Optimality and duality for semidefinite multiobjective programming problems using convexificators

Shashi Kant Mishra; Rahul Kumar; Vivek Laha; Jitendra Kumar Maurya; M Lobo; H Lebret; L Vandenberghe; B Fares; D Noll; P Apkarian; A Ben-Tal; F Jarre; M Kocvara; A Nemirovski; J Zowe; A Shapiro; D Sun; L Zhang; A Forsgren; J Sun; H Yamashita; H Yabe; M Golestani; S Nobakhtian; T Maeda; V Preda; X Li; D Luu; P Linh; M Hachimi; B Aghezzaf; T Bao; T Le; C Tammer; V Tuan; V Demyanov; V Jeyakumar; D Luc; B Mond; S Boyd; L Ghaoui; E Feron; V Balakrishnan; F Clarke; P Michel; J Penot; B Mordukhovich; Y Shao; J Treiman; J Fan

doi:10.23952/jano.4.2022.1.08

JOURNAL ARTICLE

Optimality and duality for semidefinite multiobjective programming problems using convexificators

Shashi Kant Mishra Rahul Kumar Vivek Laha Jitendra Kumar Maurya M Lobo L Vandenberghe S Boyd H Lebret L Vandenberghe S Boyd B Fares D Noll P Apkarian A Ben-Tal F Jarre M Kocvara A Nemirovski J Zowe A Shapiro D Sun J Sun L Zhang A Forsgren J Sun H Yamashita H Yabe M Golestani S Nobakhtian T Maeda V Preda X Li D Luu P Linh M Hachimi B Aghezzaf T Bao T Le C Tammer V Tuan V Demyanov V Jeyakumar V Jeyakumar D Luc B Mond S Boyd L Ghaoui E Feron V Balakrishnan F Clarke P Michel J Penot B Mordukhovich Y Shao J Treiman J Fan

Year: 2022 Journal: Journal of Applied and Numerical Optimization Vol: 4 (1)

DOI: 10.23952/jano.4.2022.1.08

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Abstract

In this paper, we establish Fritz John optimality conditions for nonsmooth nonlinear semidefinite multiobjective programming in terms of convexificators, and introduce generalized Cottle type and generalized Guignard type constraint qualification to achieve strong Karush-Kuhn-Tucker optimality conditions from Fritz John optimality.Strong Karush-Kuhn-Tucker necessary and sufficient optimality conditions also established independently.Furthermore, we formulate Wolfe and Mond-Weir type dual model, and establish usual duality results for the problems.Some examples are provided in the support of the main results.

Keywords:

Duality (order theory) Semidefinite programming Mathematical optimization Semidefinite embedding Multiobjective programming Mathematics Strong duality Multi-objective optimization Mathematical economics Computer science Combinatorics Optimization problem Quadratically constrained quadratic program Quadratic programming

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Optimization and Variational Analysis

Physical Sciences → Computer Science → Computational Theory and Mathematics

Advanced Control Systems Optimization

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Advanced Optimization Algorithms Research

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Optimality and duality for semidefinite multiobjective programming problems using convexificators

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