An Efficient PTAS for Two-Strategy Anonymous Games

Abstract

We present a novel polynomial time approximation scheme for two-strategy anonymous games, in which the players' utility functions, although potentially different, do not differentiate among the identities of the other players. Our algorithm computes an eps-approximate Nash equilibrium of an n-player 2-strategy anonymous game in time poly(n) (1/eps)O(1/eps2), which significantly improves upon the running time nO(1/eps2) required by the algorithm of Daskalakis & Papadimitriou, 2007. The improved running time is based on a new structural understanding of approximate Nash equilibria: We show that, for any eps, there exists an eps-approximate Nash equilibrium in which either only O(1/eps3) players randomize, or all players who randomize use the same mixed strategy. To show this result we employ tools from the literature on Stein's Method.