Title:
An Inequality Approach to Approximate Solutions of Set Optimization Problems in Real Linear Spaces
Author(s):
Köbis, Elisabeth; Köbis, Markus A.; Qin, Xiaolong
Year of publication:
2020
Available Date:
2020-02-06T13:57:49Z
Abstract:
This paper explores new notions of approximate minimality in set optimization using a set approach. We propose characterizations of several approximate minimal elements of families of sets in real linear spaces by means of general functionals, which can be unified in an inequality approach. As particular cases, we investigate the use of the prominent Tammer–Weidner nonlinear scalarizing functionals, without assuming any topology, in our context. We also derive numerical methods to obtain approximate minimal elements of families of finitely many sets by means of our obtained results.
Part of Identifier:
e-ISSN (online): 2227-7390
Keywords:
set optimization
set relations
nonlinear scalarizing functional
algebraic interior
vector closure
DDC-Classification:
510 Mathematik
Publication Type:
Wissenschaftlicher Artikel
URL of the Original Publication:
DOI of the Original Publication:
Journaltitle:
Mathematics
Department/institution:
Mathematik und Informatik
