The Optimality Conditions for Vector Optimization of Set-Valued Maps

In this note, a general cone separation theorem between two subsets of image space is presented. With the aid of this, optimality conditions and duality for vector optimization of set-valued functions in locally convex spaces are discussed.

In this paper we discuss the connections of four generalized constraint qualifications for set-valued vector optimization problems with constraints. Then some K-T type necessary and sufficient optimality conditions are derived, in terms of the contingent epiderivatives.

This paper deals with the differentiable vector optimization problems in the locally convex topological vector spaces. We first establish a theorem of the alternative of the Gordan type. Finally, the optimality conditions of the Kuhn᎐ Tucker type are obtained.

This paper establishes an alternative theorem for generalized inequality-equality Ž . systems of set-valued maps. Based on this, several Lagrange multiplier type as well as saddle point type necessary and sufficient conditions are obtained for the existence of weak minimizers in vector optimization