Optimization Online


Characterization of properly optimal elements with variable ordering structures

Gabriele Eichfelder (Gabriele.Eichfelder***at***tu-ilmenau.de)
Tobias Gerlach (Tobias.Gerlach***at***tu-ilmenau.de)

Abstract: In vector optimization with a variable ordering structure the partial ordering defined by a convex cone is replaced by a whole family of convex cones, one associated with each element of the space. In recent publications it was started to develop a comprehensive theory for these vector optimization problems. Thereby also notions of proper efficiency were generalized to variable ordering structures. In this paper we study the relation between several types of proper optimality. We give scalarization results based on new functionals defined by elements from the dual cones which allow characterizations also in the nonconvex case.

Keywords: vector optimization, variable ordering structure, proper efficiency, scalarization

Category 1: Other Topics (Multi-Criteria Optimization )

Category 2: Nonlinear Optimization (Constrained Nonlinear Optimization )

Citation: Optimization, Doi 10.1080/02331934.2015.1040793, 2015


Entry Submitted: 01/15/2014
Entry Accepted: 01/15/2014
Entry Last Modified: 04/13/2015

Modify/Update this entry

  Visitors Authors More about us Links
  Subscribe, Unsubscribe
Digest Archive
Search, Browse the Repository


Coordinator's Board
Classification Scheme
Give us feedback
Optimization Journals, Sites, Societies
Mathematical Optimization Society