Duality and Saddle-Points for Convex-like Vector Optimization Problems on Real Linear Spaces.

  1. Novo Sanjurjo, Vicente
  2. Adán Oliver, Miguel
Revue:
Top

ISSN: 1863-8279 1134-5764

Année de publication: 2005

Volumen: 13

Número: 2

Pages: 343-358

Type: Article

DOI: 10.1007/BF02579060 DIALNET GOOGLE SCHOLAR

D'autres publications dans: Top

Résumé

Usually, finite dimensional linear spaces, locally convex topological linear spaces or normed spaces are the framework for vector and multiobjective optimization problems. Likewise, several generalizations of convexity are used in order to obtain new results. In this paper we show several Lagrangian type duality theorems and saddle-points theorems. From these, we obtain some characterizations of several e_cient solutions of vector optimization problems (VOP), such as weak and proper e_cient solutions in Benson's sense. These theorems are generalizations of pre- ceding results in two ways. Firstly, because we consider real linear spaces without any particular topology, and secondly because we work with a recently appeared convexlike type of convexity. This new type, designated GVCL in this paper, is based on a new algebraic closure which we named vector closure.