Hiders' Game

Abstract: Consider spies infiltrating a network or dissidents secretly organising under a dictatorship. Such scenarios can be cast as adversarial social network analysis problems involving nodes connecting while evading network analysis tools, e.g., centrality measures or community detection algorithms. While most works consider unilateral actions of an evader, we define a network formation game. Here, several newcomers attempt to rewire the existing social network, to become directly tied with the high centrality players, while keeping their own centrality small. This extends the network formation literature, including the Jackson and Wolinsky model, by considering additional strategies and new utility functions. We algorithmically demonstrate that the pairwise Nash stable networks (\PANS) constitute a lattice, where the stronger \PANS{} lattice is nested in the weaker \PANS. We also prove that inclusion in \PANS{} implies less utility for everyone. Furthermore, we bound the social efficiency of \PANS{} and directly connect efficiency to the strength of \PANS. Finally, we characterise the \PANS{} in practically important settings, deriving tight efficiency bounds. Our results suggest the hiders how to interconnect stably and efficiently. Additionally, the results let us detect infiltrated networks, enhancing the social network analysis tools. Besides the theoretical development, this is applicable to fighting terrorism and espionage.