Stability of the cooperative equilibrium in N-person prisoners' dilemma with sequential moves |
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| Authors: | Ko Nishihara |
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| Affiliation: | (1) Faculty of Economics, Fukuoka University, Nanakuma, Jonan-ku, Fukuoka 814-80, JAPAN (e-mail: nisihara@jsat.fukuoka-u.ac.jp), JP |
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| Abstract: | Summary. Nishihara [3] showed that N-person prisoners' dilemma has a cooperative Nash equilibrium, if the players decide their actions sequentially in the order determined by Nature under a certain information structure, and if each player's payoffs satisfy a certain inequality. This paper examines the stability of this cooperative equilibrium against two matters: players' slight mistakes and deviations by coalitions. The main results are as follows: (i) if the inequality on each player's payoffs strictly holds, then the cooperative equilibrium is a strictly proper equilibrium; (ii) if N≤3, and if full cooperation is Pareto efficient in N-person prisoners' dilemma, then the cooperative equilibrium is a strong Nash equilibrium; (iii) the cooperative equilibrium is in general a coalition-proof Nash equilibrium. Received: June 23, 1997; revised version: December 2, 1997 |
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| Keywords: | and Phrases: Cooperation in N-person prisoners' dilemma Strictly proper equilibrium Strong Nash equilibrium Coalition-proof Nash equilibrium. |
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