: The case of handball. European Journal of Operational Research 304(3): 1099–1112 . Skellam [1946] Skellam, J. 1946. The frequency distribution of the difference between two Poisson variates belonging to different populations. Journal of the Royal Statistical Society. Series A 109(3): 296–296 . Smiatek and Heuer [2012] Smiatek, J. and A. Heuer. 2012. A statistical view on team handball results: home advantage, team fitness and prediction of match outcomes. arXiv preprint arXiv:1207.0700 . Tomy and Veena [2022] Tomy, L. and G. Veena. 2022. A retrospective study on Skellam and related distributions. Austrian Journal of Statistics 51(1): 102–111 . Van Eetvelde et al. [2023] Van Eetvelde, H., L.M. Hvattum, and C. Ley. 2023. The probabilistic final standing calculator: a fair stochastic tool to handle abruptly stopped football seasons. AStA Advances in Statistical Analysis 107(1-2): 251–269 . Volossovitch and Debanne [2021] Volossovitch, A. and T. Debanne. 2021. Home advantage in handball. Home Advantage in Sport: Causes and the Effect on Performance: 220–227 . McHale, I. and P. Scarf. 2007. Modelling soccer matches using bivariate discrete distributions with general dependence structure. Statistica Neerlandica 61(4): 432–445 . Michels et al. [2023] Michels, R., M. Ötting, and D. Karlis. 2023. Extending the Dixon and Coles model: an application to women’s football data. arXiv preprint arXiv:2307.02139 . Michels et al. [2023] Michels, R., M. Ötting, and R. Langrock. 2023. Bettors’ reaction to match dynamics: Evidence from in-game betting. European Journal of Operational Research 310(3): 1118–1127 . Ntzoufras et al. [2021] Ntzoufras, I., V. Palaskas, and S. Drikos. 2021. Bayesian models for prediction of the set-difference in volleyball. IMA Journal of Management Mathematics 32(4): 491–518 . Ötting et al. [2024] Ötting, M., R. Michels, R. Langrock, and C. Deutscher. 2024. Demand for live betting: An analysis using state-space models. Applied Stochastic Models in Business and Industry . Pelechrinis and Winston [2021] Pelechrinis, K. and W. Winston. 2021. A Skellam regression model for quantifying positional value in soccer. Journal of Quantitative Analysis in Sports 17(3): 187–201 . Prieto et al. [2016] Prieto, J., M.Á. Gómez, A. Volossovitch, and J. Sampaio. 2016. Effects of team timeouts on the teams’ scoring performance in elite handball close games. Kinesiology 48(1.): 115–123 . Singh et al. [2023] Singh, A., P. Scarf, and R. Baker. 2023. A unified theory for bivariate scores in possessive ball-sports: The case of handball. European Journal of Operational Research 304(3): 1099–1112 . Skellam [1946] Skellam, J. 1946. The frequency distribution of the difference between two Poisson variates belonging to different populations. Journal of the Royal Statistical Society. Series A 109(3): 296–296 . Smiatek and Heuer [2012] Smiatek, J. and A. Heuer. 2012. A statistical view on team handball results: home advantage, team fitness and prediction of match outcomes. arXiv preprint arXiv:1207.0700 . Tomy and Veena [2022] Tomy, L. and G. Veena. 2022. A retrospective study on Skellam and related distributions. Austrian Journal of Statistics 51(1): 102–111 . Van Eetvelde et al. [2023] Van Eetvelde, H., L.M. Hvattum, and C. Ley. 2023. The probabilistic final standing calculator: a fair stochastic tool to handle abruptly stopped football seasons. AStA Advances in Statistical Analysis 107(1-2): 251–269 . Volossovitch and Debanne [2021] Volossovitch, A. and T. Debanne. 2021. Home advantage in handball. Home Advantage in Sport: Causes and the Effect on Performance: 220–227 . Michels, R., M. Ötting, and D. Karlis. 2023. Extending the Dixon and Coles model: an application to women’s football data. arXiv preprint arXiv:2307.02139 . Michels et al. [2023] Michels, R., M. Ötting, and R. Langrock. 2023. Bettors’ reaction to match dynamics: Evidence from in-game betting. European Journal of Operational Research 310(3): 1118–1127 . Ntzoufras et al. [2021] Ntzoufras, I., V. Palaskas, and S. Drikos. 2021. Bayesian models for prediction of the set-difference in volleyball. IMA Journal of Management Mathematics 32(4): 491–518 . Ötting et al. [2024] Ötting, M., R. Michels, R. Langrock, and C. Deutscher. 2024. Demand for live betting: An analysis using state-space models. Applied Stochastic Models in Business and Industry . Pelechrinis and Winston [2021] Pelechrinis, K. and W. Winston. 2021. A Skellam regression model for quantifying positional value in soccer. Journal of Quantitative Analysis in Sports 17(3): 187–201 . Prieto et al. [2016] Prieto, J., M.Á. Gómez, A. Volossovitch, and J. Sampaio. 2016. Effects of team timeouts on the teams’ scoring performance in elite handball close games. Kinesiology 48(1.): 115–123 . Singh et al. [2023] Singh, A., P. Scarf, and R. Baker. 2023. A unified theory for bivariate scores in possessive ball-sports: The case of handball. European Journal of Operational Research 304(3): 1099–1112 . Skellam [1946] Skellam, J. 1946. The frequency distribution of the difference between two Poisson variates belonging to different populations. Journal of the Royal Statistical Society. Series A 109(3): 296–296 . Smiatek and Heuer [2012] Smiatek, J. and A. Heuer. 2012. A statistical view on team handball results: home advantage, team fitness and prediction of match outcomes. arXiv preprint arXiv:1207.0700 . Tomy and Veena [2022] Tomy, L. and G. Veena. 2022. A retrospective study on Skellam and related distributions. Austrian Journal of Statistics 51(1): 102–111 . Van Eetvelde et al. [2023] Van Eetvelde, H., L.M. Hvattum, and C. Ley. 2023. The probabilistic final standing calculator: a fair stochastic tool to handle abruptly stopped football seasons. AStA Advances in Statistical Analysis 107(1-2): 251–269 . Volossovitch and Debanne [2021] Volossovitch, A. and T. Debanne. 2021. Home advantage in handball. Home Advantage in Sport: Causes and the Effect on Performance: 220–227 . Michels, R., M. Ötting, and R. Langrock. 2023. Bettors’ reaction to match dynamics: Evidence from in-game betting. European Journal of Operational Research 310(3): 1118–1127 . Ntzoufras et al. [2021] Ntzoufras, I., V. Palaskas, and S. Drikos. 2021. Bayesian models for prediction of the set-difference in volleyball. IMA Journal of Management Mathematics 32(4): 491–518 . Ötting et al. [2024] Ötting, M., R. Michels, R. Langrock, and C. Deutscher. 2024. Demand for live betting: An analysis using state-space models. Applied Stochastic Models in Business and Industry . Pelechrinis and Winston [2021] Pelechrinis, K. and W. Winston. 2021. A Skellam regression model for quantifying positional value in soccer. Journal of Quantitative Analysis in Sports 17(3): 187–201 . Prieto et al. [2016] Prieto, J., M.Á. Gómez, A. Volossovitch, and J. Sampaio. 2016. Effects of team timeouts on the teams’ scoring performance in elite handball close games. Kinesiology 48(1.): 115–123 . Singh et al. [2023] Singh, A., P. Scarf, and R. Baker. 2023. A unified theory for bivariate scores in possessive ball-sports: The case of handball. European Journal of Operational Research 304(3): 1099–1112 . Skellam [1946] Skellam, J. 1946. The frequency distribution of the difference between two Poisson variates belonging to different populations. Journal of the Royal Statistical Society. Series A 109(3): 296–296 . Smiatek and Heuer [2012] Smiatek, J. and A. Heuer. 2012. A statistical view on team handball results: home advantage, team fitness and prediction of match outcomes. arXiv preprint arXiv:1207.0700 . Tomy and Veena [2022] Tomy, L. and G. Veena. 2022. A retrospective study on Skellam and related distributions. Austrian Journal of Statistics 51(1): 102–111 . Van Eetvelde et al. [2023] Van Eetvelde, H., L.M. Hvattum, and C. Ley. 2023. The probabilistic final standing calculator: a fair stochastic tool to handle abruptly stopped football seasons. AStA Advances in Statistical Analysis 107(1-2): 251–269 . Volossovitch and Debanne [2021] Volossovitch, A. and T. Debanne. 2021. Home advantage in handball. Home Advantage in Sport: Causes and the Effect on Performance: 220–227 . Ntzoufras, I., V. Palaskas, and S. Drikos. 2021. Bayesian models for prediction of the set-difference in volleyball. IMA Journal of Management Mathematics 32(4): 491–518 . Ötting et al. [2024] Ötting, M., R. Michels, R. Langrock, and C. Deutscher. 2024. Demand for live betting: An analysis using state-space models. Applied Stochastic Models in Business and Industry . Pelechrinis and Winston [2021] Pelechrinis, K. and W. Winston. 2021. A Skellam regression model for quantifying positional value in soccer. Journal of Quantitative Analysis in Sports 17(3): 187–201 . Prieto et al. [2016] Prieto, J., M.Á. Gómez, A. Volossovitch, and J. Sampaio. 2016. Effects of team timeouts on the teams’ scoring performance in elite handball close games. Kinesiology 48(1.): 115–123 . Singh et al. [2023] Singh, A., P. Scarf, and R. Baker. 2023. A unified theory for bivariate scores in possessive ball-sports: The case of handball. European Journal of Operational Research 304(3): 1099–1112 . Skellam [1946] Skellam, J. 1946. The frequency distribution of the difference between two Poisson variates belonging to different populations. Journal of the Royal Statistical Society. Series A 109(3): 296–296 . Smiatek and Heuer [2012] Smiatek, J. and A. Heuer. 2012. A statistical view on team handball results: home advantage, team fitness and prediction of match outcomes. arXiv preprint arXiv:1207.0700 . Tomy and Veena [2022] Tomy, L. and G. Veena. 2022. A retrospective study on Skellam and related distributions. Austrian Journal of Statistics 51(1): 102–111 . Van Eetvelde et al. [2023] Van Eetvelde, H., L.M. Hvattum, and C. Ley. 2023. The probabilistic final standing calculator: a fair stochastic tool to handle abruptly stopped football seasons. AStA Advances in Statistical Analysis 107(1-2): 251–269 . Volossovitch and Debanne [2021] Volossovitch, A. and T. Debanne. 2021. Home advantage in handball. Home Advantage in Sport: Causes and the Effect on Performance: 220–227 . Ötting, M., R. Michels, R. Langrock, and C. Deutscher. 2024. Demand for live betting: An analysis using state-space models. Applied Stochastic Models in Business and Industry . Pelechrinis and Winston [2021] Pelechrinis, K. and W. Winston. 2021. A Skellam regression model for quantifying positional value in soccer. Journal of Quantitative Analysis in Sports 17(3): 187–201 . Prieto et al. [2016] Prieto, J., M.Á. Gómez, A. Volossovitch, and J. Sampaio. 2016. Effects of team timeouts on the teams’ scoring performance in elite handball close games. Kinesiology 48(1.): 115–123 . Singh et al. [2023] Singh, A., P. Scarf, and R. Baker. 2023. A unified theory for bivariate scores in possessive ball-sports: The case of handball. European Journal of Operational Research 304(3): 1099–1112 . Skellam [1946] Skellam, J. 1946. The frequency distribution of the difference between two Poisson variates belonging to different populations. Journal of the Royal Statistical Society. Series A 109(3): 296–296 . Smiatek and Heuer [2012] Smiatek, J. and A. Heuer. 2012. A statistical view on team handball results: home advantage, team fitness and prediction of match outcomes. arXiv preprint arXiv:1207.0700 . Tomy and Veena [2022] Tomy, L. and G. Veena. 2022. A retrospective study on Skellam and related distributions. Austrian Journal of Statistics 51(1): 102–111 . Van Eetvelde et al. [2023] Van Eetvelde, H., L.M. Hvattum, and C. Ley. 2023. The probabilistic final standing calculator: a fair stochastic tool to handle abruptly stopped football seasons. AStA Advances in Statistical Analysis 107(1-2): 251–269 . Volossovitch and Debanne [2021] Volossovitch, A. and T. Debanne. 2021. Home advantage in handball. Home Advantage in Sport: Causes and the Effect on Performance: 220–227 . Pelechrinis, K. and W. Winston. 2021. A Skellam regression model for quantifying positional value in soccer. Journal of Quantitative Analysis in Sports 17(3): 187–201 . Prieto et al. [2016] Prieto, J., M.Á. Gómez, A. Volossovitch, and J. Sampaio. 2016. Effects of team timeouts on the teams’ scoring performance in elite handball close games. Kinesiology 48(1.): 115–123 . Singh et al. [2023] Singh, A., P. Scarf, and R. Baker. 2023. A unified theory for bivariate scores in possessive ball-sports: The case of handball. European Journal of Operational Research 304(3): 1099–1112 . Skellam [1946] Skellam, J. 1946. The frequency distribution of the difference between two Poisson variates belonging to different populations. Journal of the Royal Statistical Society. Series A 109(3): 296–296 . Smiatek and Heuer [2012] Smiatek, J. and A. Heuer. 2012. A statistical view on team handball results: home advantage, team fitness and prediction of match outcomes. arXiv preprint arXiv:1207.0700 . Tomy and Veena [2022] Tomy, L. and G. Veena. 2022. A retrospective study on Skellam and related distributions. Austrian Journal of Statistics 51(1): 102–111 . Van Eetvelde et al. [2023] Van Eetvelde, H., L.M. Hvattum, and C. Ley. 2023. The probabilistic final standing calculator: a fair stochastic tool to handle abruptly stopped football seasons. AStA Advances in Statistical Analysis 107(1-2): 251–269 . Volossovitch and Debanne [2021] Volossovitch, A. and T. Debanne. 2021. Home advantage in handball. Home Advantage in Sport: Causes and the Effect on Performance: 220–227 . Prieto, J., M.Á. Gómez, A. Volossovitch, and J. Sampaio. 2016. Effects of team timeouts on the teams’ scoring performance in elite handball close games. Kinesiology 48(1.): 115–123 . Singh et al. [2023] Singh, A., P. Scarf, and R. Baker. 2023. A unified theory for bivariate scores in possessive ball-sports: The case of handball. European Journal of Operational Research 304(3): 1099–1112 . Skellam [1946] Skellam, J. 1946. The frequency distribution of the difference between two Poisson variates belonging to different populations. Journal of the Royal Statistical Society. Series A 109(3): 296–296 . Smiatek and Heuer [2012] Smiatek, J. and A. Heuer. 2012. A statistical view on team handball results: home advantage, team fitness and prediction of match outcomes. arXiv preprint arXiv:1207.0700 . Tomy and Veena [2022] Tomy, L. and G. Veena. 2022. A retrospective study on Skellam and related distributions. Austrian Journal of Statistics 51(1): 102–111 . Van Eetvelde et al. [2023] Van Eetvelde, H., L.M. Hvattum, and C. Ley. 2023. The probabilistic final standing calculator: a fair stochastic tool to handle abruptly stopped football seasons. AStA Advances in Statistical Analysis 107(1-2): 251–269 . Volossovitch and Debanne [2021] Volossovitch, A. and T. Debanne. 2021. Home advantage in handball. Home Advantage in Sport: Causes and the Effect on Performance: 220–227 . Singh, A., P. Scarf, and R. Baker. 2023. A unified theory for bivariate scores in possessive ball-sports: The case of handball. European Journal of Operational Research 304(3): 1099–1112 . Skellam [1946] Skellam, J. 1946. The frequency distribution of the difference between two Poisson variates belonging to different populations. Journal of the Royal Statistical Society. Series A 109(3): 296–296 . Smiatek and Heuer [2012] Smiatek, J. and A. Heuer. 2012. A statistical view on team handball results: home advantage, team fitness and prediction of match outcomes. arXiv preprint arXiv:1207.0700 . Tomy and Veena [2022] Tomy, L. and G. Veena. 2022. A retrospective study on Skellam and related distributions. Austrian Journal of Statistics 51(1): 102–111 . Van Eetvelde et al. [2023] Van Eetvelde, H., L.M. Hvattum, and C. Ley. 2023. The probabilistic final standing calculator: a fair stochastic tool to handle abruptly stopped football seasons. AStA Advances in Statistical Analysis 107(1-2): 251–269 . Volossovitch and Debanne [2021] Volossovitch, A. and T. Debanne. 2021. Home advantage in handball. Home Advantage in Sport: Causes and the Effect on Performance: 220–227 . Skellam, J. 1946. The frequency distribution of the difference between two Poisson variates belonging to different populations. Journal of the Royal Statistical Society. Series A 109(3): 296–296 . Smiatek and Heuer [2012] Smiatek, J. and A. Heuer. 2012. A statistical view on team handball results: home advantage, team fitness and prediction of match outcomes. arXiv preprint arXiv:1207.0700 . Tomy and Veena [2022] Tomy, L. and G. Veena. 2022. A retrospective study on Skellam and related distributions. Austrian Journal of Statistics 51(1): 102–111 . Van Eetvelde et al. [2023] Van Eetvelde, H., L.M. Hvattum, and C. Ley. 2023. The probabilistic final standing calculator: a fair stochastic tool to handle abruptly stopped football seasons. AStA Advances in Statistical Analysis 107(1-2): 251–269 . Volossovitch and Debanne [2021] Volossovitch, A. and T. Debanne. 2021. Home advantage in handball. Home Advantage in Sport: Causes and the Effect on Performance: 220–227 . Smiatek, J. and A. Heuer. 2012. A statistical view on team handball results: home advantage, team fitness and prediction of match outcomes. arXiv preprint arXiv:1207.0700 . Tomy and Veena [2022] Tomy, L. and G. Veena. 2022. A retrospective study on Skellam and related distributions. Austrian Journal of Statistics 51(1): 102–111 . Van Eetvelde et al. [2023] Van Eetvelde, H., L.M. Hvattum, and C. Ley. 2023. The probabilistic final standing calculator: a fair stochastic tool to handle abruptly stopped football seasons. AStA Advances in Statistical Analysis 107(1-2): 251–269 . Volossovitch and Debanne [2021] Volossovitch, A. and T. Debanne. 2021. Home advantage in handball. Home Advantage in Sport: Causes and the Effect on Performance: 220–227 . Tomy, L. and G. Veena. 2022. A retrospective study on Skellam and related distributions. Austrian Journal of Statistics 51(1): 102–111 . Van Eetvelde et al. [2023] Van Eetvelde, H., L.M. Hvattum, and C. Ley. 2023. The probabilistic final standing calculator: a fair stochastic tool to handle abruptly stopped football seasons. AStA Advances in Statistical Analysis 107(1-2): 251–269 . Volossovitch and Debanne [2021] Volossovitch, A. and T. Debanne. 2021. Home advantage in handball. Home Advantage in Sport: Causes and the Effect on Performance: 220–227 . Van Eetvelde, H., L.M. Hvattum, and C. Ley. 2023. The probabilistic final standing calculator: a fair stochastic tool to handle abruptly stopped football seasons. AStA Advances in Statistical Analysis 107(1-2): 251–269 . Volossovitch and Debanne [2021] Volossovitch, A. and T. Debanne. 2021. Home advantage in handball. Home Advantage in Sport: Causes and the Effect on Performance: 220–227 . Volossovitch, A. and T. Debanne. 2021. Home advantage in handball. Home Advantage in Sport: Causes and the Effect on Performance: 220–227 .
