Existence and Duality of Generalized Vector Equilibrium Problems

The purpose of this paper is to give new existence theorems of equilibrium and separation in generalized games with an uncountable number of agents.

In this paper, some generalized concepts about semicontinuity and convexity for vector-valued bifunctions are introduced. A new existence theorem for vector equilibrium problems is proved. Further, a random version of this result is considered. Applications to cone saddle points, random vector optim

We define the generalized efficient solution which is more general than the weakly efficient solution for vector optimization problems, and prove the existence of the generalized efficient solution for nondifferentiable vector optimization problems by using vector variational-like inequalities for s

defined another kind of invexity, corresponding generalized invexity, and discussed the duality for multiobjective control problems with such generalized invexity. In this paper, the duality results for multiobjective control problems with Mond and Smart's generalized invexity are discussed.