Abstract
The present paper tries to explain cooperative behaviour in an organization run by a sequence of long- but finitely-lived agents. We show that the Folk Theorem holds for infinitely repeated games with overlapping generations of finitely-lived players; any mutually beneficial outcome can approximately be sustained if the player's life span and the overlapping periods are long enough. The result is stronger than the usual Folk Theorems in that it employs no assumption on the stage game, such as the full dimensionality of payoff set or multiplicity of equilibria.
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