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Boundedly rational Nash equilibrium: a probabilistic choice approach

Author

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  • CHEN, H.-C.
  • FRIEDMAN, J. W.
  • THISSE, J.-F.

Abstract

This paper proposes an equilibrium concept for n-person finite games based on boundedly rational decision making by players. The players are modeled as following random choice behavior in the manner of the logit model of discrete choice theory as set forth by Luce, McFadden and others. The behavior of other players determines in a natural way a lottery facing each player i. At equilibrium, each player is using the appropriate choice probabilities, given the choice probabilities used by the others in the game. The rationality of the players is parameterized on a continuum from complete rationality to uniform random choice. Using results by McKelvey and Palfrey, we show existence of an equilibrium for any finite n-person game and convergence to Nash equilibrium. We also identify conditions such that, for given rationality parameters the path of choices over time when the players use fictitious play (their beliefs about other players' choices are given by the empirical distributions of those players) converges to equilibrium.
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(This abstract was borrowed from another version of this item.)

Suggested Citation

  • Chen, H.-C. & Friedman, J. W. & Thisse, J.-F., 1997. "Boundedly rational Nash equilibrium: a probabilistic choice approach," LIDAM Reprints CORE 1248, Université catholique de Louvain, Center for Operations Research and Econometrics (CORE).
  • Handle: RePEc:cor:louvrp:1248
    DOI: 10.1006/game.1997.0514
    Note: In : Games and Economic Behavior, 18, 32-54, 1997
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    References listed on IDEAS

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    1. Rosenthal, Robert W, 1989. "A Bounded-Rationality Approach to the Study of Noncooperative Games," International Journal of Game Theory, Springer;Game Theory Society, vol. 18(3), pages 273-291.
    2. Armen A. Alchian, 1950. "Uncertainty, Evolution, and Economic Theory," Journal of Political Economy, University of Chicago Press, vol. 58(3), pages 211-211.
    3. McKelvey Richard D. & Palfrey Thomas R., 1995. "Quantal Response Equilibria for Normal Form Games," Games and Economic Behavior, Elsevier, vol. 10(1), pages 6-38, July.
    4. Miyao, Takahiro & Shapiro, Perry, 1981. "Discrete Choice and Variable Returns to Scale," International Economic Review, Department of Economics, University of Pennsylvania and Osaka University Institute of Social and Economic Research Association, vol. 22(2), pages 257-273, June.
    5. de Palma, A, et al, 1985. "The Principle of Minimum Differentiation Holds under Sufficient Heterogeneity," Econometrica, Econometric Society, vol. 53(4), pages 767-781, July.
    6. repec:ulb:ulbeco:2013/1759 is not listed on IDEAS
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