| Popis: |
I study a repeated binary-action supermodular game with endogenous exit where many short-lived agents attempt to coordinate a revolt against a regime. The regime undertakes costly actions to increase the short-run players' coordination frictions, though acts only after if the revolt is unsuccessful, inducing a lack-of-commitment problem. In the complete-information repeated game, a folk theorem holds, with payoff multiplicity arising due to both the regime's dynamic incentives and agents' stage-game strategic complementarities. Neither the regime's reputational incentives nor belief dispersion among agents (via global-games type uncertainty) alone meaningfully refine the equilibrium payoff set. Together, though, the interaction between these two forces uniquely select the regime's highest payoff in equilibrium. Furthermore, under a Markov refinement, they select a unique equilibrium where the regime plays their optimal commitment action. Methodologically, I develop tools to analyze repeated games with endogenous exit where the regime's commitment action flexibly varies with their discount rate. |
