Efficient Local Search in Coordination Games on Graphs

We study strategic games on weighted directed graphs, where the payoff of a player is defined as the sum of the weights on the edges from players who chose the same strategy augmented by a fixed non-negative bonus for picking a given strategy. These games capture the idea of coordination in the absence of globally common strategies. Prior work shows that the problem of determining the existence of a pure Nash equilibrium for these games is NP-complete already for graphs with all weights equal to one and no bonuses. However, for several classes of graphs (e.g. DAGs and cliques) pure Nash equilibria or even strong equilibria always exist and can be found by simply following a particular improvement or coalition-improvement path, respectively. In this paper we identify several natural classes of graphs for which a finite improvement or coalition-improvement path of polynomial length always exists, and, as a consequence, a Nash equilibrium or strong equilibrium in them can be found in polynomial time. We also argue that these results are optimal in the sense that in natural generalisations of these classes of graphs, a pure Nash equilibrium may not even exist.

[1]  Christos H. Papadimitriou,et al.  The complexity of game dynamics: BGP oscillations, sink equilibria, and beyond , 2008, SODA '08.

[2]  Jason R. Marden,et al.  Regret based dynamics: convergence in weakly acyclic games , 2007, AAMAS '07.

[3]  Pascal Lenzner,et al.  On dynamics in selfish network creation , 2013, SPAA.

[4]  Christos H. Papadimitriou,et al.  The complexity of pure Nash equilibria , 2004, STOC '04.

[5]  Michael Schapira,et al.  Weakly-Acyclic (Internet) Routing Games , 2011, Theory of Computing Systems.

[6]  Moshe Tennenholtz,et al.  Strong and Correlated Strong Equilibria in Monotone Congestion Games , 2006, WINE.

[7]  K. Ruben Brokkelkamp,et al.  Convergence of Ordered Improvement Paths in Generalized Congestion Games , 2012, SAGT.

[8]  I. Milchtaich,et al.  Congestion Games with Player-Specific Payoff Functions , 1996 .

[9]  R. Lathe Phd by thesis , 1988, Nature.

[10]  Krzysztof R. Apt,et al.  Coordination Games on Directed Graphs , 2015, TARK.

[11]  R. Rosenthal A class of games possessing pure-strategy Nash equilibria , 1973 .

[12]  Krzysztof R. Apt,et al.  Coordination Games on Graphs (Extended Abstract) , 2014, WINE.

[13]  Berthold Vöcking,et al.  Proceedings of the 25th ACM symposium on Parallelism in algorithms and architectures , 2013 .

[14]  Krzysztof R. Apt,et al.  A classification of weakly acyclic games , 2012, SAGT.

[15]  L. Shapley,et al.  Potential Games , 1994 .

[16]  Michael Schapira,et al.  Interdomain routing and games , 2008, SIAM J. Comput..

[17]  Mona Rahn,et al.  Efficient Equilibria in Polymatrix Coordination Games , 2015, MFCS.

[18]  Berthold Vöcking,et al.  On the Impact of Combinatorial Structure on Congestion Games , 2006, 2006 47th Annual IEEE Symposium on Foundations of Computer Science (FOCS'06).

[19]  Martin Hoefer,et al.  Cost sharing and clustering under distributed competition , 2007 .

[20]  Robert J. Aumann,et al.  16. Acceptable Points in General Cooperative n-Person Games , 1959 .

[21]  Igal Milchtaich Schedulers, Potentials and Weak Potentials in Weakly Acyclic Games , 2013 .

[22]  H. Young,et al.  The Evolution of Conventions , 1993 .

[23]  Marcello Pelillo,et al.  Clustering Games , 2014, Registration and Recognition in Images and Videos.

[24]  Alex Fabrikant,et al.  On the Structure of Weakly Acyclic Games , 2010, Theory of Computing Systems.