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Nash equilibria of games with generalized complementarities (2407.00636v1)
Published 30 Jun 2024 in econ.TH
Abstract: To generalize complementarities for games, we introduce some conditions weaker than quasisupermodularity and the single crossing property. We prove that the Nash equilibria of a game satisfying these conditions form a nonempty complete lattice. This is a purely order-theoretic generalization of Zhou's theorem.