Markov $\alpha$-Potential Games
Abstract
We propose a new framework of Markov -potential games to study Markov games. We show that any Markov game with finite-state and finite-action is a Markov -potential game, and establish the existence of an associated -potential function. Any optimizer of an -potential function is shown to be an -stationary Nash equilibrium. We study two important classes of practically significant Markov games, Markov congestion games and the perturbed Markov team games, via the framework of Markov -potential games, with explicit characterization of an upper bound for and its relation to game parameters. Additionally, we provide a semi-infinite linear programming based formulation to obtain an upper bound for for any Markov game. Furthermore, we study two equilibrium approximation algorithms, namely the projected gradient-ascent algorithm and the sequential maximum improvement algorithm, along with their Nash regret analysis, and corroborate the results with numerical experiments.
Keywords
Cite
@article{arxiv.2305.12553,
title = {Markov $\alpha$-Potential Games},
author = {Xin Guo and Xinyu Li and Chinmay Maheshwari and Shankar Sastry and Manxi Wu},
journal= {arXiv preprint arXiv:2305.12553},
year = {2025}
}
Comments
33 pages, 5 figures