- Maher, M.J. 1982. Modelling association football scores. Statistica Neerlandica 36(3): 109–118 . McHale and Scarf [2007] McHale, I. and P. Scarf. 2007. Modelling soccer matches using bivariate discrete distributions with general dependence structure. Statistica Neerlandica 61(4): 432–445 . Michels et al. [2023] Michels, R., M. Ötting, and D. Karlis. 2023. Extending the Dixon and Coles model: an application to women’s football data. arXiv preprint arXiv:2307.02139 . Michels et al. [2023] Michels, R., M. Ötting, and R. Langrock. 2023. Bettors’ reaction to match dynamics: Evidence from in-game betting. European Journal of Operational Research 310(3): 1118–1127 . Ntzoufras et al. [2021] Ntzoufras, I., V. Palaskas, and S. Drikos. 2021. Bayesian models for prediction of the set-difference in volleyball. IMA Journal of Management Mathematics 32(4): 491–518 . Ötting et al. [2024] Ötting, M., R. Michels, R. Langrock, and C. Deutscher. 2024. Demand for live betting: An analysis using state-space models. Applied Stochastic Models in Business and Industry . Pelechrinis and Winston [2021] Pelechrinis, K. and W. Winston. 2021. A Skellam regression model for quantifying positional value in soccer. Journal of Quantitative Analysis in Sports 17(3): 187–201 . Prieto et al. [2016] Prieto, J., M.Á. Gómez, A. Volossovitch, and J. Sampaio. 2016. Effects of team timeouts on the teams’ scoring performance in elite handball close games. Kinesiology 48(1.): 115–123 . Singh et al. [2023] Singh, A., P. Scarf, and R. Baker. 2023. A unified theory for bivariate scores in possessive ball-sports: The case of handball. European Journal of Operational Research 304(3): 1099–1112 . Skellam [1946] Skellam, J. 1946. The frequency distribution of the difference between two Poisson variates belonging to different populations. Journal of the Royal Statistical Society. Series A 109(3): 296–296 . Smiatek and Heuer [2012] Smiatek, J. and A. Heuer. 2012. A statistical view on team handball results: home advantage, team fitness and prediction of match outcomes. arXiv preprint arXiv:1207.0700 . Tomy and Veena [2022] Tomy, L. and G. Veena. 2022. A retrospective study on Skellam and related distributions. Austrian Journal of Statistics 51(1): 102–111 . Van Eetvelde et al. [2023] Van Eetvelde, H., L.M. Hvattum, and C. Ley. 2023. The probabilistic final standing calculator: a fair stochastic tool to handle abruptly stopped football seasons. AStA Advances in Statistical Analysis 107(1-2): 251–269 . Volossovitch and Debanne [2021] Volossovitch, A. and T. Debanne. 2021. Home advantage in handball. Home Advantage in Sport: Causes and the Effect on Performance: 220–227 . McHale, I. and P. Scarf. 2007. Modelling soccer matches using bivariate discrete distributions with general dependence structure. Statistica Neerlandica 61(4): 432–445 . Michels et al. [2023] Michels, R., M. Ötting, and D. Karlis. 2023. Extending the Dixon and Coles model: an application to women’s football data. arXiv preprint arXiv:2307.02139 . Michels et al. [2023] Michels, R., M. Ötting, and R. Langrock. 2023. Bettors’ reaction to match dynamics: Evidence from in-game betting. European Journal of Operational Research 310(3): 1118–1127 . Ntzoufras et al. [2021] Ntzoufras, I., V. Palaskas, and S. Drikos. 2021. Bayesian models for prediction of the set-difference in volleyball. IMA Journal of Management Mathematics 32(4): 491–518 . Ötting et al. [2024] Ötting, M., R. Michels, R. Langrock, and C. Deutscher. 2024. Demand for live betting: An analysis using state-space models. Applied Stochastic Models in Business and Industry . Pelechrinis and Winston [2021] Pelechrinis, K. and W. Winston. 2021. A Skellam regression model for quantifying positional value in soccer. Journal of Quantitative Analysis in Sports 17(3): 187–201 . Prieto et al. [2016] Prieto, J., M.Á. Gómez, A. Volossovitch, and J. Sampaio. 2016. Effects of team timeouts on the teams’ scoring performance in elite handball close games. Kinesiology 48(1.): 115–123 . Singh et al. [2023] Singh, A., P. Scarf, and R. Baker. 2023. A unified theory for bivariate scores in possessive ball-sports: The case of handball. European Journal of Operational Research 304(3): 1099–1112 . Skellam [1946] Skellam, J. 1946. The frequency distribution of the difference between two Poisson variates belonging to different populations. Journal of the Royal Statistical Society. Series A 109(3): 296–296 . Smiatek and Heuer [2012] Smiatek, J. and A. Heuer. 2012. A statistical view on team handball results: home advantage, team fitness and prediction of match outcomes. arXiv preprint arXiv:1207.0700 . Tomy and Veena [2022] Tomy, L. and G. Veena. 2022. A retrospective study on Skellam and related distributions. Austrian Journal of Statistics 51(1): 102–111 . Van Eetvelde et al. [2023] Van Eetvelde, H., L.M. Hvattum, and C. Ley. 2023. The probabilistic final standing calculator: a fair stochastic tool to handle abruptly stopped football seasons. AStA Advances in Statistical Analysis 107(1-2): 251–269 . Volossovitch and Debanne [2021] Volossovitch, A. and T. Debanne. 2021. Home advantage in handball. Home Advantage in Sport: Causes and the Effect on Performance: 220–227 . Michels, R., M. Ötting, and D. Karlis. 2023. Extending the Dixon and Coles model: an application to women’s football data. arXiv preprint arXiv:2307.02139 . Michels et al. [2023] Michels, R., M. Ötting, and R. Langrock. 2023. Bettors’ reaction to match dynamics: Evidence from in-game betting. European Journal of Operational Research 310(3): 1118–1127 . Ntzoufras et al. [2021] Ntzoufras, I., V. Palaskas, and S. Drikos. 2021. Bayesian models for prediction of the set-difference in volleyball. IMA Journal of Management Mathematics 32(4): 491–518 . Ötting et al. [2024] Ötting, M., R. Michels, R. Langrock, and C. Deutscher. 2024. Demand for live betting: An analysis using state-space models. Applied Stochastic Models in Business and Industry . Pelechrinis and Winston [2021] Pelechrinis, K. and W. Winston. 2021. A Skellam regression model for quantifying positional value in soccer. Journal of Quantitative Analysis in Sports 17(3): 187–201 . Prieto et al. [2016] Prieto, J., M.Á. Gómez, A. Volossovitch, and J. Sampaio. 2016. Effects of team timeouts on the teams’ scoring performance in elite handball close games. Kinesiology 48(1.): 115–123 . Singh et al. [2023] Singh, A., P. Scarf, and R. Baker. 2023. A unified theory for bivariate scores in possessive ball-sports: The case of handball. European Journal of Operational Research 304(3): 1099–1112 . Skellam [1946] Skellam, J. 1946. The frequency distribution of the difference between two Poisson variates belonging to different populations. Journal of the Royal Statistical Society. Series A 109(3): 296–296 . Smiatek and Heuer [2012] Smiatek, J. and A. Heuer. 2012. A statistical view on team handball results: home advantage, team fitness and prediction of match outcomes. arXiv preprint arXiv:1207.0700 . Tomy and Veena [2022] Tomy, L. and G. Veena. 2022. A retrospective study on Skellam and related distributions. Austrian Journal of Statistics 51(1): 102–111 . Van Eetvelde et al. [2023] Van Eetvelde, H., L.M. Hvattum, and C. Ley. 2023. The probabilistic final standing calculator: a fair stochastic tool to handle abruptly stopped football seasons. AStA Advances in Statistical Analysis 107(1-2): 251–269 . Volossovitch and Debanne [2021] Volossovitch, A. and T. Debanne. 2021. Home advantage in handball. Home Advantage in Sport: Causes and the Effect on Performance: 220–227 . Michels, R., M. Ötting, and R. Langrock. 2023. Bettors’ reaction to match dynamics: Evidence from in-game betting. European Journal of Operational Research 310(3): 1118–1127 . Ntzoufras et al. [2021] Ntzoufras, I., V. Palaskas, and S. Drikos. 2021. Bayesian models for prediction of the set-difference in volleyball. IMA Journal of Management Mathematics 32(4): 491–518 . Ötting et al. [2024] Ötting, M., R. Michels, R. Langrock, and C. Deutscher. 2024. Demand for live betting: An analysis using state-space models. Applied Stochastic Models in Business and Industry . Pelechrinis and Winston [2021] Pelechrinis, K. and W. Winston. 2021. A Skellam regression model for quantifying positional value in soccer. Journal of Quantitative Analysis in Sports 17(3): 187–201 . Prieto et al. [2016] Prieto, J., M.Á. Gómez, A. Volossovitch, and J. Sampaio. 2016. Effects of team timeouts on the teams’ scoring performance in elite handball close games. Kinesiology 48(1.): 115–123 . Singh et al. [2023] Singh, A., P. Scarf, and R. Baker. 2023. A unified theory for bivariate scores in possessive ball-sports: The case of handball. European Journal of Operational Research 304(3): 1099–1112 . Skellam [1946] Skellam, J. 1946. The frequency distribution of the difference between two Poisson variates belonging to different populations. Journal of the Royal Statistical Society. Series A 109(3): 296–296 . Smiatek and Heuer [2012] Smiatek, J. and A. Heuer. 2012. A statistical view on team handball results: home advantage, team fitness and prediction of match outcomes. arXiv preprint arXiv:1207.0700 . Tomy and Veena [2022] Tomy, L. and G. Veena. 2022. A retrospective study on Skellam and related distributions. Austrian Journal of Statistics 51(1): 102–111 . Van Eetvelde et al. [2023] Van Eetvelde, H., L.M. Hvattum, and C. Ley. 2023. The probabilistic final standing calculator: a fair stochastic tool to handle abruptly stopped football seasons. AStA Advances in Statistical Analysis 107(1-2): 251–269 . Volossovitch and Debanne [2021] Volossovitch, A. and T. Debanne. 2021. Home advantage in handball. Home Advantage in Sport: Causes and the Effect on Performance: 220–227 . Ntzoufras, I., V. Palaskas, and S. Drikos. 2021. Bayesian models for prediction of the set-difference in volleyball. IMA Journal of Management Mathematics 32(4): 491–518 . Ötting et al. [2024] Ötting, M., R. Michels, R. Langrock, and C. Deutscher. 2024. Demand for live betting: An analysis using state-space models. Applied Stochastic Models in Business and Industry . Pelechrinis and Winston [2021] Pelechrinis, K. and W. Winston. 2021. A Skellam regression model for quantifying positional value in soccer. Journal of Quantitative Analysis in Sports 17(3): 187–201 . Prieto et al. [2016] Prieto, J., M.Á. Gómez, A. Volossovitch, and J. Sampaio. 2016. Effects of team timeouts on the teams’ scoring performance in elite handball close games. Kinesiology 48(1.): 115–123 . Singh et al. [2023] Singh, A., P. Scarf, and R. Baker. 2023. A unified theory for bivariate scores in possessive ball-sports: The case of handball. European Journal of Operational Research 304(3): 1099–1112 . Skellam [1946] Skellam, J. 1946. The frequency distribution of the difference between two Poisson variates belonging to different populations. Journal of the Royal Statistical Society. Series A 109(3): 296–296 . Smiatek and Heuer [2012] Smiatek, J. and A. Heuer. 2012. A statistical view on team handball results: home advantage, team fitness and prediction of match outcomes. arXiv preprint arXiv:1207.0700 . Tomy and Veena [2022] Tomy, L. and G. Veena. 2022. A retrospective study on Skellam and related distributions. Austrian Journal of Statistics 51(1): 102–111 . Van Eetvelde et al. [2023] Van Eetvelde, H., L.M. Hvattum, and C. Ley. 2023. The probabilistic final standing calculator: a fair stochastic tool to handle abruptly stopped football seasons. AStA Advances in Statistical Analysis 107(1-2): 251–269 . Volossovitch and Debanne [2021] Volossovitch, A. and T. Debanne. 2021. Home advantage in handball. Home Advantage in Sport: Causes and the Effect on Performance: 220–227 . Ötting, M., R. Michels, R. Langrock, and C. Deutscher. 2024. Demand for live betting: An analysis using state-space models. Applied Stochastic Models in Business and Industry . Pelechrinis and Winston [2021] Pelechrinis, K. and W. Winston. 2021. A Skellam regression model for quantifying positional value in soccer. Journal of Quantitative Analysis in Sports 17(3): 187–201 . Prieto et al. [2016] Prieto, J., M.Á. Gómez, A. Volossovitch, and J. Sampaio. 2016. Effects of team timeouts on the teams’ scoring performance in elite handball close games. Kinesiology 48(1.): 115–123 . Singh et al. [2023] Singh, A., P. Scarf, and R. Baker. 2023. A unified theory for bivariate scores in possessive ball-sports: The case of handball. European Journal of Operational Research 304(3): 1099–1112 . Skellam [1946] Skellam, J. 1946. The frequency distribution of the difference between two Poisson variates belonging to different populations. Journal of the Royal Statistical Society. Series A 109(3): 296–296 . Smiatek and Heuer [2012] Smiatek, J. and A. Heuer. 2012. A statistical view on team handball results: home advantage, team fitness and prediction of match outcomes. arXiv preprint arXiv:1207.0700 . Tomy and Veena [2022] Tomy, L. and G. Veena. 2022. A retrospective study on Skellam and related distributions. Austrian Journal of Statistics 51(1): 102–111 . Van Eetvelde et al. [2023] Van Eetvelde, H., L.M. Hvattum, and C. Ley. 2023. The probabilistic final standing calculator: a fair stochastic tool to handle abruptly stopped football seasons. AStA Advances in Statistical Analysis 107(1-2): 251–269 . Volossovitch and Debanne [2021] Volossovitch, A. and T. Debanne. 2021. Home advantage in handball. Home Advantage in Sport: Causes and the Effect on Performance: 220–227 . Pelechrinis, K. and W. Winston. 2021. A Skellam regression model for quantifying positional value in soccer. Journal of Quantitative Analysis in Sports 17(3): 187–201 . Prieto et al. [2016] Prieto, J., M.Á. Gómez, A. Volossovitch, and J. Sampaio. 2016. Effects of team timeouts on the teams’ scoring performance in elite handball close games. Kinesiology 48(1.): 115–123 . Singh et al. [2023] Singh, A., P. Scarf, and R. Baker. 2023. A unified theory for bivariate scores in possessive ball-sports: The case of handball. European Journal of Operational Research 304(3): 1099–1112 . Skellam [1946] Skellam, J. 1946. The frequency distribution of the difference between two Poisson variates belonging to different populations. Journal of the Royal Statistical Society. Series A 109(3): 296–296 . Smiatek and Heuer [2012] Smiatek, J. and A. Heuer. 2012. A statistical view on team handball results: home advantage, team fitness and prediction of match outcomes. arXiv preprint arXiv:1207.0700 . Tomy and Veena [2022] Tomy, L. and G. Veena. 2022. A retrospective study on Skellam and related distributions. Austrian Journal of Statistics 51(1): 102–111 . Van Eetvelde et al. [2023] Van Eetvelde, H., L.M. Hvattum, and C. Ley. 2023. The probabilistic final standing calculator: a fair stochastic tool to handle abruptly stopped football seasons. AStA Advances in Statistical Analysis 107(1-2): 251–269 . Volossovitch and Debanne [2021] Volossovitch, A. and T. Debanne. 2021. Home advantage in handball. Home Advantage in Sport: Causes and the Effect on Performance: 220–227 . Prieto, J., M.Á. Gómez, A. Volossovitch, and J. Sampaio. 2016. Effects of team timeouts on the teams’ scoring performance in elite handball close games. Kinesiology 48(1.): 115–123 . Singh et al. [2023] Singh, A., P. Scarf, and R. Baker. 