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Measurable Selection for Purely Atomic Games

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  • Ziv Hellman
  • Yehuda John Levy

Abstract

A general selection theorem is presented constructing a measurable mapping from a state space to a parameter space under the assumption that the state space can be decomposed as a collection of countable equivalence classes under a smooth equivalence relation. It is then shown how this selection theorem can be used as a general purpose tool for proving the existence of measurable equilibria in broad classes of several branches of games when an appropriate smoothness condition holds, including Bayesian games with atomic knowledge spaces, stochastic games with countable orbits, and graphical games of countable degree—examples of a subclass of games with uncountable state spaces that we term purely atomic games. Applications to repeated games with symmetric incomplete information and acceptable bets are also presented.

Suggested Citation

  • Ziv Hellman & Yehuda John Levy, 2019. "Measurable Selection for Purely Atomic Games," Econometrica, Econometric Society, vol. 87(2), pages 593-629, March.
    • Handle: RePEc:wly:emetrp:v:87:y:2019:i:2:p:593-629
    DOI: 10.3982/ECTA15479
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    Cited by:

    1. Ziv Hellman & Yehuda John Levy, 2020. "Dense Orbits of the Bayesian Updating Group Action," Working Papers 2020-04, Bar-Ilan University, Department of Economics.
    2. Ziv Hellman & Yehuda John Levy, 2020. "Equilibria Existence in Bayesian Games: Climbing the Countable Borel Equivalence Relation Hierarchy," Working Papers 2020-03, Bar-Ilan University, Department of Economics.
    3. Yannai A. Gonczarowski & Scott Duke Kominers & Ran I. Shorrer, 2019. "To Infinity and Beyond: A General Framework for Scaling Economic Theories," Papers 1906.10333, arXiv.org, revised Apr 2023.
    4. Paramahansa Pramanik & Alan M. Polansky, 2023. "Scoring a Goal Optimally in a Soccer Game Under Liouville-Like Quantum Gravity Action," SN Operations Research Forum, Springer, vol. 4(3), pages 1-39, September.

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