We study the existence of pure strategy Markov perfect equilibria in two-person perfect information games. There is a state space X and each period player’s possible actions are a subset of X. This set of feasible actions depends on the current state, which is determined by the choice of the other player in the previous period. We assume that X is a compact Hausdorff space and that the action correspondence has an acyclic and asymmetric graph. For some states there may be no feasible actions and then the game ends. Payoffs are either discounted sums of utilities of the states visited, or the utility of the state where the game ends. We give sufficient conditions for the existence of equilibrium e.g. in case when either feasible action set...
International audienceWe consider a nonzero-sum Markov game on an abstract measurable state space wi...
summary:This work concerns a class of discrete-time, zero-sum games with two players and Markov tran...
Perfect information games have a particularly simple structure of equilibria in the associated norma...
We prove existence of MPE in undiscounted infinite horizon dynamic games, by exploiting an struc-tur...
SIGLETIB Hannover: RO 2708(183) / FIZ - Fachinformationszzentrum Karlsruhe / TIB - Technische Inform...
We examine the problem of the existence of optimal deterministic stationary strategiesintwo-players ...
We study perfect information games with an infinite horizon played by an arbitrary number of players...
Abstract. We prove the existence of Markov perfect equilibria (MPE) for nonstationary undiscounted i...
This paper shows that asynchronicity of moves can lead to a unique prediction in coordination games,...
1 We address the question of existence of equilibrium in general timing games of complete informatio...
In the first chapter we present some proofs of the existence of the minimax point of a strategic gam...
The existence of a value and optimal strategies is proved for the class of twoperson repeated games ...
We study a class of two-player continuous time stochastic games in which agents can make (costly) di...
We show that every bounded, continuous at infinity game of perfect information has an ε−perfect equi...
Many economic problems can be formulated as dynamic games in which strategically interacting agents ...
International audienceWe consider a nonzero-sum Markov game on an abstract measurable state space wi...
summary:This work concerns a class of discrete-time, zero-sum games with two players and Markov tran...
Perfect information games have a particularly simple structure of equilibria in the associated norma...
We prove existence of MPE in undiscounted infinite horizon dynamic games, by exploiting an struc-tur...
SIGLETIB Hannover: RO 2708(183) / FIZ - Fachinformationszzentrum Karlsruhe / TIB - Technische Inform...
We examine the problem of the existence of optimal deterministic stationary strategiesintwo-players ...
We study perfect information games with an infinite horizon played by an arbitrary number of players...
Abstract. We prove the existence of Markov perfect equilibria (MPE) for nonstationary undiscounted i...
This paper shows that asynchronicity of moves can lead to a unique prediction in coordination games,...
1 We address the question of existence of equilibrium in general timing games of complete informatio...
In the first chapter we present some proofs of the existence of the minimax point of a strategic gam...
The existence of a value and optimal strategies is proved for the class of twoperson repeated games ...
We study a class of two-player continuous time stochastic games in which agents can make (costly) di...
We show that every bounded, continuous at infinity game of perfect information has an ε−perfect equi...
Many economic problems can be formulated as dynamic games in which strategically interacting agents ...
International audienceWe consider a nonzero-sum Markov game on an abstract measurable state space wi...
summary:This work concerns a class of discrete-time, zero-sum games with two players and Markov tran...
Perfect information games have a particularly simple structure of equilibria in the associated norma...