2023. A unified theory for bivariate scores in possessive ball-sports: The case of handball. European Journal of Operational Research 304(3): 1099–1112 . Skellam [1946] Skellam, J. 1946. The frequency distribution of the difference between two Poisson variates belonging to different populations. Journal of the Royal Statistical Society. Series A 109(3): 296–296 . Smiatek and Heuer [2012] Smiatek, J. and A. Heuer. 2012. A statistical view on team handball results: home advantage, team fitness and prediction of match outcomes. arXiv preprint arXiv:1207.0700 . Tomy and Veena [2022] Tomy, L. and G. Veena. 2022. A retrospective study on Skellam and related distributions. Austrian Journal of Statistics 51(1): 102–111 . Van Eetvelde et al. [2023] Van Eetvelde, H., L.M. Hvattum, and C. Ley. 2023. The probabilistic final standing calculator: a fair stochastic tool to handle abruptly stopped football seasons. AStA Advances in Statistical Analysis 107(1-2): 251–269 . Volossovitch and Debanne [2021] Volossovitch, A. and T. Debanne. 2021. Home advantage in handball. Home Advantage in Sport: Causes and the Effect on Performance: 220–227 . Singh, A., P. Scarf, and R. Baker. 2023. A unified theory for bivariate scores in possessive ball-sports: The case of handball. European Journal of Operational Research 304(3): 1099–1112 . Skellam [1946] Skellam, J. 1946. The frequency distribution of the difference between two Poisson variates belonging to different populations. Journal of the Royal Statistical Society. Series A 109(3): 296–296 . Smiatek and Heuer [2012] Smiatek, J. and A. Heuer. 2012. A statistical view on team handball results: home advantage, team fitness and prediction of match outcomes. arXiv preprint arXiv:1207.0700 . Tomy and Veena [2022] Tomy, L. and G. Veena. 2022. A retrospective study on Skellam and related distributions. Austrian Journal of Statistics 51(1): 102–111 . Van Eetvelde et al. [2023] Van Eetvelde, H., L.M. Hvattum, and C. Ley. 2023. The probabilistic final standing calculator: a fair stochastic tool to handle abruptly stopped football seasons. AStA Advances in Statistical Analysis 107(1-2): 251–269 . Volossovitch and Debanne [2021] Volossovitch, A. and T. Debanne. 2021. Home advantage in handball. Home Advantage in Sport: Causes and the Effect on Performance: 220–227 . Skellam, J. 1946. The frequency distribution of the difference between two Poisson variates belonging to different populations. Journal of the Royal Statistical Society. Series A 109(3): 296–296 . Smiatek and Heuer [2012] Smiatek, J. and A. Heuer. 2012. A statistical view on team handball results: home advantage, team fitness and prediction of match outcomes. arXiv preprint arXiv:1207.0700 . Tomy and Veena [2022] Tomy, L. and G. Veena. 2022. A retrospective study on Skellam and related distributions. Austrian Journal of Statistics 51(1): 102–111 . Van Eetvelde et al. [2023] Van Eetvelde, H., L.M. Hvattum, and C. Ley. 2023. The probabilistic final standing calculator: a fair stochastic tool to handle abruptly stopped football seasons. AStA Advances in Statistical Analysis 107(1-2): 251–269 . Volossovitch and Debanne [2021] Volossovitch, A. and T. Debanne. 2021. Home advantage in handball. Home Advantage in Sport: Causes and the Effect on Performance: 220–227 . Smiatek, J. and A. Heuer. 2012. A statistical view on team handball results: home advantage, team fitness and prediction of match outcomes. arXiv preprint arXiv:1207.0700 . Tomy and Veena [2022] Tomy, L. and G. Veena. 2022. A retrospective study on Skellam and related distributions. Austrian Journal of Statistics 51(1): 102–111 . Van Eetvelde et al. [2023] Van Eetvelde, H., L.M. Hvattum, and C. Ley. 2023. The probabilistic final standing calculator: a fair stochastic tool to handle abruptly stopped football seasons. AStA Advances in Statistical Analysis 107(1-2): 251–269 . Volossovitch and Debanne [2021] Volossovitch, A. and T. Debanne. 2021. Home advantage in handball. Home Advantage in Sport: Causes and the Effect on Performance: 220–227 . Tomy, L. and G. Veena. 2022. A retrospective study on Skellam and related distributions. Austrian Journal of Statistics 51(1): 102–111 . Van Eetvelde et al. [2023] Van Eetvelde, H., L.M. Hvattum, and C. Ley. 2023. The probabilistic final standing calculator: a fair stochastic tool to handle abruptly stopped football seasons. AStA Advances in Statistical Analysis 107(1-2): 251–269 . Volossovitch and Debanne [2021] Volossovitch, A. and T. Debanne. 2021. Home advantage in handball. Home Advantage in Sport: Causes and the Effect on Performance: 220–227 . Van Eetvelde, H., L.M. Hvattum, and C. Ley. 2023. The probabilistic final standing calculator: a fair stochastic tool to handle abruptly stopped football seasons. AStA Advances in Statistical Analysis 107(1-2): 251–269 . Volossovitch and Debanne [2021] Volossovitch, A. and T. Debanne. 2021. Home advantage in handball. Home Advantage in Sport: Causes and the Effect on Performance: 220–227 . Volossovitch, A. and T. Debanne. 2021. Home advantage in handball. Home Advantage in Sport: Causes and the Effect on Performance: 220–227 .
- Modelling soccer matches using bivariate discrete distributions with general dependence structure. Statistica Neerlandica 61(4): 432–445 . Michels et al. [2023] Michels, R., M. Ötting, and D. Karlis. 2023. Extending the Dixon and Coles model: an application to women’s football data. arXiv preprint arXiv:2307.02139 . Michels et al. [2023] Michels, R., M. Ötting, and R. Langrock. 2023. Bettors’ reaction to match dynamics: Evidence from in-game betting. European Journal of Operational Research 310(3): 1118–1127 . Ntzoufras et al. [2021] Ntzoufras, I., V. Palaskas, and S. Drikos. 2021. Bayesian models for prediction of the set-difference in volleyball. IMA Journal of Management Mathematics 32(4): 491–518 . Ötting et al. [2024] Ötting, M., R. Michels, R. Langrock, and C. Deutscher. 2024. Demand for live betting: An analysis using state-space models. Applied Stochastic Models in Business and Industry . Pelechrinis and Winston [2021] Pelechrinis, K. and W. Winston. 2021. A Skellam regression model for quantifying positional value in soccer. Journal of Quantitative Analysis in Sports 17(3): 187–201 . Prieto et al. [2016] Prieto, J., M.Á. Gómez, A. Volossovitch, and J. Sampaio. 2016. Effects of team timeouts on the teams’ scoring performance in elite handball close games. Kinesiology 48(1.): 115–123 . Singh et al. [2023] Singh, A., P. Scarf, and R. Baker. 2023. A unified theory for bivariate scores in possessive ball-sports: The case of handball. European Journal of Operational Research 304(3): 1099–1112 . Skellam [1946] Skellam, J. 1946. The frequency distribution of the difference between two Poisson variates belonging to different populations. Journal of the Royal Statistical Society. Series A 109(3): 296–296 . Smiatek and Heuer [2012] Smiatek, J. and A. Heuer. 2012. A statistical view on team handball results: home advantage, team fitness and prediction of match outcomes. arXiv preprint arXiv:1207.0700 . Tomy and Veena [2022] Tomy, L. and G. Veena. 2022. A retrospective study on Skellam and related distributions. Austrian Journal of Statistics 51(1): 102–111 . Van Eetvelde et al. [2023] Van Eetvelde, H., L.M. Hvattum, and C. Ley. 2023. The probabilistic final standing calculator: a fair stochastic tool to handle abruptly stopped football seasons. AStA Advances in Statistical Analysis 107(1-2): 251–269 . Volossovitch and Debanne [2021] Volossovitch, A. and T. Debanne. 2021. Home advantage in handball. Home Advantage in Sport: Causes and the Effect on Performance: 220–227 . Michels, R., M. Ötting, and D. Karlis. 2023. Extending the Dixon and Coles model: an application to women’s football data. arXiv preprint arXiv:2307.02139 . Michels et al. [2023] Michels, R., M. Ötting, and R. Langrock. 2023. Bettors’ reaction to match dynamics: Evidence from in-game betting. European Journal of Operational Research 310(3): 1118–1127 . Ntzoufras et al. [2021] Ntzoufras, I., V. Palaskas, and S. Drikos. 2021. Bayesian models for prediction of the set-difference in volleyball. IMA Journal of Management Mathematics 32(4): 491–518 . Ötting et al. [2024] Ötting, M., R. Michels, R. Langrock, and C. Deutscher. 2024. Demand for live betting: An analysis using state-space models. Applied Stochastic Models in Business and Industry . Pelechrinis and Winston [2021] Pelechrinis, K. and W. Winston. 2021. A Skellam regression model for quantifying positional value in soccer. Journal of Quantitative Analysis in Sports 17(3): 187–201 . Prieto et al. [2016] Prieto, J., M.Á. Gómez, A. Volossovitch, and J. Sampaio. 2016. Effects of team timeouts on the teams’ scoring performance in elite handball close games. Kinesiology 48(1.): 115–123 . Singh et al. [2023] Singh, A., P. Scarf, and R. Baker. 2023. A unified theory for bivariate scores in possessive ball-sports: The case of handball. European Journal of Operational Research 304(3): 1099–1112 . Skellam [1946] Skellam, J. 1946. The frequency distribution of the difference between two Poisson variates belonging to different populations. Journal of the Royal Statistical Society. Series A 109(3): 296–296 . Smiatek and Heuer [2012] Smiatek, J. and A. Heuer. 2012. A statistical view on team handball results: home advantage, team fitness and prediction of match outcomes. arXiv preprint arXiv:1207.0700 . Tomy and Veena [2022] Tomy, L. and G. Veena. 2022. A retrospective study on Skellam and related distributions. Austrian Journal of Statistics 51(1): 102–111 . Van Eetvelde et al. [2023] Van Eetvelde, H., L.M. Hvattum, and C. Ley. 2023. The probabilistic final standing calculator: a fair stochastic tool to handle abruptly stopped football seasons. AStA Advances in Statistical Analysis 107(1-2): 251–269 . Volossovitch and Debanne [2021] Volossovitch, A. and T. Debanne. 2021. Home advantage in handball. Home Advantage in Sport: Causes and the Effect on Performance: 220–227 . Michels, R., M. Ötting, and R. Langrock. 2023. Bettors’ reaction to match dynamics: Evidence from in-game betting. European Journal of Operational Research 310(3): 1118–1127 . Ntzoufras et al. [2021] Ntzoufras, I., V. Palaskas, and S. Drikos. 2021. Bayesian models for prediction of the set-difference in volleyball. IMA Journal of Management Mathematics 32(4): 491–518 . Ötting et al. [2024] Ötting, M., R. Michels, R. Langrock, and C. Deutscher. 2024. Demand for live betting: An analysis using state-space models. Applied Stochastic Models in Business and Industry . Pelechrinis and Winston [2021] Pelechrinis, K. and W. Winston. 2021. A Skellam regression model for quantifying positional value in soccer. Journal of Quantitative Analysis in Sports 17(3): 187–201 . Prieto et al. [2016] Prieto, J., M.Á. Gómez, A. Volossovitch, and J. Sampaio. 2016. Effects of team timeouts on the teams’ scoring performance in elite handball close games. Kinesiology 48(1.): 115–123 . Singh et al. [2023] Singh, A., P. Scarf, and R. Baker. 2023. A unified theory for bivariate scores in possessive ball-sports: The case of handball. European Journal of Operational Research 304(3): 1099–1112 . Skellam [1946] Skellam, J. 1946. The frequency distribution of the difference between two Poisson variates belonging to different populations. Journal of the Royal Statistical Society. Series A 109(3): 296–296 . Smiatek and Heuer [2012] Smiatek, J. and A. Heuer. 2012. A statistical view on team handball results: home advantage, team fitness and prediction of match outcomes. arXiv preprint arXiv:1207.0700 . Tomy and Veena [2022] Tomy, L. and G. Veena. 2022. A retrospective study on Skellam and related distributions. Austrian Journal of Statistics 51(1): 102–111 . Van Eetvelde et al. [2023] Van Eetvelde, H., L.M. Hvattum, and C. Ley. 2023. The probabilistic final standing calculator: a fair stochastic tool to handle abruptly stopped football seasons. AStA Advances in Statistical Analysis 107(1-2): 251–269 . Volossovitch and Debanne [2021] Volossovitch, A. and T. Debanne. 2021. Home advantage in handball. Home Advantage in Sport: Causes and the Effect on Performance: 220–227 . Ntzoufras, I., V. Palaskas, and S. Drikos. 2021. Bayesian models for prediction of the set-difference in volleyball. IMA Journal of Management Mathematics 32(4): 491–518 . Ötting et al. [2024] Ötting, M., R. Michels, R. Langrock, and C. Deutscher. 2024. Demand for live betting: An analysis using state-space models. Applied Stochastic Models in Business and Industry . Pelechrinis and Winston [2021] Pelechrinis, K. and W. Winston. 2021. A Skellam regression model for quantifying positional value in soccer. Journal of Quantitative Analysis in Sports 17(3): 187–201 . Prieto et al. [2016] Prieto, J., M.Á. Gómez, A. Volossovitch, and J. Sampaio. 2016. Effects of team timeouts on the teams’ scoring performance in elite handball close games. Kinesiology 48(1.): 115–123 . Singh et al. [2023] Singh, A., P. Scarf, and R. Baker. 2023. A unified theory for bivariate scores in possessive ball-sports: The case of handball. European Journal of Operational Research 304(3): 1099–1112 . Skellam [1946] Skellam, J. 1946. The frequency distribution of the difference between two Poisson variates belonging to different populations. Journal of the Royal Statistical Society. Series A 109(3): 296–296 . Smiatek and Heuer [2012] Smiatek, J. and A. Heuer. 2012. A statistical view on team handball results: home advantage, team fitness and prediction of match outcomes. arXiv preprint arXiv:1207.0700 . Tomy and Veena [2022] Tomy, L. and G. Veena. 2022. A retrospective study on Skellam and related distributions. Austrian Journal of Statistics 51(1): 102–111 . Van Eetvelde et al. [2023] Van Eetvelde, H., L.M. Hvattum, and C. Ley. 2023. The probabilistic final standing calculator: a fair stochastic tool to handle abruptly stopped football seasons. AStA Advances in Statistical Analysis 107(1-2): 251–269 . Volossovitch and Debanne [2021] Volossovitch, A. and T. Debanne. 2021. Home advantage in handball. Home Advantage in Sport: Causes and the Effect on Performance: 220–227 . Ötting, M., R. Michels, R. Langrock, and C. Deutscher. 2024. Demand for live betting: An analysis using state-space models. Applied Stochastic Models in Business and Industry . Pelechrinis and Winston [2021] Pelechrinis, K. and W. Winston. 2021. A Skellam regression model for quantifying positional value in soccer. Journal of Quantitative Analysis in Sports 17(3): 187–201 . Prieto et al. [2016] Prieto, J., M.Á. Gómez, A. Volossovitch, and J. Sampaio. 2016. Effects of team timeouts on the teams’ scoring performance in elite handball close games. Kinesiology 48(1.): 115–123 . Singh et al. [2023] Singh, A., P. Scarf, and R. Baker. 2023. A unified theory for bivariate scores in possessive ball-sports: The case of handball. European Journal of Operational Research 304(3): 1099–1112 . Skellam [1946] Skellam, J. 1946. The frequency distribution of the difference between two Poisson variates belonging to different populations. Journal of the Royal Statistical Society. Series A 109(3): 296–296 . Smiatek and Heuer [2012] Smiatek, J. and A. Heuer. 2012. A statistical view on team handball results: home advantage, team fitness and prediction of match outcomes. arXiv preprint arXiv:1207.0700 . Tomy and Veena [2022] Tomy, L. and G. Veena. 