A Refined Proximal Algorithm for Nonconvex Multiobjective Optimization in Hilbert Spaces
Optimization and Control
2024-03-18 v1
Abstract
This paper is devoted to general nonconvex problems of multiobjective optimization in Hilbert spaces. Based on Mordukhovich's limiting subgradients, we define a new notion of Pareto critical points for such problems, establish necessary optimality conditions for them, and then employ these conditions to develop a refined version of the vectorial proximal point algorithm with providing its detailed convergence analysis. The obtained results largely extend those initiated by Bonnel, Iusem and Svaiter \cite{Bonnel2005} for convex vector optimization problems and by Bento et al. \cite{Bento2018} for nonconvex finite-dimensional problems in terms of Clarke's generalized gradients.
Cite
@article{arxiv.2403.09922,
title = {A Refined Proximal Algorithm for Nonconvex Multiobjective Optimization in Hilbert Spaces},
author = {G. C. Bento and J. X. Cruz Neto and J. O. Lopes and B. S. Mordukhovich and P. R. Silva Filho},
journal= {arXiv preprint arXiv:2403.09922},
year = {2024}
}
Comments
18 pages