Abstract
This paper provides a dual characterization of the existing ones for the limit set of perfect public equilibrium payoffs in a class of finite stochastic games (in particular, repeated games) as the discount factor tends to one. As a first corollary, the folk theorems of Fudenberg et al. (1994), Kandori and Matsushima (1998) and Hörner et al. (2011) obtain. As a second corollary, it is shown that this limit set of payoffs is a convex polytope when attention is restricted to perfect public equilibria in pure strategies. This result fails for mixed strategies, even when attention is restricted to two-player repeated games.
Keywords
Stochastic games; Repeated games; Folk theorem;
JEL codes
- C72: Noncooperative Games
- C72: Noncooperative Games
Reference
Johannes Hörner, Satoru Takahashi, and Nicolas Vieille, “On the limit perfect public equilibrium payoff set in repeated and stochastic games”, Games and Economic Behavior, vol. 85, 2014, pp. 70–83.
See also
Published in
Games and Economic Behavior, vol. 85, 2014, pp. 70–83