A Tauberian theorem for nonexpansive operators and applications to zero-sum stochastic games

Abstract

We prove a Tauberian theorem for nonexpansive operators, and apply it to the model of zero-sum stochastic game. Under mild assumptions, we prove that the value of the lambda-discounted game vlambda converges uniformly when lambda goes to 0 if and only if the value of the n-stage game vn converges uniformly when n goes to infinity. This generalizes the Tauberian theorem of Lehrer and Sorin (1992) to the two-player zero-sum case. We also provide the first example of a stochastic game with public signals on the state and perfect observation of actions, with finite state space, signal sets and action sets, in which for some initial state k1 known by both players, (vlambda(k1)) and (vn(k1)) converge to distinct limits.