A concept of dynamic stability in infinitely repeated games with discounting is presented. For this purpose, one modification of the available theory is needed: we need to relax the assumption that the game starts in a given period. Under this new framework, we propose stable strategies such that a folk theorem with an additional stability requirement still holds. Under these strategies, convergence to the long run outcome is achieved in a finite number of periods, no matter what actions or deviations have been played in the past. Hence, we suggest a way in which a player can build up his reputation after a deviation.repeated games, stability, stable strategies
This paper considers reputation effects in a repeated game between two long-run players, one of whom...
We present a synthesis of the various folk theorems for repeated games using a model that accommodat...
Evolutionary game theory has largely focused on finite games. Dynamic stability is harder to attain ...
(**) This paper has benefited from comments by Diego Moreno, Marco Celentani, M.ª Ángeles de Frutos ...
The paper analyzes reputation effects in perturbed repeated games with discounting. If there is some...
Abstract: The paper analyzes reputation effects in general perturbed repeated games with discounting...
Much of the recent interest in the economic applications of game theory has been drawn to time-incon...
We introduce a general class of time discounting, which includes time-inconsistent ones, into repeat...
I introduce a solution concept for infinite-horizon games, called “Experimental Equilibrium”, in whi...
© 2015 Mohr Siebeck. We study infinitely repeated games that are played by many groups simultaneousl...
This paper provides a characterization for the set of outcomes which can be sustained by subgame per...
This book gathers together our joint work (through 2008) on the closely connected topics of repeated...
This paper begins with a short foundational description of the basics\ud of game theory, focusing on...
We investigate the replicator dynamics of the repeated Prisoners' Dilemma played by finite automata....
We present a synthesis of the various folk theorems for repeated games using a model that accommodat...
This paper considers reputation effects in a repeated game between two long-run players, one of whom...
We present a synthesis of the various folk theorems for repeated games using a model that accommodat...
Evolutionary game theory has largely focused on finite games. Dynamic stability is harder to attain ...
(**) This paper has benefited from comments by Diego Moreno, Marco Celentani, M.ª Ángeles de Frutos ...
The paper analyzes reputation effects in perturbed repeated games with discounting. If there is some...
Abstract: The paper analyzes reputation effects in general perturbed repeated games with discounting...
Much of the recent interest in the economic applications of game theory has been drawn to time-incon...
We introduce a general class of time discounting, which includes time-inconsistent ones, into repeat...
I introduce a solution concept for infinite-horizon games, called “Experimental Equilibrium”, in whi...
© 2015 Mohr Siebeck. We study infinitely repeated games that are played by many groups simultaneousl...
This paper provides a characterization for the set of outcomes which can be sustained by subgame per...
This book gathers together our joint work (through 2008) on the closely connected topics of repeated...
This paper begins with a short foundational description of the basics\ud of game theory, focusing on...
We investigate the replicator dynamics of the repeated Prisoners' Dilemma played by finite automata....
We present a synthesis of the various folk theorems for repeated games using a model that accommodat...
This paper considers reputation effects in a repeated game between two long-run players, one of whom...
We present a synthesis of the various folk theorems for repeated games using a model that accommodat...
Evolutionary game theory has largely focused on finite games. Dynamic stability is harder to attain ...