In this paper, we propose Posterior Sampling Reinforcement Learning for Zero-sum Stochastic Games (PSRL-ZSG), the first online learning algorithm that achieves Bayesian regret bound of O(HSAT) in the infinite-horizon zero-sum stochastic games with average-reward criterion. Here H is an upper bound on the span of the bias function, S is the number of states, A is the number of joint actions and T is the horizon. We consider the online setting where the opponent can not be controlled and can take any arbitrary time-adaptive history-dependent strategy. Our regret bound improves on the best existing regret bound of O(3DS2AT2) by Wei et al. (2017) under the same assumption and matches the theoretical lower bound in T.
@article{arxiv.2109.03396,
title = {A Bayesian Learning Algorithm for Unknown Zero-sum Stochastic Games with an Arbitrary Opponent},
author = {Mehdi Jafarnia-Jahromi and Rahul Jain and Ashutosh Nayyar},
journal= {arXiv preprint arXiv:2109.03396},
year = {2024}
}