2022. A retrospective study on Skellam and related distributions. Austrian Journal of Statistics 51(1): 102–111 . Van Eetvelde et al. [2023] Van Eetvelde, H., L.M. Hvattum, and C. Ley. 2023. The probabilistic final standing calculator: a fair stochastic tool to handle abruptly stopped football seasons. AStA Advances in Statistical Analysis 107(1-2): 251–269 . Volossovitch and Debanne [2021] Volossovitch, A. and T. Debanne. 2021. Home advantage in handball. Home Advantage in Sport: Causes and the Effect on Performance: 220–227 . Pelechrinis, K. and W. Winston. 2021. A Skellam regression model for quantifying positional value in soccer. Journal of Quantitative Analysis in Sports 17(3): 187–201 . Prieto et al. [2016] Prieto, J., M.Á. Gómez, A. Volossovitch, and J. Sampaio. 2016. Effects of team timeouts on the teams’ scoring performance in elite handball close games. Kinesiology 48(1.): 115–123 . Singh et al. [2023] Singh, A., P. Scarf, and R. Baker. 2023. A unified theory for bivariate scores in possessive ball-sports: The case of handball. European Journal of Operational Research 304(3): 1099–1112 . Skellam [1946] Skellam, J. 1946. The frequency distribution of the difference between two Poisson variates belonging to different populations. Journal of the Royal Statistical Society. Series A 109(3): 296–296 . Smiatek and Heuer [2012] Smiatek, J. and A. Heuer. 2012. A statistical view on team handball results: home advantage, team fitness and prediction of match outcomes. arXiv preprint arXiv:1207.0700 . Tomy and Veena [2022] Tomy, L. and G. Veena. 2022. A retrospective study on Skellam and related distributions. Austrian Journal of Statistics 51(1): 102–111 . Van Eetvelde et al. [2023] Van Eetvelde, H., L.M. Hvattum, and C. Ley. 2023. The probabilistic final standing calculator: a fair stochastic tool to handle abruptly stopped football seasons. AStA Advances in Statistical Analysis 107(1-2): 251–269 . Volossovitch and Debanne [2021] Volossovitch, A. and T. Debanne. 2021. Home advantage in handball. Home Advantage in Sport: Causes and the Effect on Performance: 220–227 . Prieto, J., M.Á. Gómez, A. Volossovitch, and J. Sampaio. 2016. Effects of team timeouts on the teams’ scoring performance in elite handball close games. Kinesiology 48(1.): 115–123 . Singh et al. [2023] Singh, A., P. Scarf, and R. Baker. 2023. A unified theory for bivariate scores in possessive ball-sports: The case of handball. European Journal of Operational Research 304(3): 1099–1112 . Skellam [1946] Skellam, J. 1946. The frequency distribution of the difference between two Poisson variates belonging to different populations. Journal of the Royal Statistical Society. Series A 109(3): 296–296 . Smiatek and Heuer [2012] Smiatek, J. and A. Heuer. 2012. A statistical view on team handball results: home advantage, team fitness and prediction of match outcomes. arXiv preprint arXiv:1207.0700 . Tomy and Veena [2022] Tomy, L. and G. Veena. 2022. A retrospective study on Skellam and related distributions. Austrian Journal of Statistics 51(1): 102–111 . Van Eetvelde et al. [2023] Van Eetvelde, H., L.M. Hvattum, and C. Ley. 2023. The probabilistic final standing calculator: a fair stochastic tool to handle abruptly stopped football seasons. AStA Advances in Statistical Analysis 107(1-2): 251–269 . Volossovitch and Debanne [2021] Volossovitch, A. and T. Debanne. 2021. Home advantage in handball. Home Advantage in Sport: Causes and the Effect on Performance: 220–227 . Singh, A., P. Scarf, and R. Baker. 2023. A unified theory for bivariate scores in possessive ball-sports: The case of handball. European Journal of Operational Research 304(3): 1099–1112 . Skellam [1946] Skellam, J. 1946. The frequency distribution of the difference between two Poisson variates belonging to different populations. Journal of the Royal Statistical Society. Series A 109(3): 296–296 . Smiatek and Heuer [2012] Smiatek, J. and A. Heuer. 2012. A statistical view on team handball results: home advantage, team fitness and prediction of match outcomes. arXiv preprint arXiv:1207.0700 . Tomy and Veena [2022] Tomy, L. and G. Veena. 2022. A retrospective study on Skellam and related distributions. Austrian Journal of Statistics 51(1): 102–111 . Van Eetvelde et al. [2023] Van Eetvelde, H., L.M. Hvattum, and C. Ley. 2023. The probabilistic final standing calculator: a fair stochastic tool to handle abruptly stopped football seasons. AStA Advances in Statistical Analysis 107(1-2): 251–269 . Volossovitch and Debanne [2021] Volossovitch, A. and T. Debanne. 2021. Home advantage in handball. Home Advantage in Sport: Causes and the Effect on Performance: 220–227 . Skellam, J. 1946. The frequency distribution of the difference between two Poisson variates belonging to different populations. Journal of the Royal Statistical Society. Series A 109(3): 296–296 . Smiatek and Heuer [2012] Smiatek, J. and A. Heuer. 2012. A statistical view on team handball results: home advantage, team fitness and prediction of match outcomes. arXiv preprint arXiv:1207.0700 . Tomy and Veena [2022] Tomy, L. and G. Veena. 2022. A retrospective study on Skellam and related distributions. Austrian Journal of Statistics 51(1): 102–111 . Van Eetvelde et al. [2023] Van Eetvelde, H., L.M. Hvattum, and C. Ley. 2023. The probabilistic final standing calculator: a fair stochastic tool to handle abruptly stopped football seasons. AStA Advances in Statistical Analysis 107(1-2): 251–269 . Volossovitch and Debanne [2021] Volossovitch, A. and T. Debanne. 2021. Home advantage in handball. Home Advantage in Sport: Causes and the Effect on Performance: 220–227 . Smiatek, J. and A. Heuer. 2012. A statistical view on team handball results: home advantage, team fitness and prediction of match outcomes. arXiv preprint arXiv:1207.0700 . Tomy and Veena [2022] Tomy, L. and G. Veena. 2022. A retrospective study on Skellam and related distributions. Austrian Journal of Statistics 51(1): 102–111 . Van Eetvelde et al. [2023] Van Eetvelde, H., L.M. Hvattum, and C. Ley. 2023. The probabilistic final standing calculator: a fair stochastic tool to handle abruptly stopped football seasons. AStA Advances in Statistical Analysis 107(1-2): 251–269 . Volossovitch and Debanne [2021] Volossovitch, A. and T. Debanne. 2021. Home advantage in handball. Home Advantage in Sport: Causes and the Effect on Performance: 220–227 . Tomy, L. and G. Veena. 2022. A retrospective study on Skellam and related distributions. Austrian Journal of Statistics 51(1): 102–111 . Van Eetvelde et al. [2023] Van Eetvelde, H., L.M. Hvattum, and C. Ley. 2023. The probabilistic final standing calculator: a fair stochastic tool to handle abruptly stopped football seasons. AStA Advances in Statistical Analysis 107(1-2): 251–269 . Volossovitch and Debanne [2021] Volossovitch, A. and T. Debanne. 2021. Home advantage in handball. Home Advantage in Sport: Causes and the Effect on Performance: 220–227 . Van Eetvelde, H., L.M. Hvattum, and C. Ley. 2023. The probabilistic final standing calculator: a fair stochastic tool to handle abruptly stopped football seasons. AStA Advances in Statistical Analysis 107(1-2): 251–269 . Volossovitch and Debanne [2021] Volossovitch, A. and T. Debanne. 2021. Home advantage in handball. Home Advantage in Sport: Causes and the Effect on Performance: 220–227 . Volossovitch, A. and T. Debanne. 2021. Home advantage in handball. Home Advantage in Sport: Causes and the Effect on Performance: 220–227 .
- Extending the Dixon and Coles model: an application to women’s football data. arXiv preprint arXiv:2307.02139 . Michels et al. [2023] Michels, R., M. Ötting, and R. Langrock. 2023. Bettors’ reaction to match dynamics: Evidence from in-game betting. European Journal of Operational Research 310(3): 1118–1127 . Ntzoufras et al. [2021] Ntzoufras, I., V. Palaskas, and S. Drikos. 2021. Bayesian models for prediction of the set-difference in volleyball. IMA Journal of Management Mathematics 32(4): 491–518 . Ötting et al. [2024] Ötting, M., R. Michels, R. Langrock, and C. Deutscher. 2024. Demand for live betting: An analysis using state-space models. Applied Stochastic Models in Business and Industry . Pelechrinis and Winston [2021] Pelechrinis, K. and W. Winston. 2021. A Skellam regression model for quantifying positional value in soccer. Journal of Quantitative Analysis in Sports 17(3): 187–201 . Prieto et al. [2016] Prieto, J., M.Á. Gómez, A. Volossovitch, and J. Sampaio. 2016. Effects of team timeouts on the teams’ scoring performance in elite handball close games. Kinesiology 48(1.): 115–123 . Singh et al. [2023] Singh, A., P. Scarf, and R. Baker. 2023. A unified theory for bivariate scores in possessive ball-sports: The case of handball. European Journal of Operational Research 304(3): 1099–1112 . Skellam [1946] Skellam, J. 1946. The frequency distribution of the difference between two Poisson variates belonging to different populations. Journal of the Royal Statistical Society. Series A 109(3): 296–296 . Smiatek and Heuer [2012] Smiatek, J. and A. Heuer. 2012. A statistical view on team handball results: home advantage, team fitness and prediction of match outcomes. arXiv preprint arXiv:1207.0700 . Tomy and Veena [2022] Tomy, L. and G. Veena. 2022. A retrospective study on Skellam and related distributions. Austrian Journal of Statistics 51(1): 102–111 . Van Eetvelde et al. [2023] Van Eetvelde, H., L.M. Hvattum, and C. Ley. 2023. The probabilistic final standing calculator: a fair stochastic tool to handle abruptly stopped football seasons. AStA Advances in Statistical Analysis 107(1-2): 251–269 . Volossovitch and Debanne [2021] Volossovitch, A. and T. Debanne. 2021. Home advantage in handball. Home Advantage in Sport: Causes and the Effect on Performance: 220–227 . Michels, R., M. Ötting, and R. Langrock. 2023. Bettors’ reaction to match dynamics: Evidence from in-game betting. European Journal of Operational Research 310(3): 1118–1127 . Ntzoufras et al. [2021] Ntzoufras, I., V. Palaskas, and S. Drikos. 2021. Bayesian models for prediction of the set-difference in volleyball. IMA Journal of Management Mathematics 32(4): 491–518 . Ötting et al. [2024] Ötting, M., R. Michels, R. Langrock, and C. Deutscher. 2024. Demand for live betting: An analysis using state-space models. Applied Stochastic Models in Business and Industry . Pelechrinis and Winston [2021] Pelechrinis, K. and W. Winston. 2021. A Skellam regression model for quantifying positional value in soccer. Journal of Quantitative Analysis in Sports 17(3): 187–201 . Prieto et al. [2016] Prieto, J., M.Á. Gómez, A. Volossovitch, and J. Sampaio. 2016. Effects of team timeouts on the teams’ scoring performance in elite handball close games. Kinesiology 48(1.): 115–123 . Singh et al. [2023] Singh, A., P. Scarf, and R. Baker. 2023. A unified theory for bivariate scores in possessive ball-sports: The case of handball. European Journal of Operational Research 304(3): 1099–1112 . Skellam [1946] Skellam, J. 1946. The frequency distribution of the difference between two Poisson variates belonging to different populations. Journal of the Royal Statistical Society. Series A 109(3): 296–296 . Smiatek and Heuer [2012] Smiatek, J. and A. Heuer. 2012. A statistical view on team handball results: home advantage, team fitness and prediction of match outcomes. arXiv preprint arXiv:1207.0700 . Tomy and Veena [2022] Tomy, L. and G. Veena. 2022. A retrospective study on Skellam and related distributions. Austrian Journal of Statistics 51(1): 102–111 . Van Eetvelde et al. [2023] Van Eetvelde, H., L.M. Hvattum, and C. Ley. 2023. The probabilistic final standing calculator: a fair stochastic tool to handle abruptly stopped football seasons. AStA Advances in Statistical Analysis 107(1-2): 251–269 . Volossovitch and Debanne [2021] Volossovitch, A. and T. Debanne. 2021. Home advantage in handball. Home Advantage in Sport: Causes and the Effect on Performance: 220–227 . Ntzoufras, I., V. Palaskas, and S. Drikos. 2021. Bayesian models for prediction of the set-difference in volleyball. IMA Journal of Management Mathematics 32(4): 491–518 . Ötting et al. [2024] Ötting, M., R. Michels, R. Langrock, and C. Deutscher. 2024. Demand for live betting: An analysis using state-space models. Applied Stochastic Models in Business and Industry . Pelechrinis and Winston [2021] Pelechrinis, K. and W. Winston. 2021. A Skellam regression model for quantifying positional value in soccer. Journal of Quantitative Analysis in Sports 17(3): 187–201 . Prieto et al. [2016] Prieto, J., M.Á. Gómez, A. Volossovitch, and J. Sampaio. 2016. Effects of team timeouts on the teams’ scoring performance in elite handball close games. Kinesiology 48(1.): 115–123 . Singh et al. [2023] Singh, A., P. Scarf, and R. Baker. 2023. A unified theory for bivariate scores in possessive ball-sports: The case of handball. European Journal of Operational Research 304(3): 1099–1112 . Skellam [1946] Skellam, J. 1946. The frequency distribution of the difference between two Poisson variates belonging to different populations. Journal of the Royal Statistical Society. Series A 109(3): 296–296 . Smiatek and Heuer [2012] Smiatek, J. and A. Heuer. 2012. A statistical view on team handball results: home advantage, team fitness and prediction of match outcomes. arXiv preprint arXiv:1207.0700 . Tomy and Veena [2022] Tomy, L. and G. Veena. 2022. A retrospective study on Skellam and related distributions. Austrian Journal of Statistics 51(1): 102–111 . Van Eetvelde et al. [2023] Van Eetvelde, H., L.M. Hvattum, and C. Ley. 2023. The probabilistic final standing calculator: a fair stochastic tool to handle abruptly stopped football seasons. AStA Advances in Statistical Analysis 107(1-2): 251–269 . Volossovitch and Debanne [2021] Volossovitch, A. and T. Debanne. 2021. Home advantage in handball. Home Advantage in Sport: Causes and the Effect on Performance: 220–227 . Ötting, M., R. Michels, R. Langrock, and C. Deutscher. 2024. Demand for live betting: An analysis using state-space models. Applied Stochastic Models in Business and Industry . Pelechrinis and Winston [2021] Pelechrinis, K. and W. Winston. 2021. A Skellam regression model for quantifying positional value in soccer. Journal of Quantitative Analysis in Sports 17(3): 187–201 . Prieto et al. [2016] Prieto, J., M.Á. Gómez, A. Volossovitch, and J. Sampaio. 2016. Effects of team timeouts on the teams’ scoring performance in elite handball close games. Kinesiology 48(1.): 115–123 . Singh et al. [2023] Singh, A., P. Scarf, and R. Baker. 2023. A unified theory for bivariate scores in possessive ball-sports: The case of handball. European Journal of Operational Research 304(3): 1099–1112 . Skellam [1946] Skellam, J. 1946. The frequency distribution of the difference between two Poisson variates belonging to different populations. Journal of the Royal Statistical Society. Series A 109(3): 296–296 . Smiatek and Heuer [2012] Smiatek, J. and A. Heuer. 2012. A statistical view on team handball results: home advantage, team fitness and prediction of match outcomes. arXiv preprint arXiv:1207.0700 . Tomy and Veena [2022] Tomy, L. and G. Veena. 2022. A retrospective study on Skellam and related distributions. Austrian Journal of Statistics 51(1): 102–111 . Van Eetvelde et al. [2023] Van Eetvelde, H., L.M. Hvattum, and C. Ley. 2023. The probabilistic final standing calculator: a fair stochastic tool to handle abruptly stopped football seasons. AStA Advances in Statistical Analysis 107(1-2): 251–269 . Volossovitch and Debanne [2021] Volossovitch, A. and T. Debanne. 