On semi-G-V-type I concepts for directionally differentiable multiobjective programming problems

Abstract

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In this paper, a new class of nonconvex nonsmooth multiobjective programming problems with directionally differentiable functions is considered. The so-called G-V-type I objective and constraint functions and their generalizations are introduced for such nonsmooth vector optimization problems. Based upon these generalized invex functions, necessary and sufficient optimality conditions are established for directionally differentiable multiobjective programming problems. Thus, new Fritz John type and Karush-Kuhn-Tucker type necessary optimality conditions are proved for the considered directionally differentiable multiobjective programming problem. Further, weak, strong and converse duality theorems are also derived for Mond-Weir type vector dual programs.

Keywords

• multiobjective programming
• (weak) Pareto optimal solution
• G-V-invex function
• G-Fritz John necessary optimality conditions
• G-Karush-Kuhn-Tucker necessary optimality conditions
• duality