Heller, Yuval (2008): AllStage strong correlated equilbrium.
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Abstract
Abstract A strong correlated equilibrium is a strategy profile that is immune to joint deviations. Different notions of strong correlated equilibria were defined in the literature. One major difference among those definitions is the stage in which coalitions can plan a joint deviation: before (exante) or after (expost) the deviating players receive their part of the correlated profile. In this paper we show that an exante strong correlated equilibrium is immune to deviations at all stages. Thus the set of exante strong correlated equilibria of Moreno & Wooders (Games Econ. Behav. 17 (1996), 80113) is included in all other sets of strong correlated equilibria.
Item Type:  MPRA Paper 

Original Title:  AllStage strong correlated equilbrium 
Language:  English 
Keywords:  correlated equilibrium; strong equilibrium; coalitionproof equilibrium; exante; expost; common knowledge 
Subjects:  C  Mathematical and Quantitative Methods > C7  Game Theory and Bargaining Theory > C72  Noncooperative Games 
Item ID:  9280 
Depositing User:  Yuval Heller 
Date Deposited:  25. Jun 2008 01:49 
Last Modified:  19. Feb 2013 11:53 
References:  I. Abraham, D. Dolev, R. Gonen , J. Halpern, Distributed computing meets game theory: robust mechanisms for rational secret sharing and multiparty computation, Proceedings of the 25th Annual ACM Symposium on Principles of Distributed Computing (2006), 5362. R.J. Aumann, Acceptable points in general cooperative nperson games, in: H.W. Kuhn , R.D. Luce (Eds.), Contributions to the Theory of Games IV, Princeton University Press, Princeton, 1959, pp. 287324. R.J. Aumann, Agreeing to disagree, Ann. Statist. 4 (1976), 12361239. R.J. Aumann, Correlated equilibrium as an expression of Bayesian rationality, Econometrica 55 (1987), 118. Aumann R.J., S. Hart, Long cheap talk, Econometrica 71 (2003), 16191660. B.D. Bernheim, B. Peleg, M. Whinston, Coalitionproof Nash equilibria  I. concepts, J. Econ. Theory 42 (1987), 112. B.D. Bernheim, M. Whinston, 1986. Menu auctions, resource allocation, and economic influence, Quart. J. Econ. 101 (1986), 131. B.D. Bernheim, M. Whinston, Coalitionproof Nash equilibria  II. applications, J. Econ. Theory 42 (1987), 1329. F. Bloch, B. Dutta, Correlated equilibria, incomplete information and coalitional deviations, mimeo (2007, based on The Warwick Economics Research Paper Series  paper 763). M.S.Y. Chwe, Farsighted coalitional stability. J. Econ. Theory 63 (1994), 299325. J. Delgado, Coalitionproof supply function equilibria under capacity constraints, Econ. Theory 29 (2006), 219229. J. Delgado, D. Moreno, Coalitionproof supply function equilibria in Oligopoly, J. Econ. Theory, 114 (2004), 231254. E. Einy, B. Peleg, Coalitionproof communication equilibria, in: W. Barnett, H. Moulin, M. Salles, N. Schofield (Eds.), Social Choice, Welfare & Ethics, Cambridge University Press, Cambridge, 1995, pp. 289300. J. Farrel, M. Rabin, Cheaptalk, J. Econ. Perspect. 10 (1996), 103118. J. Farrel, G. Saloner, Coordination through committees and markets, RAND J. Econ. 19 (1988), 235252. J. Greenberg, Deriving strong and coalitionproof Nash equilibrium from an abstract system, J. Econ. Theory 49 (1989), 195202. J. Greenberg, The Theory of Social Situations, Cambridge University Press, Cambridge, 1990. Y. Heller, A minorityproof cheaptalk protocol, mimeo (2008), http://www.tau.ac.il/ ̃helleryu/minority.pdf R. Holzman, N. LawYone, Strong equilibrium in congestion games, Games Econ. Behav. 21 (1997), 85101. H. Konishi, M. Le Breton, S. Weber, Equilibria in a model with partial rivalry, J. Econ. Theory 72 (1997), 225237. H. Konishi, M. Le Breton, S. Weber, Equivalence of strong and coalitionproof Nash equilibria in games without spillovers, Econ. Theory 9 (1997), 97113. H. Konishi, M. Le Breton, S. Weber, On coalitionproof Nash Equilibria in common agency games, J. Econ. Theory 85 (1999), 122139. M. Lepinski, S. Micali, C. Peikert, A. Shelat, Completely fair SFE and coalitionsafe cheap talk, Proceedings of the 23rd annual ACM symposium on Principles of distributed computing (2004), 110. M. Mariotti, A theory of agreements in strategic form games, J. Econ. Theory 74 (1997), 196217. P. Milgrom, J. Roberts, Coalitionproofness and correlation with arbitrary communication possibilities, Games Econ. Behav. 17 (1996), 113128. D. Moreno, J. Wooders, Coalitionproof equilibrium, Games Econ. Behav. 17 (1996), 80113. D. Moreno, J. Wooders, An experimental study of communication and coordination in noncooperative games, Games Econ. Behav. 24 (1998), 4776. M. Rabin, A model of pregame communication, J. Econ. Theory 63 (1994), 370391. I. Ray, Coalitionproof correlated equilibrium: a definition, Games Econ. Behav. 17 (1996), 5679. I. Ray, Correlated equilibrium as a stable standard of behavior, Rev. Econ. Design 3 (1998), 257269 S. Thoron, Formation of a coalitionproof stable cartel, Can. J. Econ. 31 (1998), 6376. J. vonNeumann, O. Morgenstern, Theory of games and economic behavior (3rd ed.), Princeton University Press, Princeton, 1953. L. Xue, Coalitional stability under perfect foresight, Econ. Theory 11 (1998), 603627. L. Xue, Negotiationproof Nash equilibrium, Int. J. Game Theory 29 (2000), 339357. S.S. Yi, On the coalitionproofness of the Pareto frontier of the set of Nash equilibria, Games Econ. Behav. 26 (1999), 353364. 
URI:  https://mpra.ub.unimuenchen.de/id/eprint/9280 
Available Versions of this Item

Exante and expost strong correlated equilbrium. (deposited 12. Mar 2008 16:21)

AllStage strong correlated equilbrium. (deposited 25. Mar 2008 05:32)
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AllStage strong correlated equilbrium. (deposited 18. May 2008 04:43)

AllStage strong correlated equilbrium. (deposited 28. Apr 2008 14:28)

AllStage strong correlated equilbrium. (deposited 17. Apr 2008 18:42)

AllStage strong correlated equilbrium. (deposited 25. Mar 2008 05:32)