We prove that a two-person, zero-sum stochastic game with arbitrary state and action spaces, a finitely additive law of motion and a bounded Borel measurable payoff has a value.Two-person · zero-sum stochastic game · finitely additive strategy · perfect information game · Borel measurable
For undiscounted two-person zero-sum communicating stochastic games with finite state and action spa...
This paper is the first step in the proof of existence of equilibrium payoffs for two-player stochas...
The finite state space stochastic game model by Shapley [31] covered in [33] was generalized among o...
Consider a two-person zero-sum stochastic game with Borel state space S, compact metric action sets ...
We consider multiplayer stochastic games with finitely many players and actions, and countably many ...
Consider a two-person zero-sum stochastic game with countable state space S, finite action sets A an...
We study a zero-sum stochastic game on a Borel state space where the state of the game is not known ...
We study a zero-sum stochastic game on a Borel state space where the state of the game is not known ...
International audienceBewley and Kohlberg (Math Oper Res 1(3):197–208, 1976) and Mertens and Neyman ...
We consider a discrete time partially observable zero-sum stochastic game with average payoff criter...
A positive zero-sum stochastic game with countable state and action spaces is shown to have a value ...
Cahier de Recherche du Groupe HEC Paris, n° 743This chapter presents developments in the theory of s...
For undiscounted two-person zero-sum communicating stochastic games with finite state and action spa...
We show that every two-player stochastic game with finite state and action sets, and bounded, Borel-...
For undiscounted two-person zero-sum communicating stochastic games with finite state and action spa...
This paper is the first step in the proof of existence of equilibrium payoffs for two-player stochas...
The finite state space stochastic game model by Shapley [31] covered in [33] was generalized among o...
Consider a two-person zero-sum stochastic game with Borel state space S, compact metric action sets ...
We consider multiplayer stochastic games with finitely many players and actions, and countably many ...
Consider a two-person zero-sum stochastic game with countable state space S, finite action sets A an...
We study a zero-sum stochastic game on a Borel state space where the state of the game is not known ...
We study a zero-sum stochastic game on a Borel state space where the state of the game is not known ...
International audienceBewley and Kohlberg (Math Oper Res 1(3):197–208, 1976) and Mertens and Neyman ...
We consider a discrete time partially observable zero-sum stochastic game with average payoff criter...
A positive zero-sum stochastic game with countable state and action spaces is shown to have a value ...
Cahier de Recherche du Groupe HEC Paris, n° 743This chapter presents developments in the theory of s...
For undiscounted two-person zero-sum communicating stochastic games with finite state and action spa...
We show that every two-player stochastic game with finite state and action sets, and bounded, Borel-...
For undiscounted two-person zero-sum communicating stochastic games with finite state and action spa...
This paper is the first step in the proof of existence of equilibrium payoffs for two-player stochas...
The finite state space stochastic game model by Shapley [31] covered in [33] was generalized among o...