We define a subgame perfect Nash equilibrium under Knightian uncertainty for two players, by means of a recursive backward induction procedure. We prove an extension of the Zermelo-von Neumann-Kuhn Theorem for games of perfect information, i. e., that the recursive procedure generates a Nash equilibrium under uncertainty (Dow and Werlang(1994)) of the whole game. We apply the notion for two well known games: the chain store and the centipede. On the one hand, we show that subgame perfection under Knightian uncertainty explains the chain store paradox in a one shot version. On the other hand, we show that subgame perfection under uncertainty does not account for the leaving behavior observed in the centipede game. This is in contrast to Dow,...
Subgame perfect equilibria are specific Nash equilibria in perfect information games in extensive fo...
This paper elucidates on the logic behind recent papers which show that a unique equilibrium is sele...
This paper introduces a notion of robustness to ambiguous beliefs for Bayesian Nash equilibria. An e...
We present two alternative definitions of Nash equilibrium for two person games in the presence af u...
The thesis of this paper is that finite, noncooperative games possessing both complete and perfect i...
We consider sequential multi-player games with perfect information and with deterministic transition...
We say that a player is certain of an event A if he gives A probability 1. There is common certainty...
Abstract. We study the problem of finding a subgame-perfect equilibrium in re-peated games. In earli...
In 1950, Nash proposed a natural equilibrium solution concept for games hence called Nash equilibriu...
We consider a class of multi-player games with perfect information and deterministic transitions, wh...
In the first chapter we present some proofs of the existence of the minimax point of a strategic gam...
International audienceWe analyze the robustness of equilibria in sequential games when there is almo...
We present a method of backward induction for computing approximate subgame perfect Nash equilibria ...
Sequential game and Nash equilibrium are basic key concepts in game theory. In 1953, Kuhn showed tha...
My thesis considers various aspects of microeconomic theory and focuses on the different types of u...
Subgame perfect equilibria are specific Nash equilibria in perfect information games in extensive fo...
This paper elucidates on the logic behind recent papers which show that a unique equilibrium is sele...
This paper introduces a notion of robustness to ambiguous beliefs for Bayesian Nash equilibria. An e...
We present two alternative definitions of Nash equilibrium for two person games in the presence af u...
The thesis of this paper is that finite, noncooperative games possessing both complete and perfect i...
We consider sequential multi-player games with perfect information and with deterministic transition...
We say that a player is certain of an event A if he gives A probability 1. There is common certainty...
Abstract. We study the problem of finding a subgame-perfect equilibrium in re-peated games. In earli...
In 1950, Nash proposed a natural equilibrium solution concept for games hence called Nash equilibriu...
We consider a class of multi-player games with perfect information and deterministic transitions, wh...
In the first chapter we present some proofs of the existence of the minimax point of a strategic gam...
International audienceWe analyze the robustness of equilibria in sequential games when there is almo...
We present a method of backward induction for computing approximate subgame perfect Nash equilibria ...
Sequential game and Nash equilibrium are basic key concepts in game theory. In 1953, Kuhn showed tha...
My thesis considers various aspects of microeconomic theory and focuses on the different types of u...
Subgame perfect equilibria are specific Nash equilibria in perfect information games in extensive fo...
This paper elucidates on the logic behind recent papers which show that a unique equilibrium is sele...
This paper introduces a notion of robustness to ambiguous beliefs for Bayesian Nash equilibria. An e...