Doing it now, later, or never

We study centipede games played by an infinite sequence of players. Following the literature on time-inconsistent preferences, we distinguish two types of decision makers, naive and sophisticated, and the corresponding solution concepts, naive ϵ-equilibrium and sophisticated ϵ-equilibrium. We show the existence of both naive and sophisticated ϵ-equilibria for each positive ϵ. Under the assumption that the payoff functions are upper semicontinuous, we furthermore show that there exist both naive and sophisticated 0-equilibria in pure strategies. We also compare the probability to stop of a naive versus a sophisticated decision maker and show that a sophisticated decision maker stops earlier.

[1]  János Flesch,et al.  Perfect-Information Games with Lower-Semicontinuous Payoffs , 2010, Math. Oper. Res..

[2]  Erzo G. J. Luttmer,et al.  Competitive equilibrium when preferences change over time , 2006 .

[3]  S. Goldman INTERTEMPORALLY INCONSISTENT PREFERENCES AND THE RATE OF CONSUMPTION , 1979 .

[4]  S. Ghosal,et al.  Non-existence of competitive equilibria with dynamically inconsistent preferences , 2009 .

[5]  Eilon Solan,et al.  Subgame-Perfection in Quitting Games with Perfect Information and Differential Equations , 2005, Math. Oper. Res..

[6]  R. H. Strotz Myopia and Inconsistency in Dynamic Utility Maximization , 1955 .

[7]  János Flesch,et al.  Existence of Secure Equilibrium in Multi-Player Games with Perfect Information , 2014, MFCS.

[8]  Kirsten I. M. Rohde,et al.  Time-inconsistent preferences in a general equilibrium model , 2004 .

[9]  B. Peleg,et al.  On the Existence of a Consistent Course of Action when Tastes are Changing , 1973 .

[10]  R. Pollak,et al.  SECOND-BEST NATIONAL SAVING AND GAME-EQUILIBRIUM GROWTH , 1980 .

[11]  Anna Jaskiewicz,et al.  Existence of Stationary Markov Perfect Equilibria in Stochastic Altruistic Growth Economies , 2015, J. Optim. Theory Appl..

[12]  Ted O’Donoghue,et al.  Doing It Now or Later , 1999 .

[13]  Ayala Mashiah-Yaakovi Periodic stopping games , 2009, Int. J. Game Theory.

[14]  D. Fudenberg,et al.  Subgame-perfect equilibria of finite- and infinite-horizon games , 1981 .

[15]  William D. Sudderth,et al.  Perfect Information Games with Upper Semicontinuous Payoffs , 2011, Math. Oper. Res..