We show the existence of almost stationary ε-equilibria, for all (H0, in zero-sum stochastic games with finite state and action spaces. These are ε-equilibria with the property that, if neither player deviates, then stationary strategies are played forever with probability almost 1. The proof is based on the construction of specific stationary strategy pairs, with corresponding rewards equal to the value, which can be supplemented with history-dependent δ-optimal strategies, with small δH0, in order to obtain almost stationary ε-equilibria
From Contributions to game theory and management, vol. X. Collected papers presented on the Tenth In...
We deal with stochastic games with finite state and action spaces for which we examine players' poss...
We consider positive zero-sum stochastic games with countable state and action spaces. For each play...
We show the existence of almost stationary epsilon-equilibria, for all epsilon > 0, in zero-sum s...
In this paper we prove the existence of p-equilibrium stationary strategies for non-zero-sum stochas...
We consider infinite n-person stochastic games with limiting average payoffs criteria for the player...
In stochastic games with finite state and action spaces, we examine existence of equilibria where pl...
In this paper we show that the existence of p-equilibrium stationary strategies imply the existence ...
We examine the use of stationary and Markov strategies in zero-sum stochastic games with finite stat...
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...
We deal with zero-sum stochastic games. We demonstrate the importance of stationary strategies by sh...
From Contributions to game theory and management, vol. X. Collected papers presented on the Tenth In...
We deal with stochastic games with finite state and action spaces for which we examine players' poss...
We consider positive zero-sum stochastic games with countable state and action spaces. For each play...
We show the existence of almost stationary epsilon-equilibria, for all epsilon > 0, in zero-sum s...
In this paper we prove the existence of p-equilibrium stationary strategies for non-zero-sum stochas...
We consider infinite n-person stochastic games with limiting average payoffs criteria for the player...
In stochastic games with finite state and action spaces, we examine existence of equilibria where pl...
In this paper we show that the existence of p-equilibrium stationary strategies imply the existence ...
We examine the use of stationary and Markov strategies in zero-sum stochastic games with finite stat...
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...
We deal with zero-sum stochastic games. We demonstrate the importance of stationary strategies by sh...
From Contributions to game theory and management, vol. X. Collected papers presented on the Tenth In...
We deal with stochastic games with finite state and action spaces for which we examine players' poss...
We consider positive zero-sum stochastic games with countable state and action spaces. For each play...