English

Optimism Without Regularization: Constant Regret in Zero-Sum Games

Machine Learning 2026-01-15 v3 Computer Science and Game Theory

Abstract

This paper studies the optimistic variant of Fictitious Play for learning in two-player zero-sum games. While it is known that Optimistic FTRL -- a regularized algorithm with a bounded stepsize parameter -- obtains constant regret in this setting, we show for the first time that similar, optimal rates are also achievable without regularization: we prove for two-strategy games that Optimistic Fictitious Play (using any tiebreaking rule) obtains only constant regret, providing surprising new evidence on the ability of non-no-regret algorithms for fast learning in games. Our proof technique leverages a geometric view of Optimistic Fictitious Play in the dual space of payoff vectors, where we show a certain energy function of the iterates remains bounded over time. Additionally, we also prove a regret lower bound of Ω(T)\Omega(\sqrt{T}) for Alternating Fictitious Play. In the unregularized regime, this separates the ability of optimism and alternation in achieving o(T)o(\sqrt{T}) regret.

Keywords

Cite

@article{arxiv.2506.16736,
  title  = {Optimism Without Regularization: Constant Regret in Zero-Sum Games},
  author = {John Lazarsfeld and Georgios Piliouras and Ryann Sim and Stratis Skoulakis},
  journal= {arXiv preprint arXiv:2506.16736},
  year   = {2026}
}

Comments

NeurIPS 2025

R2 v1 2026-07-01T03:26:02.902Z