Weak Pareto equilibria for multiobjective constrained games

In this paper, we introduce and study a new class of generalized constrained multiobjective games in locally FC-spaces without convexity structure where the number of players may be finite or infinite and all payoff functions get their values in an infinite-dimensional space. By using a Himmelberg t

In Keywords-Locally L-convex space, Collectively fixed point, System of quasi-equilibrium problems, Constrained multiobjective game, Pareto equilibria.

In this paper,.we introduce and study a new class of constrained multiobjective games in H-spaces without linear structure. An existence theorem of solutions for quasi-equilibrium problems is first proved in noncompact H-spaces. Then, as applications of the quasi-equilibrium existence theorem, sever

In this paper, we study the existence of weighted Nash-equilibria and Pareto equilibria for non-compact multiobjective games with multicriteria as applications of the Ky Fan minimax principle in 1972. As results, several existence theorems for non-compact weighted Nash-equilibria and Pareto equilibr

In this paper, it is shown that the structure of the set of Pareto equilibria for & bimatrix game resembles the structure of the set of (perfect) Nash equilibria. Msxim~ Pareto sulmets are introduced to take over the role of maximal Nash subsets. It is found that the set of Pareto equlh'brh is the f