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Fast Convergence of Optimistic Gradient Ascent in Network Zero-Sum Extensive Form Games

Authors :
Piliouras, Georgios
Ratliff, Lillian
Sim, Ryann
Skoulakis, Stratis
Publication Year :
2022

Abstract

The study of learning in games has thus far focused primarily on normal form games. In contrast, our understanding of learning in extensive form games (EFGs) and particularly in EFGs with many agents lags far behind, despite them being closer in nature to many real world applications. We consider the natural class of Network Zero-Sum Extensive Form Games, which combines the global zero-sum property of agent payoffs, the efficient representation of graphical games as well the expressive power of EFGs. We examine the convergence properties of Optimistic Gradient Ascent (OGA) in these games. We prove that the time-average behavior of such online learning dynamics exhibits $O(1/T)$ rate convergence to the set of Nash Equilibria. Moreover, we show that the day-to-day behavior also converges to Nash with rate $O(c^{-t})$ for some game-dependent constant $c>0$.<br />Comment: To appear in SAGT 2022

Details

Database :
arXiv
Publication Type :
Report
Accession number :
edsarx.2207.08426
Document Type :
Working Paper