Starting from the definition of a bimatrix game, we restrict the pair of strategy sets jointly, not independently. Thus, we have a set P subset of S-m x S-n, which is the set of all feasible strategy pairs. We pose the question of whether a Nash equilibrium exists, in that no player can obtain a higher payoff by deviating. We answer this question affirmatively for a very general case, imposing a minimum of conditions on the restricted sets and the payoff. Next, we concentrate on a special class of restricted games, the polytope bimatrix game, where the restrictions are linear and the payoff functions are bilinear. Further, we show how the polytope bimatrix game is a generalization of the bimatrix game. We give an algorithm for solving such ...
This paper proposes a novel way to compare classes of strategic games based on their sets of pure Na...
In this paper the structure of the set of equilibria for two person multicriteria games is analysed....
The Lemke–Howson algorithm is the classical algorithm for the problem NASH of finding one Nash equil...
Starting from the definition of a bimatrix game, we restrict the pair of strategy sets jointly, not ...
Starting from the definition of a bimatrix game, we restrict the pair of strategy sets jointly, not ...
We study the structure of the set of equilibrium payoffs in finite games, both for Nash equilibrium ...
International audienceWe study the structure of the set of equilibrium payoffs in finite games, both...
In the literature several refinements of the Nash equilibrium concept have been introduced. Among th...
We study the problem of checking for the existence of constrained pure Nash equilibria in a subclass...
AbstractWe study the fundamental problem 2NASH of computing a Nash equilibrium (NE) point in bimatri...
AbstractA 2-person zero-sum game with the payoff function being a sum of two linear functions and a ...
This paper presents a new lower bound of 2:414 d = p d on the maximal number of Nash equilibria ...
A class of nondegenerate n n bimatrix games is presented that have asymptotically more than 2:414n=...
In this paper the structure of the set of equilibria for two person multicriteria games is analysed....
AbstractA problem of a Nash equilibrium point existence and calculating in a noncooperative two-pers...
This paper proposes a novel way to compare classes of strategic games based on their sets of pure Na...
In this paper the structure of the set of equilibria for two person multicriteria games is analysed....
The Lemke–Howson algorithm is the classical algorithm for the problem NASH of finding one Nash equil...
Starting from the definition of a bimatrix game, we restrict the pair of strategy sets jointly, not ...
Starting from the definition of a bimatrix game, we restrict the pair of strategy sets jointly, not ...
We study the structure of the set of equilibrium payoffs in finite games, both for Nash equilibrium ...
International audienceWe study the structure of the set of equilibrium payoffs in finite games, both...
In the literature several refinements of the Nash equilibrium concept have been introduced. Among th...
We study the problem of checking for the existence of constrained pure Nash equilibria in a subclass...
AbstractWe study the fundamental problem 2NASH of computing a Nash equilibrium (NE) point in bimatri...
AbstractA 2-person zero-sum game with the payoff function being a sum of two linear functions and a ...
This paper presents a new lower bound of 2:414 d = p d on the maximal number of Nash equilibria ...
A class of nondegenerate n n bimatrix games is presented that have asymptotically more than 2:414n=...
In this paper the structure of the set of equilibria for two person multicriteria games is analysed....
AbstractA problem of a Nash equilibrium point existence and calculating in a noncooperative two-pers...
This paper proposes a novel way to compare classes of strategic games based on their sets of pure Na...
In this paper the structure of the set of equilibria for two person multicriteria games is analysed....
The Lemke–Howson algorithm is the classical algorithm for the problem NASH of finding one Nash equil...