We investigate two-person zero-sum stopping stochastic games with a finite number of states, for which the action sets of player i are finite and those for player ii are countably infinite. Concerning the payoffs no restrictions are made. We show that for such games the value, possibly —∞ in some coordinates, exists; player i possesses optimal stationary strategies and player ii possesses near-optimal stationary strategies with finite support. Furthermore we relate the existence of value and of (near-)optimal stationary strategies with a maximal solution to the shapley-equation.keywordsstationary strategystochastic gamematrix gamemixed actionfinite supportthese keywords were added by machine and not by the authors. This process is experimen...
AbstractWe study infinite stochastic games played by two players over a finite state space, with obj...
In this paper we consider the two-person zero-sum Markov (stochastic) game with finite state and act...
We deal with stochastic games with finite state and action spaces for which we examine players' poss...
We investigate two-person zero-sum stopping stochastic games with a finite number of states, for whi...
In this paper the stochastic two-person zero-sum game of Shapley is considered, with metric state sp...
In this paper, we consider the stochastic games of Shapley, when the state and action spaces are all...
Cahier de Recherche du Groupe HEC Paris, n° 743This chapter presents developments in the theory of s...
We consider perfect-information reachability stochastic games for 2 players on infinite graphs. We i...
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...
We show the existence of almost stationary ε-equilibria, for all (H0, in zero-sum stochastic games w...
We consider infinite n-person stochastic games with limiting average payoffs criteria for the player...
Two-person zero-sum stochastic games are considered under the long-run average expected payoff crite...
We consider perfect-information reachability stochastic games for 2 players on infinite graphs. We i...
Dubins and Savage (How to gamble if you must: inequalities for stochastic processes, McGraw-Hill, Ne...
AbstractWe study infinite stochastic games played by two players over a finite state space, with obj...
In this paper we consider the two-person zero-sum Markov (stochastic) game with finite state and act...
We deal with stochastic games with finite state and action spaces for which we examine players' poss...
We investigate two-person zero-sum stopping stochastic games with a finite number of states, for whi...
In this paper the stochastic two-person zero-sum game of Shapley is considered, with metric state sp...
In this paper, we consider the stochastic games of Shapley, when the state and action spaces are all...
Cahier de Recherche du Groupe HEC Paris, n° 743This chapter presents developments in the theory of s...
We consider perfect-information reachability stochastic games for 2 players on infinite graphs. We i...
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...
We show the existence of almost stationary ε-equilibria, for all (H0, in zero-sum stochastic games w...
We consider infinite n-person stochastic games with limiting average payoffs criteria for the player...
Two-person zero-sum stochastic games are considered under the long-run average expected payoff crite...
We consider perfect-information reachability stochastic games for 2 players on infinite graphs. We i...
Dubins and Savage (How to gamble if you must: inequalities for stochastic processes, McGraw-Hill, Ne...
AbstractWe study infinite stochastic games played by two players over a finite state space, with obj...
In this paper we consider the two-person zero-sum Markov (stochastic) game with finite state and act...
We deal with stochastic games with finite state and action spaces for which we examine players' poss...