Stochastic Approximation in convex multiobjective optimization
Abstract
Given a strictly convex multiobjective optimization problem with objective functions , let us denote by its solution, obtained as minimum point of the linear scalarized problem, where the objective function is the convex combination of with weights . The main result of this paper gives an estimation of the averaged error that we make if we approximate with the minimum point of the convex combinations of functions, chosen among , with probabilities , respectively, and weighted with the same coefficient . In particular, we prove that the averaged error considered above converges to 0 as goes to , uniformly w.r.t. the weights . The key tool in the proof of our stochastic approximation theorem is a geometrical property, called by us small diameter property, ensuring that the minimum point of a convex combination of the function continuously depends on the coefficients of the convex combination.
Cite
@article{arxiv.2303.01797,
title = {Stochastic Approximation in convex multiobjective optimization},
author = {Carlo Alberto De Bernardi and Enrico Miglierina and Elena Molho and Jacopo Somaglia},
journal= {arXiv preprint arXiv:2303.01797},
year = {2023}
}