arXiv:2106.03975 Abstract | arXiv Analytics

arXiv:2106.03975 [math.OC]Abstract References Reviews Resources

Equilibria in Repeated Games with Countably Many Players and Tail-Measurable Payoffs

Galit Ashkenazi-Golan, Janos Flesch, Arkadi Predtetchinski, Eilon Solan

Published 2021-06-07Version 1

We prove that every repeated game with countably many players, finite action sets, and tail-measurable payoffs admits an $\epsilon$-equilibrium, for every $\epsilon > 0$.

Categories: math.OC, cs.GT

Keywords: repeated game, equilibrium, finite action sets, tail-measurable payoffs admits

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arXiv:2106.03975 [math.OC]Abstract References Reviews Resources

Equilibria in Repeated Games with Countably Many Players and Tail-Measurable Payoffs

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arXiv:2106.03975 [math.OC]AbstractReferencesReviewsResources

Equilibria in Repeated Games with Countably Many Players and Tail-Measurable Payoffs

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arXiv:2106.03975 [math.OC]Abstract References Reviews Resources