Statistical mechanics of random two-player games

Using methods from the statistical mechanics of disordered systems, we analyze the properties of bimatrix games with random payoffs in the limit where the number of pure strategies of each player tends to infinity. We analytically calculate quantities such as the number of equilibrium points, the expected payoff, and the fraction of strategies played with nonzero probability as a function of the correlation between the payoff matrices of both players, and compare the results with numerical simulations.