2021. Home advantage in handball. Home Advantage in Sport: Causes and the Effect on Performance: 220–227 . Pelechrinis, K. and W. Winston. 2021. A Skellam regression model for quantifying positional value in soccer. Journal of Quantitative Analysis in Sports 17(3): 187–201 . Prieto et al. [2016] Prieto, J., M.Á. Gómez, A. Volossovitch, and J. Sampaio. 2016. Effects of team timeouts on the teams’ scoring performance in elite handball close games. Kinesiology 48(1.): 115–123 . Singh et al. [2023] Singh, A., P. Scarf, and R. Baker. 2023. A unified theory for bivariate scores in possessive ball-sports: The case of handball. European Journal of Operational Research 304(3): 1099–1112 . Skellam [1946] Skellam, J. 1946. The frequency distribution of the difference between two Poisson variates belonging to different populations. Journal of the Royal Statistical Society. Series A 109(3): 296–296 . Smiatek and Heuer [2012] Smiatek, J. and A. Heuer. 2012. A statistical view on team handball results: home advantage, team fitness and prediction of match outcomes. arXiv preprint arXiv:1207.0700 . Tomy and Veena [2022] Tomy, L. and G. Veena. 2022. A retrospective study on Skellam and related distributions. Austrian Journal of Statistics 51(1): 102–111 . Van Eetvelde et al. [2023] Van Eetvelde, H., L.M. Hvattum, and C. Ley. 2023. The probabilistic final standing calculator: a fair stochastic tool to handle abruptly stopped football seasons. AStA Advances in Statistical Analysis 107(1-2): 251–269 . Volossovitch and Debanne [2021] Volossovitch, A. and T. Debanne. 2021. Home advantage in handball. Home Advantage in Sport: Causes and the Effect on Performance: 220–227 . Prieto, J., M.Á. Gómez, A. Volossovitch, and J. Sampaio. 2016. Effects of team timeouts on the teams’ scoring performance in elite handball close games. Kinesiology 48(1.): 115–123 . Singh et al. [2023] Singh, A., P. Scarf, and R. Baker. 2023. A unified theory for bivariate scores in possessive ball-sports: The case of handball. European Journal of Operational Research 304(3): 1099–1112 . Skellam [1946] Skellam, J. 1946. The frequency distribution of the difference between two Poisson variates belonging to different populations. Journal of the Royal Statistical Society. Series A 109(3): 296–296 . Smiatek and Heuer [2012] Smiatek, J. and A. Heuer. 2012. A statistical view on team handball results: home advantage, team fitness and prediction of match outcomes. arXiv preprint arXiv:1207.0700 . Tomy and Veena [2022] Tomy, L. and G. Veena. 2022. A retrospective study on Skellam and related distributions. Austrian Journal of Statistics 51(1): 102–111 . Van Eetvelde et al. [2023] Van Eetvelde, H., L.M. Hvattum, and C. Ley. 2023. The probabilistic final standing calculator: a fair stochastic tool to handle abruptly stopped football seasons. AStA Advances in Statistical Analysis 107(1-2): 251–269 . Volossovitch and Debanne [2021] Volossovitch, A. and T. Debanne. 2021. Home advantage in handball. Home Advantage in Sport: Causes and the Effect on Performance: 220–227 . Singh, A., P. Scarf, and R. Baker. 2023. A unified theory for bivariate scores in possessive ball-sports: The case of handball. European Journal of Operational Research 304(3): 1099–1112 . Skellam [1946] Skellam, J. 1946. The frequency distribution of the difference between two Poisson variates belonging to different populations. Journal of the Royal Statistical Society. Series A 109(3): 296–296 . Smiatek and Heuer [2012] Smiatek, J. and A. Heuer. 2012. A statistical view on team handball results: home advantage, team fitness and prediction of match outcomes. arXiv preprint arXiv:1207.0700 . Tomy and Veena [2022] Tomy, L. and G. Veena. 2022. A retrospective study on Skellam and related distributions. Austrian Journal of Statistics 51(1): 102–111 . Van Eetvelde et al. [2023] Van Eetvelde, H., L.M. Hvattum, and C. Ley. 2023. The probabilistic final standing calculator: a fair stochastic tool to handle abruptly stopped football seasons. AStA Advances in Statistical Analysis 107(1-2): 251–269 . Volossovitch and Debanne [2021] Volossovitch, A. and T. Debanne. 2021. Home advantage in handball. Home Advantage in Sport: Causes and the Effect on Performance: 220–227 . Skellam, J. 1946. The frequency distribution of the difference between two Poisson variates belonging to different populations. Journal of the Royal Statistical Society. Series A 109(3): 296–296 . Smiatek and Heuer [2012] Smiatek, J. and A. Heuer. 2012. A statistical view on team handball results: home advantage, team fitness and prediction of match outcomes. arXiv preprint arXiv:1207.0700 . Tomy and Veena [2022] Tomy, L. and G. Veena. 2022. A retrospective study on Skellam and related distributions. Austrian Journal of Statistics 51(1): 102–111 . Van Eetvelde et al. [2023] Van Eetvelde, H., L.M. Hvattum, and C. Ley. 2023. The probabilistic final standing calculator: a fair stochastic tool to handle abruptly stopped football seasons. AStA Advances in Statistical Analysis 107(1-2): 251–269 . Volossovitch and Debanne [2021] Volossovitch, A. and T. Debanne. 2021. Home advantage in handball. Home Advantage in Sport: Causes and the Effect on Performance: 220–227 . Smiatek, J. and A. Heuer. 2012. A statistical view on team handball results: home advantage, team fitness and prediction of match outcomes. arXiv preprint arXiv:1207.0700 . Tomy and Veena [2022] Tomy, L. and G. Veena. 2022. A retrospective study on Skellam and related distributions. Austrian Journal of Statistics 51(1): 102–111 . Van Eetvelde et al. [2023] Van Eetvelde, H., L.M. Hvattum, and C. Ley. 2023. The probabilistic final standing calculator: a fair stochastic tool to handle abruptly stopped football seasons. AStA Advances in Statistical Analysis 107(1-2): 251–269 . Volossovitch and Debanne [2021] Volossovitch, A. and T. Debanne. 2021. Home advantage in handball. Home Advantage in Sport: Causes and the Effect on Performance: 220–227 . Tomy, L. and G. Veena. 2022. A retrospective study on Skellam and related distributions. Austrian Journal of Statistics 51(1): 102–111 . Van Eetvelde et al. [2023] Van Eetvelde, H., L.M. Hvattum, and C. Ley. 2023. The probabilistic final standing calculator: a fair stochastic tool to handle abruptly stopped football seasons. AStA Advances in Statistical Analysis 107(1-2): 251–269 . Volossovitch and Debanne [2021] Volossovitch, A. and T. Debanne. 2021. Home advantage in handball. Home Advantage in Sport: Causes and the Effect on Performance: 220–227 . Van Eetvelde, H., L.M. Hvattum, and C. Ley. 2023. The probabilistic final standing calculator: a fair stochastic tool to handle abruptly stopped football seasons. AStA Advances in Statistical Analysis 107(1-2): 251–269 . Volossovitch and Debanne [2021] Volossovitch, A. and T. Debanne. 2021. Home advantage in handball. Home Advantage in Sport: Causes and the Effect on Performance: 220–227 . Volossovitch, A. and T. Debanne. 2021. Home advantage in handball. Home Advantage in Sport: Causes and the Effect on Performance: 220–227 .
- Bettors’ reaction to match dynamics: Evidence from in-game betting. European Journal of Operational Research 310(3): 1118–1127 . Ntzoufras et al. [2021] Ntzoufras, I., V. Palaskas, and S. Drikos. 2021. Bayesian models for prediction of the set-difference in volleyball. IMA Journal of Management Mathematics 32(4): 491–518 . Ötting et al. [2024] Ötting, M., R. Michels, R. Langrock, and C. Deutscher. 2024. Demand for live betting: An analysis using state-space models. Applied Stochastic Models in Business and Industry . Pelechrinis and Winston [2021] Pelechrinis, K. and W. Winston. 2021. A Skellam regression model for quantifying positional value in soccer. Journal of Quantitative Analysis in Sports 17(3): 187–201 . Prieto et al. [2016] Prieto, J., M.Á. Gómez, A. Volossovitch, and J. Sampaio. 2016. Effects of team timeouts on the teams’ scoring performance in elite handball close games. Kinesiology 48(1.): 115–123 . Singh et al. [2023] Singh, A., P. Scarf, and R. Baker. 2023. A unified theory for bivariate scores in possessive ball-sports: The case of handball. European Journal of Operational Research 304(3): 1099–1112 . Skellam [1946] Skellam, J. 1946. The frequency distribution of the difference between two Poisson variates belonging to different populations. Journal of the Royal Statistical Society. Series A 109(3): 296–296 . Smiatek and Heuer [2012] Smiatek, J. and A. Heuer. 2012. A statistical view on team handball results: home advantage, team fitness and prediction of match outcomes. arXiv preprint arXiv:1207.0700 . Tomy and Veena [2022] Tomy, L. and G. Veena. 2022. A retrospective study on Skellam and related distributions. Austrian Journal of Statistics 51(1): 102–111 . Van Eetvelde et al. [2023] Van Eetvelde, H., L.M. Hvattum, and C. Ley. 2023. The probabilistic final standing calculator: a fair stochastic tool to handle abruptly stopped football seasons. AStA Advances in Statistical Analysis 107(1-2): 251–269 . Volossovitch and Debanne [2021] Volossovitch, A. and T. Debanne. 2021. Home advantage in handball. Home Advantage in Sport: Causes and the Effect on Performance: 220–227 . Ntzoufras, I., V. Palaskas, and S. Drikos. 2021. Bayesian models for prediction of the set-difference in volleyball. IMA Journal of Management Mathematics 32(4): 491–518 . Ötting et al. [2024] Ötting, M., R. Michels, R. Langrock, and C. Deutscher. 2024. Demand for live betting: An analysis using state-space models. Applied Stochastic Models in Business and Industry . Pelechrinis and Winston [2021] Pelechrinis, K. and W. Winston. 2021. A Skellam regression model for quantifying positional value in soccer. Journal of Quantitative Analysis in Sports 17(3): 187–201 . Prieto et al. [2016] Prieto, J., M.Á. Gómez, A. Volossovitch, and J. Sampaio. 2016. Effects of team timeouts on the teams’ scoring performance in elite handball close games. Kinesiology 48(1.): 115–123 . Singh et al. [2023] Singh, A., P. Scarf, and R. Baker. 2023. A unified theory for bivariate scores in possessive ball-sports: The case of handball. European Journal of Operational Research 304(3): 1099–1112 . Skellam [1946] Skellam, J. 1946. The frequency distribution of the difference between two Poisson variates belonging to different populations. Journal of the Royal Statistical Society. Series A 109(3): 296–296 . Smiatek and Heuer [2012] Smiatek, J. and A. Heuer. 2012. A statistical view on team handball results: home advantage, team fitness and prediction of match outcomes. arXiv preprint arXiv:1207.0700 . Tomy and Veena [2022] Tomy, L. and G. Veena. 2022. A retrospective study on Skellam and related distributions. Austrian Journal of Statistics 51(1): 102–111 . Van Eetvelde et al. [2023] Van Eetvelde, H., L.M. Hvattum, and C. Ley. 2023. The probabilistic final standing calculator: a fair stochastic tool to handle abruptly stopped football seasons. AStA Advances in Statistical Analysis 107(1-2): 251–269 . Volossovitch and Debanne [2021] Volossovitch, A. and T. Debanne. 2021. Home advantage in handball. Home Advantage in Sport: Causes and the Effect on Performance: 220–227 . Ötting, M., R. Michels, R. Langrock, and C. Deutscher. 2024. Demand for live betting: An analysis using state-space models. Applied Stochastic Models in Business and Industry . Pelechrinis and Winston [2021] Pelechrinis, K. and W. Winston. 2021. A Skellam regression model for quantifying positional value in soccer. Journal of Quantitative Analysis in Sports 17(3): 187–201 . Prieto et al. [2016] Prieto, J., M.Á. Gómez, A. Volossovitch, and J. Sampaio. 2016. Effects of team timeouts on the teams’ scoring performance in elite handball close games. Kinesiology 48(1.): 115–123 . Singh et al. [2023] Singh, A., P. Scarf, and R. Baker. 2023. A unified theory for bivariate scores in possessive ball-sports: The case of handball. European Journal of Operational Research 304(3): 1099–1112 . Skellam [1946] Skellam, J. 1946. The frequency distribution of the difference between two Poisson variates belonging to different populations. Journal of the Royal Statistical Society. Series A 109(3): 296–296 . Smiatek and Heuer [2012] Smiatek, J. and A. Heuer. 2012. A statistical view on team handball results: home advantage, team fitness and prediction of match outcomes. arXiv preprint arXiv:1207.0700 . Tomy and Veena [2022] Tomy, L. and G. Veena. 2022. A retrospective study on Skellam and related distributions. Austrian Journal of Statistics 51(1): 102–111 . Van Eetvelde et al. [2023] Van Eetvelde, H., L.M. Hvattum, and C. Ley. 2023. The probabilistic final standing calculator: a fair stochastic tool to handle abruptly stopped football seasons. AStA Advances in Statistical Analysis 107(1-2): 251–269 . Volossovitch and Debanne [2021] Volossovitch, A. and T. Debanne. 2021. Home advantage in handball. Home Advantage in Sport: Causes and the Effect on Performance: 220–227 . Pelechrinis, K. and W. Winston. 2021. A Skellam regression model for quantifying positional value in soccer. Journal of Quantitative Analysis in Sports 17(3): 187–201 . Prieto et al. [2016] Prieto, J., M.Á. Gómez, A. Volossovitch, and J. Sampaio. 2016. Effects of team timeouts on the teams’ scoring performance in elite handball close games. Kinesiology 48(1.): 115–123 . Singh et al. [2023] Singh, A., P. Scarf, and R. Baker. 2023. A unified theory for bivariate scores in possessive ball-sports: The case of handball. European Journal of Operational Research 304(3): 1099–1112 . Skellam [1946] Skellam, J. 1946. The frequency distribution of the difference between two Poisson variates belonging to different populations. Journal of the Royal Statistical Society. Series A 109(3): 296–296 . Smiatek and Heuer [2012] Smiatek, J. and A. Heuer. 2012. A statistical view on team handball results: home advantage, team fitness and prediction of match outcomes. arXiv preprint arXiv:1207.0700 . Tomy and Veena [2022] Tomy, L. and G. Veena. 2022. A retrospective study on Skellam and related distributions. Austrian Journal of Statistics 51(1): 102–111 . Van Eetvelde et al. [2023] Van Eetvelde, H., L.M. Hvattum, and C. Ley. 2023. The probabilistic final standing calculator: a fair stochastic tool to handle abruptly stopped football seasons. AStA Advances in Statistical Analysis 107(1-2): 251–269 . Volossovitch and Debanne [2021] Volossovitch, A. and T. Debanne. 2021. Home advantage in handball. Home Advantage in Sport: Causes and the Effect on Performance: 220–227 . Prieto, J., M.Á. Gómez, A. Volossovitch, and J. Sampaio. 2016. Effects of team timeouts on the teams’ scoring performance in elite handball close games. Kinesiology 48(1.): 115–123 . Singh et al. [2023] Singh, A., P. Scarf, and R. Baker. 2023. A unified theory for bivariate scores in possessive ball-sports: The case of handball. European Journal of Operational Research 304(3): 1099–1112 . Skellam [1946] Skellam, J. 1946. The frequency distribution of the difference between two Poisson variates belonging to different populations. Journal of the Royal Statistical Society. Series A 109(3): 296–296 . Smiatek and Heuer [2012] Smiatek, J. and A. Heuer. 