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Elementary Games and Games Whose Correlated Equilibrium Polytope Has Full Dimension

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Author Info
Yannick Viossat (LEEP - Laboratoire d'econometrie de l'école polytechnique - CNRS : UMR7657 - Polytechnique - X)
Abstract

Un jeu est élémentaire s'il admet un équilibre corrélé strict à support plein. Un jeu est plein si le polytope de distributions d'équilibres corrélés à dimension pleine. Tout jeu élémentaire est plein. Nous montrons qu'un jeu plein est élémentaire si et seulement si aucune des contraintes d'incitation définissant les équilibres corrélés n'est vide. Plusieurs caractérisations des jeux pleins sont données. Enfin, nous présentons une méthode permettant de construire des jeux pleins mais non élémentaires.

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Paper provided by HAL in its series Working Papers with number hal-00242991_v1.

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Date of creation: 2003
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Handle: RePEc:hal:wpaper:hal-00242991_v1

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Related research
Keywords: Equilibres corrélés; Jeux élémentaires; Polytope;

References listed on IDEAS
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  1. Myerson, Roger B., 1997. "Dual Reduction and Elementary Games," Games and Economic Behavior, Elsevier, vol. 21(1-2), pages 183-202, October. [Downloadable!] (restricted)
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  2. Aumann, Robert J., 1974. "Subjectivity and correlation in randomized strategies," Journal of Mathematical Economics, Elsevier, vol. 1(1), pages 67-96, March. [Downloadable!] (restricted)
  3. Robert W. Rosenthal, 1973. "Correlated Equilibria in Some Classes of Two-Person Games," Discussion Papers 45, Northwestern University, Center for Mathematical Studies in Economics and Management Science. [Downloadable!]
  4. Nau, Robert F. & McCardle, Kevin F., 1990. "Coherent behavior in noncooperative games," Journal of Economic Theory, Elsevier, vol. 50(2), pages 424-444, April. [Downloadable!] (restricted)
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This page was last updated on 2009-11-28.

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