On Vector Equilibria, Vector Optimization and Vector Variational Inequalities

In this paper, we consider the vector quasivariational inequalities and the vector quasivariational-like inequalities for multifunctions with vector values and prove some existence theorems of solutions for our inequalities. Also, we give the relationship between a kind of the vector variational ine

In this paper, we study vector variational inequalities with set-valued mappings. The concept of C -pseudomonotone mapping is introduced. By employing the Fan x lemma, we establish several existence results. The new results extend and unify existence results of vector variational inequalities for si

Sufficient conditions are given to get weighted inequalities between two maximal operators on Banach valued regular martingales. As an application we obtain generalizations with weights of the inequalities in the definitions of UMD- and MT-Banach spaces and weighted estimates for the vector valued s

In recent years there have been several reports on duality in vector optimization. However, there seems to be no unified approach to dualization. In a previous paper by the author a geometric consideration was given to duality in non-linear vector optimization. In this paper a relationship between d

An approach to approximating solutions in vector optimization is developed for vector optimization problems with arbitrary ordering cones. This paper presents a study of approximately efficient points of a given set with respect to a convex cone in an ordered Banach space. Existence results for such