## Near-Optimal No-Regret Learning in General Games

### Constantinos Daskalakis · Maxwell Fishelson · Noah Golowich

Keywords: [ ]

[ Abstract ]
[
Thu 9 Dec 8:30 a.m. PST — 10 a.m. PST

Oral presentation: Oral Session 1: Theory
Tue 7 Dec midnight PST — 1 a.m. PST

Abstract: We show that Optimistic Hedge -- a common variant of multiplicative-weights-updates with recency bias -- attains ${\rm poly}(\log T)$ regret in multi-player general-sum games. In particular, when every player of the game uses Optimistic Hedge to iteratively update her action in response to the history of play so far, then after $T$ rounds of interaction, each player experiences total regret that is ${\rm poly}(\log T)$. Our bound improves, exponentially, the $O(T^{1/2})$ regret attainable by standard no-regret learners in games, the $O(T^{1/4})$ regret attainable by no-regret learners with recency bias (Syrgkanis et al., NeurIPS 2015), and the $O(T^{1/6})$ bound that was recently shown for Optimistic Hedge in the special case of two-player games (Chen & Peng, NeurIPS 2020). A direct corollary of our bound is that Optimistic Hedge converges to coarse correlated equilibrium in general games at a rate of $\tilde{O}(1/T)$.

Chat is not available.