Add to ORKGIn this paper we consider the Nash equilibrium problem for infinite player games with vector payoffs in a topological vector space setting. By employing new concepts of relative (pseudo)monotonicity, we establish several existence results of solutions for usual and normalized vector equilibria. The results strengthen existence results for vector equilibrium problems, which were based on classical pseudomonotonicity concepts. They also extend previous results for vector variational inequalities and finite player games under relative (pseudo)monotonicity. © Springer 2006
textabstractIn this chapter we give an overview on the theory of noncooperative games. In the first ...
AbstractIn this paper we generalize Berge's Maximum Theorem to the case where the payoff (utility) f...
We survey results related to the problem of the existence of equilibria in some classes of infinitel...
In this paper we consider the Nash equilibrium problem for infinite player games with vector payoffs...
We consider the Nash equilibrium problem with vector payoffs in a topological vector space. By emplo...
We consider the Nash equilibrium problem with vector payoffs in a topological vector space. By emplo...
AbstractIn this paper, we introduce the topological pseudomonotonicity to vector valued bifunctions,...
The object of this paper is to provide a unified treatment for the study of the existence of equilib...
After defining a pure-action profile in a nonatomic aggregative game, where players have specific co...
The aim of this paper is to establish general existence results of maximal elements for L-majorized ...
This thesis consists of three separate essays in Game Theory. Each essay is contained in one chapter...
In this paper we propose a pseudo-Nash equilibrium for N -person games in which very simply we allow...
In this paper we generalize Berge's Maximum Theorem to the case where the payoff (utility) functions...
In this survey, a new minimax inequality and one equivalent geometric form are proved. Next, a theor...
textabstractIn this chapter we give an overview on the theory of noncooperative games. In the first ...
textabstractIn this chapter we give an overview on the theory of noncooperative games. In the first ...
AbstractIn this paper we generalize Berge's Maximum Theorem to the case where the payoff (utility) f...
We survey results related to the problem of the existence of equilibria in some classes of infinitel...
In this paper we consider the Nash equilibrium problem for infinite player games with vector payoffs...
We consider the Nash equilibrium problem with vector payoffs in a topological vector space. By emplo...
We consider the Nash equilibrium problem with vector payoffs in a topological vector space. By emplo...
AbstractIn this paper, we introduce the topological pseudomonotonicity to vector valued bifunctions,...
The object of this paper is to provide a unified treatment for the study of the existence of equilib...
After defining a pure-action profile in a nonatomic aggregative game, where players have specific co...
The aim of this paper is to establish general existence results of maximal elements for L-majorized ...
This thesis consists of three separate essays in Game Theory. Each essay is contained in one chapter...
In this paper we propose a pseudo-Nash equilibrium for N -person games in which very simply we allow...
In this paper we generalize Berge's Maximum Theorem to the case where the payoff (utility) functions...
In this survey, a new minimax inequality and one equivalent geometric form are proved. Next, a theor...
textabstractIn this chapter we give an overview on the theory of noncooperative games. In the first ...
textabstractIn this chapter we give an overview on the theory of noncooperative games. In the first ...
AbstractIn this paper we generalize Berge's Maximum Theorem to the case where the payoff (utility) f...
We survey results related to the problem of the existence of equilibria in some classes of infinitel...