Optimality conditions for approximate proper solutions in multiobjective optimization with polyhedral cones

C. Gutiérrez; L. Huerga; B. Jiménez; V. Novo

doi:10.1007/S11750-020-00546-1

Optimality conditions for approximate proper solutions in multiobjective optimization with polyhedral cones

C. Gutiérrez ¹
L. Huerga ²
B. Jiménez ²
V. Novo ²

1 Universidad de Valladolid, España
2 Universidad Nacional de Educación a Distancia, España

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ISSN: 1863-8279, 1134-5764

Argitalpen urtea: 2020

Alea: 28

Zenbakia: 2

Orrialdeak: 526-544

Mota: Artikulua

DOI: 10.1007/S11750-020-00546-1 DIALNET GOOGLE SCHOLAR Sarbide irekia editor

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Garapen Iraunkorreko Helburuak

Laburpena

In this paper, we provide optimality conditions for approximate proper solutions of a multiobjective optimization problem, whose feasible set is given by a cone constraint and the ordering cone is polyhedral. A first class of optimality conditions is given by means of a nonlinear scalar Lagrangian and the second kind through a linear scalarization technique, under generalized convexity hypotheses, that lets us derive a Kuhn–Tucker multiplier rule.

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Finantzaketari buruzko informazioa

Finantzatzaile

Ministerio de Ciencia, Innovación y Universidades
- PGC2018-096899-B-I00
- PGC2018-096899-B-I00

Datuen iturria: Dialnet