Open AccessMarkov-perfect Nash equilibria in a class of resource games
Author(s) -
Gerhard Sorger
Publication year - 1998
Publication title -
economic theory
Language(s) - English
Resource type - Journals
SCImago Journal Rank - 1.572
H-Index - 58
eISSN - 1432-0479
pISSN - 0938-2259
DOI - 10.1007/s001990050179
Subject(s) - mathematical economics , nash equilibrium , stochastic game , markov perfect equilibrium , epsilon equilibrium , mathematical optimization , mathematics , state space , class (philosophy) , markov chain , resource (disambiguation) , best response , economics , computer science , computer network , statistics , artificial intelligence
Summary. A general model of non-cooperating agents exploiting a renewable resource is considered. Assuming that the resource is sufficiently productive we prove that there exists a continuum of Markov-perfect Nash equilibria (MPNE). Although these equilibria lead to over-exploitation one can approximate the efficient solution by MPNE both in the state space and the payoff space. Furthermore, we derive a necessary and sufficient condition for maximal exploitation of the resource to qualify as a MPNE. This condition is satisfied if there are sufficiently many players, or if the players are sufficiently impatient, or if the capacity of each player is sufficiently high.
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