Playing repeated games with sublinear randomness
Abstract
We study the amount of entropy players asymptotically need to play a repeated normal-form game in a Nash equilibrium. Hub\'a\v{c}ek, Naor, and Ullman (SAGT'15, TCSys'16) gave sufficient conditions on a game for the minimal amount of randomness required to be or for all players, where is the number of repetitions. We provide a complete characterization of games in which there exists Nash equilibria of the repeated game using randomness, closing an open question posed by Budinich and Fortnow (EC'11) and Hub\'a\v{c}ek, Naor, and Ullman. Moreover, we show a 0--1 law for randomness in repeated games, showing that any repeated game either has -randomness Nash equilibria, or all of its Nash equilibria require randomness. Our techniques are general and naturally characterize the payoff space of sublinear-entropy equilibria, and could be of independent interest to the study of players with other bounded capabilities in repeated games.
Keywords
Cite
@article{arxiv.2312.13453,
title = {Playing repeated games with sublinear randomness},
author = {Farid Arthaud},
journal= {arXiv preprint arXiv:2312.13453},
year = {2023}
}
Comments
31 pages