2012. A statistical view on team handball results: home advantage, team fitness and prediction of match outcomes. arXiv preprint arXiv:1207.0700 . Tomy and Veena [2022] Tomy, L. and G. Veena. 2022. A retrospective study on Skellam and related distributions. Austrian Journal of Statistics 51(1): 102–111 . Van Eetvelde et al. [2023] Van Eetvelde, H., L.M. Hvattum, and C. Ley. 2023. The probabilistic final standing calculator: a fair stochastic tool to handle abruptly stopped football seasons. AStA Advances in Statistical Analysis 107(1-2): 251–269 . Volossovitch and Debanne [2021] Volossovitch, A. and T. Debanne. 2021. Home advantage in handball. Home Advantage in Sport: Causes and the Effect on Performance: 220–227 . Singh, A., P. Scarf, and R. Baker. 2023. A unified theory for bivariate scores in possessive ball-sports: The case of handball. European Journal of Operational Research 304(3): 1099–1112 . Skellam [1946] Skellam, J. 1946. The frequency distribution of the difference between two Poisson variates belonging to different populations. Journal of the Royal Statistical Society. Series A 109(3): 296–296 . Smiatek and Heuer [2012] Smiatek, J. and A. Heuer. 2012. A statistical view on team handball results: home advantage, team fitness and prediction of match outcomes. arXiv preprint arXiv:1207.0700 . Tomy and Veena [2022] Tomy, L. and G. Veena. 2022. A retrospective study on Skellam and related distributions. Austrian Journal of Statistics 51(1): 102–111 . Van Eetvelde et al. [2023] Van Eetvelde, H., L.M. Hvattum, and C. Ley. 2023. The probabilistic final standing calculator: a fair stochastic tool to handle abruptly stopped football seasons. AStA Advances in Statistical Analysis 107(1-2): 251–269 . Volossovitch and Debanne [2021] Volossovitch, A. and T. Debanne. 2021. Home advantage in handball. Home Advantage in Sport: Causes and the Effect on Performance: 220–227 . Skellam, J. 1946. The frequency distribution of the difference between two Poisson variates belonging to different populations. Journal of the Royal Statistical Society. Series A 109(3): 296–296 . Smiatek and Heuer [2012] Smiatek, J. and A. Heuer. 2012. A statistical view on team handball results: home advantage, team fitness and prediction of match outcomes. arXiv preprint arXiv:1207.0700 . Tomy and Veena [2022] Tomy, L. and G. Veena. 2022. A retrospective study on Skellam and related distributions. Austrian Journal of Statistics 51(1): 102–111 . Van Eetvelde et al. [2023] Van Eetvelde, H., L.M. Hvattum, and C. Ley. 2023. The probabilistic final standing calculator: a fair stochastic tool to handle abruptly stopped football seasons. AStA Advances in Statistical Analysis 107(1-2): 251–269 . Volossovitch and Debanne [2021] Volossovitch, A. and T. Debanne. 2021. Home advantage in handball. Home Advantage in Sport: Causes and the Effect on Performance: 220–227 . Smiatek, J. and A. Heuer. 2012. A statistical view on team handball results: home advantage, team fitness and prediction of match outcomes. arXiv preprint arXiv:1207.0700 . Tomy and Veena [2022] Tomy, L. and G. Veena. 2022. A retrospective study on Skellam and related distributions. Austrian Journal of Statistics 51(1): 102–111 . Van Eetvelde et al. [2023] Van Eetvelde, H., L.M. Hvattum, and C. Ley. 2023. The probabilistic final standing calculator: a fair stochastic tool to handle abruptly stopped football seasons. AStA Advances in Statistical Analysis 107(1-2): 251–269 . Volossovitch and Debanne [2021] Volossovitch, A. and T. Debanne. 2021. Home advantage in handball. Home Advantage in Sport: Causes and the Effect on Performance: 220–227 . Tomy, L. and G. Veena. 2022. A retrospective study on Skellam and related distributions. Austrian Journal of Statistics 51(1): 102–111 . Van Eetvelde et al. [2023] Van Eetvelde, H., L.M. Hvattum, and C. Ley. 2023. The probabilistic final standing calculator: a fair stochastic tool to handle abruptly stopped football seasons. AStA Advances in Statistical Analysis 107(1-2): 251–269 . Volossovitch and Debanne [2021] Volossovitch, A. and T. Debanne. 2021. Home advantage in handball. Home Advantage in Sport: Causes and the Effect on Performance: 220–227 . Van Eetvelde, H., L.M. Hvattum, and C. Ley. 2023. The probabilistic final standing calculator: a fair stochastic tool to handle abruptly stopped football seasons. AStA Advances in Statistical Analysis 107(1-2): 251–269 . Volossovitch and Debanne [2021] Volossovitch, A. and T. Debanne. 2021. Home advantage in handball. Home Advantage in Sport: Causes and the Effect on Performance: 220–227 . Volossovitch, A. and T. Debanne. 2021. Home advantage in handball. Home Advantage in Sport: Causes and the Effect on Performance: 220–227 .
- Bayesian models for prediction of the set-difference in volleyball. IMA Journal of Management Mathematics 32(4): 491–518 . Ötting et al. [2024] Ötting, M., R. Michels, R. Langrock, and C. Deutscher. 2024. Demand for live betting: An analysis using state-space models. Applied Stochastic Models in Business and Industry . Pelechrinis and Winston [2021] Pelechrinis, K. and W. Winston. 2021. A Skellam regression model for quantifying positional value in soccer. Journal of Quantitative Analysis in Sports 17(3): 187–201 . Prieto et al. [2016] Prieto, J., M.Á. Gómez, A. Volossovitch, and J. Sampaio. 2016. Effects of team timeouts on the teams’ scoring performance in elite handball close games. Kinesiology 48(1.): 115–123 . Singh et al. [2023] Singh, A., P. Scarf, and R. Baker. 2023. A unified theory for bivariate scores in possessive ball-sports: The case of handball. European Journal of Operational Research 304(3): 1099–1112 . Skellam [1946] Skellam, J. 1946. The frequency distribution of the difference between two Poisson variates belonging to different populations. Journal of the Royal Statistical Society. Series A 109(3): 296–296 . Smiatek and Heuer [2012] Smiatek, J. and A. Heuer. 2012. A statistical view on team handball results: home advantage, team fitness and prediction of match outcomes. arXiv preprint arXiv:1207.0700 . Tomy and Veena [2022] Tomy, L. and G. Veena. 2022. A retrospective study on Skellam and related distributions. Austrian Journal of Statistics 51(1): 102–111 . Van Eetvelde et al. [2023] Van Eetvelde, H., L.M. Hvattum, and C. Ley. 2023. The probabilistic final standing calculator: a fair stochastic tool to handle abruptly stopped football seasons. AStA Advances in Statistical Analysis 107(1-2): 251–269 . Volossovitch and Debanne [2021] Volossovitch, A. and T. Debanne. 2021. Home advantage in handball. Home Advantage in Sport: Causes and the Effect on Performance: 220–227 . Ötting, M., R. Michels, R. Langrock, and C. Deutscher. 2024. Demand for live betting: An analysis using state-space models. Applied Stochastic Models in Business and Industry . Pelechrinis and Winston [2021] Pelechrinis, K. and W. Winston. 2021. A Skellam regression model for quantifying positional value in soccer. Journal of Quantitative Analysis in Sports 17(3): 187–201 . Prieto et al. [2016] Prieto, J., M.Á. Gómez, A. Volossovitch, and J. Sampaio. 2016. Effects of team timeouts on the teams’ scoring performance in elite handball close games. Kinesiology 48(1.): 115–123 . Singh et al. [2023] Singh, A., P. Scarf, and R. Baker. 2023. A unified theory for bivariate scores in possessive ball-sports: The case of handball. European Journal of Operational Research 304(3): 1099–1112 . Skellam [1946] Skellam, J. 1946. The frequency distribution of the difference between two Poisson variates belonging to different populations. Journal of the Royal Statistical Society. Series A 109(3): 296–296 . Smiatek and Heuer [2012] Smiatek, J. and A. Heuer. 2012. A statistical view on team handball results: home advantage, team fitness and prediction of match outcomes. arXiv preprint arXiv:1207.0700 . Tomy and Veena [2022] Tomy, L. and G. Veena. 2022. A retrospective study on Skellam and related distributions. Austrian Journal of Statistics 51(1): 102–111 . Van Eetvelde et al. [2023] Van Eetvelde, H., L.M. Hvattum, and C. Ley. 2023. The probabilistic final standing calculator: a fair stochastic tool to handle abruptly stopped football seasons. AStA Advances in Statistical Analysis 107(1-2): 251–269 . Volossovitch and Debanne [2021] Volossovitch, A. and T. Debanne. 2021. Home advantage in handball. Home Advantage in Sport: Causes and the Effect on Performance: 220–227 . Pelechrinis, K. and W. Winston. 2021. A Skellam regression model for quantifying positional value in soccer. Journal of Quantitative Analysis in Sports 17(3): 187–201 . Prieto et al. [2016] Prieto, J., M.Á. Gómez, A. Volossovitch, and J. Sampaio. 2016. Effects of team timeouts on the teams’ scoring performance in elite handball close games. Kinesiology 48(1.): 115–123 . Singh et al. [2023] Singh, A., P. Scarf, and R. Baker. 2023. A unified theory for bivariate scores in possessive ball-sports: The case of handball. European Journal of Operational Research 304(3): 1099–1112 . Skellam [1946] Skellam, J. 1946. The frequency distribution of the difference between two Poisson variates belonging to different populations. Journal of the Royal Statistical Society. Series A 109(3): 296–296 . Smiatek and Heuer [2012] Smiatek, J. and A. Heuer. 2012. A statistical view on team handball results: home advantage, team fitness and prediction of match outcomes. arXiv preprint arXiv:1207.0700 . Tomy and Veena [2022] Tomy, L. and G. Veena. 2022. A retrospective study on Skellam and related distributions. Austrian Journal of Statistics 51(1): 102–111 . Van Eetvelde et al. [2023] Van Eetvelde, H., L.M. Hvattum, and C. Ley. 2023. The probabilistic final standing calculator: a fair stochastic tool to handle abruptly stopped football seasons. AStA Advances in Statistical Analysis 107(1-2): 251–269 . Volossovitch and Debanne [2021] Volossovitch, A. and T. Debanne. 2021. Home advantage in handball. Home Advantage in Sport: Causes and the Effect on Performance: 220–227 . Prieto, J., M.Á. Gómez, A. Volossovitch, and J. Sampaio. 2016. Effects of team timeouts on the teams’ scoring performance in elite handball close games. Kinesiology 48(1.): 115–123 . Singh et al. [2023] Singh, A., P. Scarf, and R. Baker. 2023. A unified theory for bivariate scores in possessive ball-sports: The case of handball. European Journal of Operational Research 304(3): 1099–1112 . Skellam [1946] Skellam, J. 1946. The frequency distribution of the difference between two Poisson variates belonging to different populations. Journal of the Royal Statistical Society. Series A 109(3): 296–296 . Smiatek and Heuer [2012] Smiatek, J. and A. Heuer. 2012. A statistical view on team handball results: home advantage, team fitness and prediction of match outcomes. arXiv preprint arXiv:1207.0700 . Tomy and Veena [2022] Tomy, L. and G. Veena. 2022. A retrospective study on Skellam and related distributions. Austrian Journal of Statistics 51(1): 102–111 . Van Eetvelde et al. [2023] Van Eetvelde, H., L.M. Hvattum, and C. Ley. 2023. The probabilistic final standing calculator: a fair stochastic tool to handle abruptly stopped football seasons. AStA Advances in Statistical Analysis 107(1-2): 251–269 . Volossovitch and Debanne [2021] Volossovitch, A. and T. Debanne. 2021. Home advantage in handball. Home Advantage in Sport: Causes and the Effect on Performance: 220–227 . Singh, A., P. Scarf, and R. Baker. 2023. A unified theory for bivariate scores in possessive ball-sports: The case of handball. European Journal of Operational Research 304(3): 1099–1112 . Skellam [1946] Skellam, J. 1946. The frequency distribution of the difference between two Poisson variates belonging to different populations. Journal of the Royal Statistical Society. Series A 109(3): 296–296 . Smiatek and Heuer [2012] Smiatek, J. and A. Heuer. 2012. A statistical view on team handball results: home advantage, team fitness and prediction of match outcomes. arXiv preprint arXiv:1207.0700 . Tomy and Veena [2022] Tomy, L. and G. Veena. 2022. A retrospective study on Skellam and related distributions. Austrian Journal of Statistics 51(1): 102–111 . Van Eetvelde et al. [2023] Van Eetvelde, H., L.M. Hvattum, and C. Ley. 2023. The probabilistic final standing calculator: a fair stochastic tool to handle abruptly stopped football seasons. AStA Advances in Statistical Analysis 107(1-2): 251–269 . Volossovitch and Debanne [2021] Volossovitch, A. and T. Debanne. 2021. Home advantage in handball. Home Advantage in Sport: Causes and the Effect on Performance: 220–227 . Skellam, J. 1946. The frequency distribution of the difference between two Poisson variates belonging to different populations. Journal of the Royal Statistical Society. Series A 109(3): 296–296 . Smiatek and Heuer [2012] Smiatek, J. and A. Heuer. 2012. A statistical view on team handball results: home advantage, team fitness and prediction of match outcomes. arXiv preprint arXiv:1207.0700 . Tomy and Veena [2022] Tomy, L. and G. Veena. 2022. A retrospective study on Skellam and related distributions. Austrian Journal of Statistics 51(1): 102–111 . Van Eetvelde et al. [2023] Van Eetvelde, H., L.M. Hvattum, and C. Ley. 2023. The probabilistic final standing calculator: a fair stochastic tool to handle abruptly stopped football seasons. AStA Advances in Statistical Analysis 107(1-2): 251–269 . Volossovitch and Debanne [2021] Volossovitch, A. and T. Debanne. 2021. Home advantage in handball. Home Advantage in Sport: Causes and the Effect on Performance: 220–227 . Smiatek, J. and A. Heuer. 2012. A statistical view on team handball results: home advantage, team fitness and prediction of match outcomes. arXiv preprint arXiv:1207.0700 . Tomy and Veena [2022] Tomy, L. and G. Veena. 2022. A retrospective study on Skellam and related distributions. Austrian Journal of Statistics 51(1): 102–111 . Van Eetvelde et al. [2023] Van Eetvelde, H., L.M. Hvattum, and C. Ley. 2023. The probabilistic final standing calculator: a fair stochastic tool to handle abruptly stopped football seasons. AStA Advances in Statistical Analysis 107(1-2): 251–269 . Volossovitch and Debanne [2021] Volossovitch, A. and T. Debanne. 2021. Home advantage in handball. Home Advantage in Sport: Causes and the Effect on Performance: 220–227 . Tomy, L. and G. Veena. 2022. A retrospective study on Skellam and related distributions. Austrian Journal of Statistics 51(1): 102–111 . Van Eetvelde et al. [2023] Van Eetvelde, H., L.M. Hvattum, and C. Ley. 2023. The probabilistic final standing calculator: a fair stochastic tool to handle abruptly stopped football seasons. AStA Advances in Statistical Analysis 107(1-2): 251–269 . Volossovitch and Debanne [2021] Volossovitch, A. and T. Debanne. 2021. Home advantage in handball. Home Advantage in Sport: Causes and the Effect on Performance: 220–227 . Van Eetvelde, H., L.M. Hvattum, and C. Ley. 2023. The probabilistic final standing calculator: a fair stochastic tool to handle abruptly stopped football seasons. AStA Advances in Statistical Analysis 107(1-2): 251–269 . Volossovitch and Debanne [2021] Volossovitch, A. and T. Debanne. 2021. Home advantage in handball. Home Advantage in Sport: Causes and the Effect on Performance: 220–227 . Volossovitch, A. and T. Debanne. 2021. Home advantage in handball. Home Advantage in Sport: Causes and the Effect on Performance: 220–227 .
