A systematization of global well-posedness in vector optimization.

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Title: A systematization of global well-posedness in vector optimization.
Authors: Rocca, Matteo1 (AUTHOR) matteo.rocca@uninsubria.it
Source: Annals of Operations Research. Mar2025, Vol. 346 Issue 2, p1653-1669. 17p.
Subjects: Multi-objective optimization, Vector valued functions
Abstract: In this paper we give a systematization of global well-posedness in vector optimization. We investigate the links among global notions of well-posedness for a vector optimization problem (see e.g. Miglierina et al. in J Optim Theory Appl 126:391–409, 2005 for a detailed explanation of the difference between pointwise and global well-posedness in vector optimization). In particular we compare several notions of global well-posedness referring to efficient solutions, weakly efficient solutions and properly efficient solutions of a vector optimization problem. We also establish scalar characterizations of global vector well-posedness. Finally we study global well-posedness of vector cone-convex functions. [ABSTRACT FROM AUTHOR]
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Abstract:In this paper we give a systematization of global well-posedness in vector optimization. We investigate the links among global notions of well-posedness for a vector optimization problem (see e.g. Miglierina et al. in J Optim Theory Appl 126:391–409, 2005 for a detailed explanation of the difference between pointwise and global well-posedness in vector optimization). In particular we compare several notions of global well-posedness referring to efficient solutions, weakly efficient solutions and properly efficient solutions of a vector optimization problem. We also establish scalar characterizations of global vector well-posedness. Finally we study global well-posedness of vector cone-convex functions. [ABSTRACT FROM AUTHOR]
ISSN:02545330
DOI:10.1007/s10479-024-06089-z