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Bargaining efficiency and the repeated prisoners' dilemma

Author

Listed:
  • John Conley

    (Vanderbilt University)

  • Bhaskar Chakravorti

    (The Monitor Corporation)

Abstract

The infinitely repeated prisoners' dilemma has a multiplicity of Pareto-unranked equilibria. This leads to a battle of the sexes problem of coordinating on a single efficient outcome. One natural method of achieving coordination is for the players to bargain over the set of possible equilibrium allocations. If players have different preferences over cooperative bargaining solutions, it is reasonable to imagin that agents randomize over their favorite choices. This paper asks the following question: do the players risk choosing an inefficient outcome by resorting to such randomizations? In general, randomizations over points in a convex set yields interior points. We show, however, that if the candidate solutions are the two most frequently used the Nash and Kalai-Smorodinsky solutions then for any prisoners'' dilemma, this procedure guarantees coordination of an efficient outcome.

Suggested Citation

  • John Conley & Bhaskar Chakravorti, 2004. "Bargaining efficiency and the repeated prisoners' dilemma," Economics Bulletin, AccessEcon, vol. 3(3), pages 1-8.
    • Handle: RePEc:ebl:ecbull:eb-04c70005
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    References listed on IDEAS

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    1. Drew Fudenberg & Eric Maskin, 2008. "The Folk Theorem In Repeated Games With Discounting Or With Incomplete Information," World Scientific Book Chapters, in: Drew Fudenberg & David K Levine (ed.), A Long-Run Collaboration On Long-Run Games, chapter 11, pages 209-230, World Scientific Publishing Co. Pte. Ltd..
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    Cited by:

    1. Hadi Charkhgard & Martin Savelsbergh & Masoud Talebian, 2018. "Nondominated Nash points: application of biobjective mixed integer programming," 4OR, Springer, vol. 16(2), pages 151-171, June.

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    More about this item

    Keywords

    Bargaining Theory;

    JEL classification:

    • C7 - Mathematical and Quantitative Methods - - Game Theory and Bargaining Theory
    • C6 - Mathematical and Quantitative Methods - - Mathematical Methods; Programming Models; Mathematical and Simulation Modeling

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