Dynamics on Games: Simulation-Based Techniques and Applications to Routing

We consider multi-player games played on graphs, in which the players aim at fulfilling their own (not necessarily antagonistic) objectives. In the spirit of evolutionary game theory, we suppose that the players have the right to repeatedly update their respective strategies (for instance, to improve the outcome w.r.t. the current strategy profile). This generates a dynamics in the game which may eventually stabilise to an equilibrium. The objective of the present paper is twofold. First, we aim at drawing a general framework to reason about the termination of such dynamics. In particular, we identify preorders on games (inspired from the classical notion of simulation between transitions systems, and from the notion of graph minor) which preserve termination of dynamics. Second, we show the applicability of the previously developed framework to interdomain routing problems.

[1]  Giuseppe Di Battista,et al.  wheel + ring = reel: the impact of route filtering on the stability of policy routing , 2009, 2009 17th IEEE International Conference on Network Protocols.

[2]  Giuseppe Di Battista,et al.  Wheel + Ring = Reel: The Impact of Route Filtering on the Stability of Policy Routing , 2011, IEEE/ACM Transactions on Networking.

[3]  Wolfgang Thomas,et al.  On the Synthesis of Strategies in Infinite Games , 1995, STACS.

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

[5]  Reinhard Selten Spieltheoretische Behandlung eines Oligopolmodells mit Nachfrageträgheit , 2016 .

[6]  Arno Pauly,et al.  A Semi-Potential for Finite and Infinite Sequential Games (Extended Abstract) , 2016, GandALF.

[7]  Ariel Rubinstein,et al.  A Course in Game Theory , 1995 .

[8]  Lixin Gao,et al.  Stable Internet routing without global coordination , 2000, SIGMETRICS '00.

[9]  Neil Lutz,et al.  Dynamics at the Boundary of Game Theory and Distributed Computing , 2015, ACM Trans. Economics and Comput..

[10]  Gordon T. Wilfong,et al.  The stable paths problem and interdomain routing , 2002, TNET.

[11]  Thomas Brihaye,et al.  Dynamics and Coalitions in Sequential Games , 2017, GandALF.

[12]  Alexander J. T. Gurney,et al.  Asynchronous convergence of policy-rich distributed bellman-ford routing protocols , 2018, SIGCOMM.

[13]  L. Lovász Graph minor theory , 2005 .

[14]  Amir Pnueli,et al.  On the synthesis of a reactive module , 1989, POPL '89.

[15]  Tim Roughgarden,et al.  Algorithmic Game Theory , 2007 .

[16]  Michael Schapira,et al.  Searching for Stability in Interdomain Routing , 2009, IEEE INFOCOM 2009.