For undiscounted two-person zero-sum communicating stochastic games with finite state and action spaces, a solution procedure is proposed that exploits the communication property, i.e., working with irreducible games over restricted strategy spaces. The proposed procedure gives the value of the com-municating game with an arbitrarily small error when the value is independent of the initial state.
This paper considers the two-person zero-sum Markov game with finite state and action spaces at the ...
We prove that a two-person, zero-sum stochastic game with arbitrary state and action spaces, a finit...
We examine so-called product-games with an aperiodic transition structure, with respect to the avera...
For undiscounted two-person zero-sum communicating stochastic games with finite state and action spa...
International audienceWe study two classes of zero-sum stochastic games with compact action sets and...
Two-person zero-sum stochastic games are considered under the long-run average expected payoff crite...
Cahier de Recherche du Groupe HEC Paris, n° 743This chapter presents developments in the theory of s...
International audienceWe consider two-person zero-sum stochastic games with signals, a standard mode...
A two-person zero-sum stochastic game with finitely many states and actions is considered. The class...
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 ...
Zero-sum stochastic games generalize the notion of Markov Decision Processes (i.e. controlled Markov...
A positive zero-sum stochastic game with countable state and action spaces is shown to have a value ...
In this paper we discuss the main existence results on optimality and equilibria in two-person stoch...
Two-player zero-sum stochastic games with finite state and action spaces are known to have undiscoun...
This paper considers the two-person zero-sum Markov game with finite state and action spaces at the ...
We prove that a two-person, zero-sum stochastic game with arbitrary state and action spaces, a finit...
We examine so-called product-games with an aperiodic transition structure, with respect to the avera...
For undiscounted two-person zero-sum communicating stochastic games with finite state and action spa...
International audienceWe study two classes of zero-sum stochastic games with compact action sets and...
Two-person zero-sum stochastic games are considered under the long-run average expected payoff crite...
Cahier de Recherche du Groupe HEC Paris, n° 743This chapter presents developments in the theory of s...
International audienceWe consider two-person zero-sum stochastic games with signals, a standard mode...
A two-person zero-sum stochastic game with finitely many states and actions is considered. The class...
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 ...
Zero-sum stochastic games generalize the notion of Markov Decision Processes (i.e. controlled Markov...
A positive zero-sum stochastic game with countable state and action spaces is shown to have a value ...
In this paper we discuss the main existence results on optimality and equilibria in two-person stoch...
Two-player zero-sum stochastic games with finite state and action spaces are known to have undiscoun...
This paper considers the two-person zero-sum Markov game with finite state and action spaces at the ...
We prove that a two-person, zero-sum stochastic game with arbitrary state and action spaces, a finit...
We examine so-called product-games with an aperiodic transition structure, with respect to the avera...