Optimality Conditions for Multiobjective Optimization Problems via Image Space Analysis

In this article, optimality conditions on (weak) efficient solutions in multiobjective optimization problems are investigated by using the image space analysis. A class of strong separation functions is constructed by oriented distance functions. Simultaneously, a generalized Lagrange function is in...

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Bibliographic Details
Published in:Numerical functional analysis and optimization Vol. 44; no. 7; pp. 708 - 723
Main Authors: Xu, Yingrang, Li, Shengjie
Format: Journal Article
Language:English
Published: Abingdon Taylor & Francis 19.05.2023
Taylor & Francis Ltd
Subjects:
90C29
90C46
Generalized KKT necessary conditions
image space analysis
Lagrangian-type sufficient conditions
Multiple objective analysis
Optimization
Separation
strong separation function
ISSN:0163-0563, 1532-2467
Online Access:Get full text
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Summary:In this article, optimality conditions on (weak) efficient solutions in multiobjective optimization problems are investigated by using the image space analysis. A class of strong separation functions is constructed by oriented distance functions. Simultaneously, a generalized Lagrange function is introduced by the class of strong separation functions. Then, generalized Karush-Kuhn-Tucker (KKT for short) necessary optimality conditions are established without constraint qualifications or regularity conditions. Under the suitable assumptions, Lagrangian-type sufficient optimality conditions are also characterized. Moreover, the difference between strong separation and weak separation methods is explained.
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ISSN:0163-0563
1532-2467
DOI:10.1080/01630563.2023.2208867