On Tractable $\Phi$-Equilibria in Non-Concave Games
Abstract
While Online Gradient Descent and other no-regret learning procedures are known to efficiently converge to a coarse correlated equilibrium in games where each agent's utility is concave in their own strategy, this is not the case when utilities are non-concave -- a common scenario in machine learning applications involving strategies parameterized by deep neural networks, or when agents' utilities are computed by neural networks, or both. Non-concave games introduce significant game-theoretic and optimization challenges: (i) Nash equilibria may not exist; (ii) local Nash equilibria, though they exist, are intractable; and (iii) mixed Nash, correlated, and coarse correlated equilibria generally have infinite support and are intractable. To sidestep these challenges, we revisit the classical solution concept of -equilibria introduced by Greenwald and Jafari [2003], which is guaranteed to exist for an arbitrary set of strategy modifications even in non-concave games [Stolz and Lugosi, 2007]. However, the tractability of -equilibria in such games remains elusive. In this paper, we initiate the study of tractable -equilibria in non-concave games and examine several natural families of strategy modifications. We show that when is finite, there exists an efficient uncoupled learning algorithm that converges to the corresponding -equilibria. Additionally, we explore cases where is infinite but consists of local modifications. We show that approximating local -equilibria beyond the first-order stationary regime is computationally intractable. In contrast, within this regime, we show Online Gradient Descent efficiently converges to -equilibria for several natural infinite families of modifications, including a new structural family of modifications inspired by the well-studied proximal operator.
Keywords
Cite
@article{arxiv.2403.08171,
title = {On Tractable $\Phi$-Equilibria in Non-Concave Games},
author = {Yang Cai and Constantinos Daskalakis and Haipeng Luo and Chen-Yu Wei and Weiqiang Zheng},
journal= {arXiv preprint arXiv:2403.08171},
year = {2025}
}
Comments
59 pages. The abstract has been shortened to meet the arXiv requirement. A preliminary version of the paper has been accepted to NeurIPS 2024. Compared to the last version, this version contains updated references