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Approximate Nash equilibria in anonymous games

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  • Daskalakis, Constantinos
  • Papadimitriou, Christos H.

Abstract

We study from an algorithmic viewpoint anonymous games[22,4,5,19]. In these games a large population of players shares the same strategy set and, while players may have different payoff functions, the payoff of each depends on her own choice of strategy and the number of the other players playing each strategy (not the identity of these players). We show that, the intractability results of [12] and [10] for general games notwithstanding, approximate mixed Nash equilibria in anonymous games can be computed in polynomial time, for any desired quality of the approximation, as long as the number of strategies is bounded by some constant. In addition, if the payoff functions have a Lipschitz continuity property, we show that an approximate pure Nash equilibrium exists, whose quality depends on the number of strategies and the Lipschitz constant of the payoff functions; this equilibrium can also be computed in polynomial time. Finally, if the game has two strategies, we establish that there always exists an approximate Nash equilibrium in which either only a small number of players randomize, or of those who do, they all randomize the same way. Our results make extensive use of certain novel Central Limit-type theorems for discrete approximations of the distributions of multinomial sums.

Suggested Citation

  • Daskalakis, Constantinos & Papadimitriou, Christos H., 2015. "Approximate Nash equilibria in anonymous games," Journal of Economic Theory, Elsevier, vol. 156(C), pages 207-245.
    • Handle: RePEc:eee:jetheo:v:156:y:2015:i:c:p:207-245
    DOI: 10.1016/j.jet.2014.02.002
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    References listed on IDEAS

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    1. Ioannis Caragiannis & Angelo Fanelli & Nick Gravin & Alexander Skopalik, 2012. "Computing approximate pure Nash equilibria in congestion games," Post-Print halshs-02094375, HAL.
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    8. G. van der Laan & A. J. J. Talman, 1982. "On the Computation of Fixed Points in the Product Space of Unit Simplices and an Application to Noncooperative N Person Games," Mathematics of Operations Research, INFORMS, vol. 7(1), pages 1-13, February.
    9. Milchtaich, Igal, 1996. "Congestion Games with Player-Specific Payoff Functions," Games and Economic Behavior, Elsevier, vol. 13(1), pages 111-124, March.
    10. McKelvey, Richard D. & McLennan, Andrew, 1996. "Computation of equilibria in finite games," Handbook of Computational Economics, in: H. M. Amman & D. A. Kendrick & J. Rust (ed.), Handbook of Computational Economics, edition 1, volume 1, chapter 2, pages 87-142, Elsevier.
    11. Blonski, Matthias, 1999. "Anonymous Games with Binary Actions," Games and Economic Behavior, Elsevier, vol. 28(2), pages 171-180, August.
    12. Yaron Azrieli & Eran Shmaya, 2013. "Lipschitz Games," Mathematics of Operations Research, INFORMS, vol. 38(2), pages 350-357, May.
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    Cited by:

    1. Blume, Lawrence & Easley, David & Kleinberg, Jon & Kleinberg, Robert & Tardos, Éva, 2015. "Introduction to computer science and economic theory," Journal of Economic Theory, Elsevier, vol. 156(C), pages 1-13.
    2. Paulwin Graewe & Ulrich Horst & Ronnie Sircar, 2021. "A Maximum Principle approach to deterministic Mean Field Games of Control with Absorption," Papers 2104.06152, arXiv.org.
    3. Papadimitriou, Christos & Peng, Binghui, 2023. "Public goods games in directed networks," Games and Economic Behavior, Elsevier, vol. 139(C), pages 161-179.
    4. Xi Chen & Binghui Peng, 2023. "Complexity of Equilibria in First-Price Auctions under General Tie-Breaking Rules," Papers 2303.16388, arXiv.org.

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    More about this item

    Keywords

    Anonymous games; Nash equilibrium; Approximation algorithms;
    All these keywords.

    JEL classification:

    • C72 - Mathematical and Quantitative Methods - - Game Theory and Bargaining Theory - - - Noncooperative Games

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