Faster Rates for No-Regret Learning in General Games via Cautious Optimism
Abstract
We establish the first uncoupled learning algorithm that attains O(n 2 d T) per-player regret in multi-player general-sum games, where n is the number of players, d is the number of actions available to each player, and T is the number of repetitions of the game. Our results exponentially improve the dependence on d compared to the O(n\, d T) regret attainable by Log-Regularized Lifted Optimistic FTRL [Far+22c], and also reduce the dependence on the number of iterations T from 4 T to T compared to Optimistic Hedge, the previously well-studied algorithm with O(n d 4 T) regret [DFG21]. Our algorithm is obtained by combining the classic Optimistic Multiplicative Weights Update (OMWU) with an adaptive, non-monotonic learning rate that paces the learning process of the players, making them more cautious when their regret becomes too negative.
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