- Demand for live betting: An analysis using state-space models. Applied Stochastic Models in Business and Industry . Pelechrinis and Winston [2021] Pelechrinis, K. and W. Winston. 2021. A Skellam regression model for quantifying positional value in soccer. Journal of Quantitative Analysis in Sports 17(3): 187–201 . Prieto et al. [2016] Prieto, J., M.Á. Gómez, A. Volossovitch, and J. Sampaio. 2016. Effects of team timeouts on the teams’ scoring performance in elite handball close games. Kinesiology 48(1.): 115–123 . Singh et al. [2023] Singh, A., P. Scarf, and R. Baker. 2023. A unified theory for bivariate scores in possessive ball-sports: The case of handball. European Journal of Operational Research 304(3): 1099–1112 . Skellam [1946] Skellam, J. 1946. The frequency distribution of the difference between two Poisson variates belonging to different populations. Journal of the Royal Statistical Society. Series A 109(3): 296–296 . Smiatek and Heuer [2012] Smiatek, J. and A. Heuer. 2012. A statistical view on team handball results: home advantage, team fitness and prediction of match outcomes. arXiv preprint arXiv:1207.0700 . Tomy and Veena [2022] Tomy, L. and G. Veena. 2022. A retrospective study on Skellam and related distributions. Austrian Journal of Statistics 51(1): 102–111 . Van Eetvelde et al. [2023] Van Eetvelde, H., L.M. Hvattum, and C. Ley. 2023. The probabilistic final standing calculator: a fair stochastic tool to handle abruptly stopped football seasons. AStA Advances in Statistical Analysis 107(1-2): 251–269 . Volossovitch and Debanne [2021] Volossovitch, A. and T. Debanne. 2021. Home advantage in handball. Home Advantage in Sport: Causes and the Effect on Performance: 220–227 . Pelechrinis, K. and W. Winston. 2021. A Skellam regression model for quantifying positional value in soccer. Journal of Quantitative Analysis in Sports 17(3): 187–201 . Prieto et al. [2016] Prieto, J., M.Á. Gómez, A. Volossovitch, and J. Sampaio. 2016. Effects of team timeouts on the teams’ scoring performance in elite handball close games. Kinesiology 48(1.): 115–123 . Singh et al. [2023] Singh, A., P. Scarf, and R. Baker. 2023. A unified theory for bivariate scores in possessive ball-sports: The case of handball. European Journal of Operational Research 304(3): 1099–1112 . Skellam [1946] Skellam, J. 1946. The frequency distribution of the difference between two Poisson variates belonging to different populations. Journal of the Royal Statistical Society. Series A 109(3): 296–296 . Smiatek and Heuer [2012] Smiatek, J. and A. Heuer. 2012. A statistical view on team handball results: home advantage, team fitness and prediction of match outcomes. arXiv preprint arXiv:1207.0700 . Tomy and Veena [2022] Tomy, L. and G. Veena. 2022. A retrospective study on Skellam and related distributions. Austrian Journal of Statistics 51(1): 102–111 . Van Eetvelde et al. [2023] Van Eetvelde, H., L.M. Hvattum, and C. Ley. 2023. The probabilistic final standing calculator: a fair stochastic tool to handle abruptly stopped football seasons. AStA Advances in Statistical Analysis 107(1-2): 251–269 . Volossovitch and Debanne [2021] Volossovitch, A. and T. Debanne. 2021. Home advantage in handball. Home Advantage in Sport: Causes and the Effect on Performance: 220–227 . Prieto, J., M.Á. Gómez, A. Volossovitch, and J. Sampaio. 2016. Effects of team timeouts on the teams’ scoring performance in elite handball close games. Kinesiology 48(1.): 115–123 . Singh et al. [2023] Singh, A., P. Scarf, and R. Baker. 2023. A unified theory for bivariate scores in possessive ball-sports: The case of handball. European Journal of Operational Research 304(3): 1099–1112 . Skellam [1946] Skellam, J. 1946. The frequency distribution of the difference between two Poisson variates belonging to different populations. Journal of the Royal Statistical Society. Series A 109(3): 296–296 . Smiatek and Heuer [2012] Smiatek, J. and A. Heuer. 2012. A statistical view on team handball results: home advantage, team fitness and prediction of match outcomes. arXiv preprint arXiv:1207.0700 . Tomy and Veena [2022] Tomy, L. and G. Veena. 2022. A retrospective study on Skellam and related distributions. Austrian Journal of Statistics 51(1): 102–111 . Van Eetvelde et al. [2023] Van Eetvelde, H., L.M. Hvattum, and C. Ley. 2023. The probabilistic final standing calculator: a fair stochastic tool to handle abruptly stopped football seasons. AStA Advances in Statistical Analysis 107(1-2): 251–269 . Volossovitch and Debanne [2021] Volossovitch, A. and T. Debanne. 2021. Home advantage in handball. Home Advantage in Sport: Causes and the Effect on Performance: 220–227 . Singh, A., P. Scarf, and R. Baker. 2023. A unified theory for bivariate scores in possessive ball-sports: The case of handball. European Journal of Operational Research 304(3): 1099–1112 . Skellam [1946] Skellam, J. 1946. The frequency distribution of the difference between two Poisson variates belonging to different populations. Journal of the Royal Statistical Society. Series A 109(3): 296–296 . Smiatek and Heuer [2012] Smiatek, J. and A. Heuer. 2012. A statistical view on team handball results: home advantage, team fitness and prediction of match outcomes. arXiv preprint arXiv:1207.0700 . Tomy and Veena [2022] Tomy, L. and G. Veena. 2022. A retrospective study on Skellam and related distributions. Austrian Journal of Statistics 51(1): 102–111 . Van Eetvelde et al. [2023] Van Eetvelde, H., L.M. Hvattum, and C. Ley. 2023. The probabilistic final standing calculator: a fair stochastic tool to handle abruptly stopped football seasons. AStA Advances in Statistical Analysis 107(1-2): 251–269 . Volossovitch and Debanne [2021] Volossovitch, A. and T. Debanne. 2021. Home advantage in handball. Home Advantage in Sport: Causes and the Effect on Performance: 220–227 . Skellam, J. 1946. The frequency distribution of the difference between two Poisson variates belonging to different populations. Journal of the Royal Statistical Society. Series A 109(3): 296–296 . Smiatek and Heuer [2012] Smiatek, J. and A. Heuer. 2012. A statistical view on team handball results: home advantage, team fitness and prediction of match outcomes. arXiv preprint arXiv:1207.0700 . Tomy and Veena [2022] Tomy, L. and G. Veena. 2022. A retrospective study on Skellam and related distributions. Austrian Journal of Statistics 51(1): 102–111 . Van Eetvelde et al. [2023] Van Eetvelde, H., L.M. Hvattum, and C. Ley. 2023. The probabilistic final standing calculator: a fair stochastic tool to handle abruptly stopped football seasons. AStA Advances in Statistical Analysis 107(1-2): 251–269 . Volossovitch and Debanne [2021] Volossovitch, A. and T. Debanne. 2021. Home advantage in handball. Home Advantage in Sport: Causes and the Effect on Performance: 220–227 . Smiatek, J. and A. Heuer. 2012. A statistical view on team handball results: home advantage, team fitness and prediction of match outcomes. arXiv preprint arXiv:1207.0700 . Tomy and Veena [2022] Tomy, L. and G. Veena. 2022. A retrospective study on Skellam and related distributions. Austrian Journal of Statistics 51(1): 102–111 . Van Eetvelde et al. [2023] Van Eetvelde, H., L.M. Hvattum, and C. Ley. 2023. The probabilistic final standing calculator: a fair stochastic tool to handle abruptly stopped football seasons. AStA Advances in Statistical Analysis 107(1-2): 251–269 . Volossovitch and Debanne [2021] Volossovitch, A. and T. Debanne. 2021. Home advantage in handball. Home Advantage in Sport: Causes and the Effect on Performance: 220–227 . Tomy, L. and G. Veena. 2022. A retrospective study on Skellam and related distributions. Austrian Journal of Statistics 51(1): 102–111 . Van Eetvelde et al. [2023] Van Eetvelde, H., L.M. Hvattum, and C. Ley. 2023. The probabilistic final standing calculator: a fair stochastic tool to handle abruptly stopped football seasons. AStA Advances in Statistical Analysis 107(1-2): 251–269 . Volossovitch and Debanne [2021] Volossovitch, A. and T. Debanne. 2021. Home advantage in handball. Home Advantage in Sport: Causes and the Effect on Performance: 220–227 . Van Eetvelde, H., L.M. Hvattum, and C. Ley. 2023. The probabilistic final standing calculator: a fair stochastic tool to handle abruptly stopped football seasons. AStA Advances in Statistical Analysis 107(1-2): 251–269 . Volossovitch and Debanne [2021] Volossovitch, A. and T. Debanne. 2021. Home advantage in handball. Home Advantage in Sport: Causes and the Effect on Performance: 220–227 . Volossovitch, A. and T. Debanne. 2021. Home advantage in handball. Home Advantage in Sport: Causes and the Effect on Performance: 220–227 .
- A Skellam regression model for quantifying positional value in soccer. Journal of Quantitative Analysis in Sports 17(3): 187–201 . Prieto et al. [2016] Prieto, J., M.Á. Gómez, A. Volossovitch, and J. Sampaio. 2016. Effects of team timeouts on the teams’ scoring performance in elite handball close games. Kinesiology 48(1.): 115–123 . Singh et al. [2023] Singh, A., P. Scarf, and R. Baker. 2023. A unified theory for bivariate scores in possessive ball-sports: The case of handball. European Journal of Operational Research 304(3): 1099–1112 . Skellam [1946] Skellam, J. 1946. The frequency distribution of the difference between two Poisson variates belonging to different populations. Journal of the Royal Statistical Society. Series A 109(3): 296–296 . Smiatek and Heuer [2012] Smiatek, J. and A. Heuer. 2012. A statistical view on team handball results: home advantage, team fitness and prediction of match outcomes. arXiv preprint arXiv:1207.0700 . Tomy and Veena [2022] Tomy, L. and G. Veena. 2022. A retrospective study on Skellam and related distributions. Austrian Journal of Statistics 51(1): 102–111 . Van Eetvelde et al. [2023] Van Eetvelde, H., L.M. Hvattum, and C. Ley. 2023. The probabilistic final standing calculator: a fair stochastic tool to handle abruptly stopped football seasons. AStA Advances in Statistical Analysis 107(1-2): 251–269 . Volossovitch and Debanne [2021] Volossovitch, A. and T. Debanne. 2021. Home advantage in handball. Home Advantage in Sport: Causes and the Effect on Performance: 220–227 . Prieto, J., M.Á. Gómez, A. Volossovitch, and J. Sampaio. 2016. Effects of team timeouts on the teams’ scoring performance in elite handball close games. Kinesiology 48(1.): 115–123 . Singh et al. [2023] Singh, A., P. Scarf, and R. Baker. 2023. A unified theory for bivariate scores in possessive ball-sports: The case of handball. European Journal of Operational Research 304(3): 1099–1112 . Skellam [1946] Skellam, J. 1946. The frequency distribution of the difference between two Poisson variates belonging to different populations. Journal of the Royal Statistical Society. Series A 109(3): 296–296 . Smiatek and Heuer [2012] Smiatek, J. and A. Heuer. 2012. A statistical view on team handball results: home advantage, team fitness and prediction of match outcomes. arXiv preprint arXiv:1207.0700 . Tomy and Veena [2022] Tomy, L. and G. Veena. 2022. A retrospective study on Skellam and related distributions. Austrian Journal of Statistics 51(1): 102–111 . Van Eetvelde et al. [2023] Van Eetvelde, H., L.M. Hvattum, and C. Ley. 2023. The probabilistic final standing calculator: a fair stochastic tool to handle abruptly stopped football seasons. AStA Advances in Statistical Analysis 107(1-2): 251–269 . Volossovitch and Debanne [2021] Volossovitch, A. and T. Debanne. 2021. Home advantage in handball. Home Advantage in Sport: Causes and the Effect on Performance: 220–227 . Singh, A., P. Scarf, and R. Baker. 2023. A unified theory for bivariate scores in possessive ball-sports: The case of handball. European Journal of Operational Research 304(3): 1099–1112 . Skellam [1946] Skellam, J. 1946. The frequency distribution of the difference between two Poisson variates belonging to different populations. Journal of the Royal Statistical Society. Series A 109(3): 296–296 . Smiatek and Heuer [2012] Smiatek, J. and A. Heuer. 2012. A statistical view on team handball results: home advantage, team fitness and prediction of match outcomes. arXiv preprint arXiv:1207.0700 . Tomy and Veena [2022] Tomy, L. and G. Veena. 2022. A retrospective study on Skellam and related distributions. Austrian Journal of Statistics 51(1): 102–111 . Van Eetvelde et al. [2023] Van Eetvelde, H., L.M. Hvattum, and C. Ley. 2023. The probabilistic final standing calculator: a fair stochastic tool to handle abruptly stopped football seasons. AStA Advances in Statistical Analysis 107(1-2): 251–269 . Volossovitch and Debanne [2021] Volossovitch, A. and T. Debanne. 2021. Home advantage in handball. Home Advantage in Sport: Causes and the Effect on Performance: 220–227 . Skellam, J. 1946. The frequency distribution of the difference between two Poisson variates belonging to different populations. Journal of the Royal Statistical Society. Series A 109(3): 296–296 . Smiatek and Heuer [2012] Smiatek, J. and A. Heuer. 2012. A statistical view on team handball results: home advantage, team fitness and prediction of match outcomes. arXiv preprint arXiv:1207.0700 . Tomy and Veena [2022] Tomy, L. and G. Veena. 2022. A retrospective study on Skellam and related distributions. Austrian Journal of Statistics 51(1): 102–111 . Van Eetvelde et al. [2023] Van Eetvelde, H., L.M. Hvattum, and C. Ley. 2023. The probabilistic final standing calculator: a fair stochastic tool to handle abruptly stopped football seasons. AStA Advances in Statistical Analysis 107(1-2): 251–269 . Volossovitch and Debanne [2021] Volossovitch, A. and T. Debanne. 2021. Home advantage in handball. Home Advantage in Sport: Causes and the Effect on Performance: 220–227 . Smiatek, J. and A. Heuer. 2012. A statistical view on team handball results: home advantage, team fitness and prediction of match outcomes. arXiv preprint arXiv:1207.0700 . Tomy and Veena [2022] Tomy, L. and G. Veena. 2022. A retrospective study on Skellam and related distributions. Austrian Journal of Statistics 51(1): 102–111 . Van Eetvelde et al. [2023] Van Eetvelde, H., L.M. Hvattum, and C. Ley. 2023. The probabilistic final standing calculator: a fair stochastic tool to handle abruptly stopped football seasons. AStA Advances in Statistical Analysis 107(1-2): 251–269 . Volossovitch and Debanne [2021] Volossovitch, A. and T. Debanne. 2021. Home advantage in handball. Home Advantage in Sport: Causes and the Effect on Performance: 220–227 . Tomy, L. and G. Veena. 2022. A retrospective study on Skellam and related distributions. Austrian Journal of Statistics 51(1): 102–111 . Van Eetvelde et al. [2023] Van Eetvelde, H., L.M. Hvattum, and C. Ley. 2023. The probabilistic final standing calculator: a fair stochastic tool to handle abruptly stopped football seasons. AStA Advances in Statistical Analysis 107(1-2): 251–269 . Volossovitch and Debanne [2021] Volossovitch, A. and T. Debanne. 2021. Home advantage in handball. Home Advantage in Sport: Causes and the Effect on Performance: 220–227 . Van Eetvelde, H., L.M. Hvattum, and C. Ley. 2023. The probabilistic final standing calculator: a fair stochastic tool to handle abruptly stopped football seasons. AStA Advances in Statistical Analysis 107(1-2): 251–269 . Volossovitch and Debanne [2021] Volossovitch, A. and T. Debanne. 2021. Home advantage in handball. Home Advantage in Sport: Causes and the Effect on Performance: 220–227 . Volossovitch, A. and T. Debanne. 2021. Home advantage in handball. Home Advantage in Sport: Causes and the Effect on Performance: 220–227 .
