Papers
Topics
Authors
Recent
Search
2000 character limit reached

Stationary fluctuations of run-and-tumble particles

Published 6 Jul 2023 in math.PR, math-ph, and math.MP | (2307.02967v2)

Abstract: We study the stationary fluctuations of independent run-and-tumble particles. We prove that the joint densities of particles with given internal state converges to an infinite dimensional Ornstein-Uhlenbeck process. We also consider an interacting case, where the particles are subjected to exclusion. We then study the fluctuations of the total density, which is a non-Markovian Gaussian process, and obtain its covariance in closed form. By considering small noise limits of this non-Markovian Gaussian process, we obtain in a concrete example a large deviation rate function containing memory terms.

Definition Search Book Streamline Icon: https://streamlinehq.com
References (15)
  1. D. Aldous. Stopping Times and Tightness. The Annals of Probability, 6(2):335 – 340, 1978.
  2. Uphill in reaction-diffusion multi-species interacting particles systems. Journal of Statistical Physics, 190(8):132, 2023.
  3. T. Demaerel and C. Maes. Active processes in one dimension. Physical review. E, 97 3-1:032604, 2018.
  4. Large Deviations. AMS Chelsea Publishing Series. American Mathematical Society, 2001.
  5. C. Erignoux. Hydrodynamic limit for an active exclusion process. Mémoires de la Société Mathématique de France, 169, May 2021.
  6. Switching Interacting Particle Systems: Scaling Limits, Uphill Diffusion and Boundary Layer. Journal of Statistical Physics, 186(3):33, January 2022.
  7. Invariant measures for multilane exclusion process. arXiv preprint arXiv:2105.12974, 2021.
  8. T. Hida. Brownian Motion. Stochastic Modelling and Applied Probability. Springer New York, 2012.
  9. C. Kipnis and C. Landim. Scaling Limits of Interacting Particle Systems. Springer, 1999.
  10. M. Lifshits. Lectures on Gaussian Processes. SpringerBriefs in Mathematics. Springer Berlin Heidelberg, 2012.
  11. I. Mitoma. Tightness of Probabilities On C⁢([0,1];𝒴′)𝐶01superscript𝒴′C([0,1];\mathscr{Y}^{\prime})italic_C ( [ 0 , 1 ] ; script_Y start_POSTSUPERSCRIPT ′ end_POSTSUPERSCRIPT ) and D⁢([0,1];𝒴′)𝐷01superscript𝒴′D([0,1];\mathscr{Y}^{\prime})italic_D ( [ 0 , 1 ] ; script_Y start_POSTSUPERSCRIPT ′ end_POSTSUPERSCRIPT ). The Annals of Probability, 11(4):989 – 999, 1983.
  12. F. Redig and H. van Wiechen. Ergodic theory of multi-layer interacting particle systems. Journal of Statistical Physics, 190, 04 2023.
  13. M. Sasada. Hydrodynamic limit for two-species exclusion processes. Stochastic processes and their applications, 120(4):494–521, 2010.
  14. T. Seppäläinen. Translation invariant exclusion process (book in progress). Department of Mathematics, University of Wisconsin, 2008.
  15. B. van Ginkel and F. Redig. Equilibrium fluctuations for the symmetric exclusion process on a compact riemannian manifold. Markov Processes and Related Fields, 28(1):29–52, 2022.

Summary

No one has generated a summary of this paper yet.

Sign Up to Summarize

Paper to Video (Beta)

No one has generated a video about this paper yet.

Sign Up to Generate All Videos Subscribe on YouTube

Whiteboard

No one has generated a whiteboard explanation for this paper yet.

Sign Up to Generate

Open Problems

We haven't generated a list of open problems mentioned in this paper yet.

Generate Now

Continue Learning

We haven't generated follow-up questions for this paper yet.

Generate Now

Authors (2)

  1. Frank Redig 
  2. Hidde van Wiechen 

Collections

Sign up for free to add this paper to one or more collections.

Sign Up

Tweets

Sign up for free to view the 1 tweet with 0 likes about this paper.

Sign Up for Free