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Paper detail

Representing Strategic Games and Their Equilibria in Many-Valued Logics

We introduce the notion of logical A-games for a fairly general class of algebras A of real truth-values. This concept generalizes the Boolean games of Harrenstein et al. as well as the recently defined Lukasiewicz games of Marchioni and Wooldridge. We demonstrate that a wide range of strategic n-player games can be represented as logical A-games. Moreover we show how to construct, under rather general conditions, propositional formulas in the language of A that correspond to pure and mixed Nash equilibria of logical A-games.

preprint2016arXivOpen access
Libor BěhounekPetr CintulaChris FermüllerTomáš Kroupa
math.LO
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Libor BěhounekPetr CintulaChris FermüllerTomáš Kroupa

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