- Effects of team timeouts on the teams’ scoring performance in elite handball close games. Kinesiology 48(1.): 115–123 . Singh et al. [2023] Singh, A., P. Scarf, and R. Baker. 2023. A unified theory for bivariate scores in possessive ball-sports: The case of handball. European Journal of Operational Research 304(3): 1099–1112 . Skellam [1946] Skellam, J. 1946. The frequency distribution of the difference between two Poisson variates belonging to different populations. Journal of the Royal Statistical Society. Series A 109(3): 296–296 . Smiatek and Heuer [2012] Smiatek, J. and A. Heuer. 2012. A statistical view on team handball results: home advantage, team fitness and prediction of match outcomes. arXiv preprint arXiv:1207.0700 . Tomy and Veena [2022] Tomy, L. and G. Veena. 2022. A retrospective study on Skellam and related distributions. Austrian Journal of Statistics 51(1): 102–111 . Van Eetvelde et al. [2023] Van Eetvelde, H., L.M. Hvattum, and C. Ley. 2023. The probabilistic final standing calculator: a fair stochastic tool to handle abruptly stopped football seasons. AStA Advances in Statistical Analysis 107(1-2): 251–269 . Volossovitch and Debanne [2021] Volossovitch, A. and T. Debanne. 2021. Home advantage in handball. Home Advantage in Sport: Causes and the Effect on Performance: 220–227 . Singh, A., P. Scarf, and R. Baker. 2023. A unified theory for bivariate scores in possessive ball-sports: The case of handball. European Journal of Operational Research 304(3): 1099–1112 . Skellam [1946] Skellam, J. 1946. The frequency distribution of the difference between two Poisson variates belonging to different populations. Journal of the Royal Statistical Society. Series A 109(3): 296–296 . Smiatek and Heuer [2012] Smiatek, J. and A. Heuer. 2012. A statistical view on team handball results: home advantage, team fitness and prediction of match outcomes. arXiv preprint arXiv:1207.0700 . Tomy and Veena [2022] Tomy, L. and G. Veena. 2022. A retrospective study on Skellam and related distributions. Austrian Journal of Statistics 51(1): 102–111 . Van Eetvelde et al. [2023] Van Eetvelde, H., L.M. Hvattum, and C. Ley. 2023. The probabilistic final standing calculator: a fair stochastic tool to handle abruptly stopped football seasons. AStA Advances in Statistical Analysis 107(1-2): 251–269 . Volossovitch and Debanne [2021] Volossovitch, A. and T. Debanne. 2021. Home advantage in handball. Home Advantage in Sport: Causes and the Effect on Performance: 220–227 . Skellam, J. 1946. The frequency distribution of the difference between two Poisson variates belonging to different populations. Journal of the Royal Statistical Society. Series A 109(3): 296–296 . Smiatek and Heuer [2012] Smiatek, J. and A. Heuer. 2012. A statistical view on team handball results: home advantage, team fitness and prediction of match outcomes. arXiv preprint arXiv:1207.0700 . Tomy and Veena [2022] Tomy, L. and G. Veena. 2022. A retrospective study on Skellam and related distributions. Austrian Journal of Statistics 51(1): 102–111 . Van Eetvelde et al. [2023] Van Eetvelde, H., L.M. Hvattum, and C. Ley. 2023. The probabilistic final standing calculator: a fair stochastic tool to handle abruptly stopped football seasons. AStA Advances in Statistical Analysis 107(1-2): 251–269 . Volossovitch and Debanne [2021] Volossovitch, A. and T. Debanne. 2021. Home advantage in handball. Home Advantage in Sport: Causes and the Effect on Performance: 220–227 . Smiatek, J. and A. Heuer. 2012. A statistical view on team handball results: home advantage, team fitness and prediction of match outcomes. arXiv preprint arXiv:1207.0700 . Tomy and Veena [2022] Tomy, L. and G. Veena. 2022. A retrospective study on Skellam and related distributions. Austrian Journal of Statistics 51(1): 102–111 . Van Eetvelde et al. [2023] Van Eetvelde, H., L.M. Hvattum, and C. Ley. 2023. The probabilistic final standing calculator: a fair stochastic tool to handle abruptly stopped football seasons. AStA Advances in Statistical Analysis 107(1-2): 251–269 . Volossovitch and Debanne [2021] Volossovitch, A. and T. Debanne. 2021. Home advantage in handball. Home Advantage in Sport: Causes and the Effect on Performance: 220–227 . Tomy, L. and G. Veena. 2022. A retrospective study on Skellam and related distributions. Austrian Journal of Statistics 51(1): 102–111 . Van Eetvelde et al. [2023] Van Eetvelde, H., L.M. Hvattum, and C. Ley. 2023. The probabilistic final standing calculator: a fair stochastic tool to handle abruptly stopped football seasons. AStA Advances in Statistical Analysis 107(1-2): 251–269 . Volossovitch and Debanne [2021] Volossovitch, A. and T. Debanne. 2021. Home advantage in handball. Home Advantage in Sport: Causes and the Effect on Performance: 220–227 . Van Eetvelde, H., L.M. Hvattum, and C. Ley. 2023. The probabilistic final standing calculator: a fair stochastic tool to handle abruptly stopped football seasons. AStA Advances in Statistical Analysis 107(1-2): 251–269 . Volossovitch and Debanne [2021] Volossovitch, A. and T. Debanne. 2021. Home advantage in handball. Home Advantage in Sport: Causes and the Effect on Performance: 220–227 . Volossovitch, A. and T. Debanne. 2021. Home advantage in handball. Home Advantage in Sport: Causes and the Effect on Performance: 220–227 .
- A unified theory for bivariate scores in possessive ball-sports: The case of handball. European Journal of Operational Research 304(3): 1099–1112 . Skellam [1946] Skellam, J. 1946. The frequency distribution of the difference between two Poisson variates belonging to different populations. Journal of the Royal Statistical Society. Series A 109(3): 296–296 . Smiatek and Heuer [2012] Smiatek, J. and A. Heuer. 2012. A statistical view on team handball results: home advantage, team fitness and prediction of match outcomes. arXiv preprint arXiv:1207.0700 . Tomy and Veena [2022] Tomy, L. and G. Veena. 2022. A retrospective study on Skellam and related distributions. Austrian Journal of Statistics 51(1): 102–111 . Van Eetvelde et al. [2023] Van Eetvelde, H., L.M. Hvattum, and C. Ley. 2023. The probabilistic final standing calculator: a fair stochastic tool to handle abruptly stopped football seasons. AStA Advances in Statistical Analysis 107(1-2): 251–269 . Volossovitch and Debanne [2021] Volossovitch, A. and T. Debanne. 2021. Home advantage in handball. Home Advantage in Sport: Causes and the Effect on Performance: 220–227 . Skellam, J. 1946. The frequency distribution of the difference between two Poisson variates belonging to different populations. Journal of the Royal Statistical Society. Series A 109(3): 296–296 . Smiatek and Heuer [2012] Smiatek, J. and A. Heuer. 2012. A statistical view on team handball results: home advantage, team fitness and prediction of match outcomes. arXiv preprint arXiv:1207.0700 . Tomy and Veena [2022] Tomy, L. and G. Veena. 2022. A retrospective study on Skellam and related distributions. Austrian Journal of Statistics 51(1): 102–111 . Van Eetvelde et al. [2023] Van Eetvelde, H., L.M. Hvattum, and C. Ley. 2023. The probabilistic final standing calculator: a fair stochastic tool to handle abruptly stopped football seasons. AStA Advances in Statistical Analysis 107(1-2): 251–269 . Volossovitch and Debanne [2021] Volossovitch, A. and T. Debanne. 2021. Home advantage in handball. Home Advantage in Sport: Causes and the Effect on Performance: 220–227 . Smiatek, J. and A. Heuer. 2012. A statistical view on team handball results: home advantage, team fitness and prediction of match outcomes. arXiv preprint arXiv:1207.0700 . Tomy and Veena [2022] Tomy, L. and G. Veena. 2022. A retrospective study on Skellam and related distributions. Austrian Journal of Statistics 51(1): 102–111 . Van Eetvelde et al. [2023] Van Eetvelde, H., L.M. Hvattum, and C. Ley. 2023. The probabilistic final standing calculator: a fair stochastic tool to handle abruptly stopped football seasons. AStA Advances in Statistical Analysis 107(1-2): 251–269 . Volossovitch and Debanne [2021] Volossovitch, A. and T. Debanne. 2021. Home advantage in handball. Home Advantage in Sport: Causes and the Effect on Performance: 220–227 . Tomy, L. and G. Veena. 2022. A retrospective study on Skellam and related distributions. Austrian Journal of Statistics 51(1): 102–111 . Van Eetvelde et al. [2023] Van Eetvelde, H., L.M. Hvattum, and C. Ley. 2023. The probabilistic final standing calculator: a fair stochastic tool to handle abruptly stopped football seasons. AStA Advances in Statistical Analysis 107(1-2): 251–269 . Volossovitch and Debanne [2021] Volossovitch, A. and T. Debanne. 2021. Home advantage in handball. Home Advantage in Sport: Causes and the Effect on Performance: 220–227 . Van Eetvelde, H., L.M. Hvattum, and C. Ley. 2023. The probabilistic final standing calculator: a fair stochastic tool to handle abruptly stopped football seasons. AStA Advances in Statistical Analysis 107(1-2): 251–269 . Volossovitch and Debanne [2021] Volossovitch, A. and T. Debanne. 2021. Home advantage in handball. Home Advantage in Sport: Causes and the Effect on Performance: 220–227 . Volossovitch, A. and T. Debanne. 2021. Home advantage in handball. Home Advantage in Sport: Causes and the Effect on Performance: 220–227 .
- Skellam, J. 1946. The frequency distribution of the difference between two Poisson variates belonging to different populations. Journal of the Royal Statistical Society. Series A 109(3): 296–296 . Smiatek and Heuer [2012] Smiatek, J. and A. Heuer. 2012. A statistical view on team handball results: home advantage, team fitness and prediction of match outcomes. arXiv preprint arXiv:1207.0700 . Tomy and Veena [2022] Tomy, L. and G. Veena. 2022. A retrospective study on Skellam and related distributions. Austrian Journal of Statistics 51(1): 102–111 . Van Eetvelde et al. [2023] Van Eetvelde, H., L.M. Hvattum, and C. Ley. 2023. The probabilistic final standing calculator: a fair stochastic tool to handle abruptly stopped football seasons. AStA Advances in Statistical Analysis 107(1-2): 251–269 . Volossovitch and Debanne [2021] Volossovitch, A. and T. Debanne. 2021. Home advantage in handball. Home Advantage in Sport: Causes and the Effect on Performance: 220–227 . Smiatek, J. and A. Heuer. 2012. A statistical view on team handball results: home advantage, team fitness and prediction of match outcomes. arXiv preprint arXiv:1207.0700 . Tomy and Veena [2022] Tomy, L. and G. Veena. 2022. A retrospective study on Skellam and related distributions. Austrian Journal of Statistics 51(1): 102–111 . Van Eetvelde et al. [2023] Van Eetvelde, H., L.M. Hvattum, and C. Ley. 2023. The probabilistic final standing calculator: a fair stochastic tool to handle abruptly stopped football seasons. AStA Advances in Statistical Analysis 107(1-2): 251–269 . Volossovitch and Debanne [2021] Volossovitch, A. and T. Debanne. 2021. Home advantage in handball. Home Advantage in Sport: Causes and the Effect on Performance: 220–227 . Tomy, L. and G. Veena. 2022. A retrospective study on Skellam and related distributions. Austrian Journal of Statistics 51(1): 102–111 . Van Eetvelde et al. [2023] Van Eetvelde, H., L.M. Hvattum, and C. Ley. 2023. The probabilistic final standing calculator: a fair stochastic tool to handle abruptly stopped football seasons. AStA Advances in Statistical Analysis 107(1-2): 251–269 . Volossovitch and Debanne [2021] Volossovitch, A. and T. Debanne. 2021. Home advantage in handball. Home Advantage in Sport: Causes and the Effect on Performance: 220–227 . Van Eetvelde, H., L.M. Hvattum, and C. Ley. 2023. The probabilistic final standing calculator: a fair stochastic tool to handle abruptly stopped football seasons. AStA Advances in Statistical Analysis 107(1-2): 251–269 . Volossovitch and Debanne [2021] Volossovitch, A. and T. Debanne. 2021. Home advantage in handball. Home Advantage in Sport: Causes and the Effect on Performance: 220–227 . Volossovitch, A. and T. Debanne. 2021. Home advantage in handball. Home Advantage in Sport: Causes and the Effect on Performance: 220–227 .
- A statistical view on team handball results: home advantage, team fitness and prediction of match outcomes. arXiv preprint arXiv:1207.0700 . Tomy and Veena [2022] Tomy, L. and G. Veena. 2022. A retrospective study on Skellam and related distributions. Austrian Journal of Statistics 51(1): 102–111 . Van Eetvelde et al. [2023] Van Eetvelde, H., L.M. Hvattum, and C. Ley. 2023. The probabilistic final standing calculator: a fair stochastic tool to handle abruptly stopped football seasons. AStA Advances in Statistical Analysis 107(1-2): 251–269 . Volossovitch and Debanne [2021] Volossovitch, A. and T. Debanne. 2021. Home advantage in handball. Home Advantage in Sport: Causes and the Effect on Performance: 220–227 . Tomy, L. and G. Veena. 2022. A retrospective study on Skellam and related distributions. Austrian Journal of Statistics 51(1): 102–111 . Van Eetvelde et al. [2023] Van Eetvelde, H., L.M. Hvattum, and C. Ley. 2023. The probabilistic final standing calculator: a fair stochastic tool to handle abruptly stopped football seasons. AStA Advances in Statistical Analysis 107(1-2): 251–269 . Volossovitch and Debanne [2021] Volossovitch, A. and T. Debanne. 2021. Home advantage in handball. Home Advantage in Sport: Causes and the Effect on Performance: 220–227 . Van Eetvelde, H., L.M. Hvattum, and C. Ley. 2023. The probabilistic final standing calculator: a fair stochastic tool to handle abruptly stopped football seasons. AStA Advances in Statistical Analysis 107(1-2): 251–269 . Volossovitch and Debanne [2021] Volossovitch, A. and T. Debanne. 2021. Home advantage in handball. Home Advantage in Sport: Causes and the Effect on Performance: 220–227 . Volossovitch, A. and T. Debanne. 2021. Home advantage in handball. Home Advantage in Sport: Causes and the Effect on Performance: 220–227 .
- A retrospective study on Skellam and related distributions. Austrian Journal of Statistics 51(1): 102–111 . Van Eetvelde et al. [2023] Van Eetvelde, H., L.M. Hvattum, and C. Ley. 2023. The probabilistic final standing calculator: a fair stochastic tool to handle abruptly stopped football seasons. AStA Advances in Statistical Analysis 107(1-2): 251–269 . Volossovitch and Debanne [2021] Volossovitch, A. and T. Debanne. 2021. Home advantage in handball. Home Advantage in Sport: Causes and the Effect on Performance: 220–227 . Van Eetvelde, H., L.M. Hvattum, and C. Ley. 2023. The probabilistic final standing calculator: a fair stochastic tool to handle abruptly stopped football seasons. AStA Advances in Statistical Analysis 107(1-2): 251–269 . Volossovitch and Debanne [2021] Volossovitch, A. and T. Debanne. 2021. Home advantage in handball. Home Advantage in Sport: Causes and the Effect on Performance: 220–227 . Volossovitch, A. and T. Debanne. 2021. Home advantage in handball. Home Advantage in Sport: Causes and the Effect on Performance: 220–227 .
- The probabilistic final standing calculator: a fair stochastic tool to handle abruptly stopped football seasons. AStA Advances in Statistical Analysis 107(1-2): 251–269 . Volossovitch and Debanne [2021] Volossovitch, A. and T. Debanne. 2021. Home advantage in handball. Home Advantage in Sport: Causes and the Effect on Performance: 220–227 . Volossovitch, A. and T. Debanne. 2021. Home advantage in handball. Home Advantage in Sport: Causes and the Effect on Performance: 220–227 .
- Home advantage in handball. Home Advantage in Sport: Causes and the Effect on Performance: 220–227 .
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