Equilibria Existence in Bayesian Games: Climbing the Countable Borel Equivalence Relation Hierarchy

Ziv Hellman, Yehuda John Levy

Research output: Contribution to journalArticlepeer-review

2 Scopus citations

Abstract

The solution concept of a Bayesian equilibrium of a Bayesian game is inherently an interim concept. The corresponding ex ante solution concept has been termed a Hars'anyi equilibrium; examples have appeared in the literature showing that there are Bayesian games with uncountable state spaces that have no Bayesian approximate equilibria but do admit a Hars'anyi approximate equilibrium, thus exhibiting divergent behaviour in the ex ante and interim stages. Smoothness, a concept from descriptive set theory, has been shown in previous works to guarantee the existence of Bayesian equilibria. We show here that higher rungs in the countable Borel equivalence relation hierarchy can also shed light on equilibrium existence. In particular, hyperfiniteness, the next step above smoothness, is a sufficient condition for the existence of Hars'anyi approximate equilibria in purely atomic Bayesian games.

Original languageEnglish
Pages (from-to)367-383
Number of pages17
JournalMathematics of Operations Research
Volume47
Issue number1
DOIs
StatePublished - Feb 2022

Bibliographical note

Publisher Copyright:
© 2021 INFORMS.

Funding

Funding: Z. Hellman acknowledges research support by the Israel Science Foundation [Grant 1626/18].

FundersFunder number
Israel Science Foundation1626/18

    Keywords

    • Bayesian games
    • Borel equivalence relations
    • Equilibrium existence

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