English

Stochastic Approximation in convex multiobjective optimization

Optimization and Control 2023-03-06 v1 Functional Analysis

Abstract

Given a strictly convex multiobjective optimization problem with objective functions f1,,fNf_1,\dots,f_N, let us denote by x0x_0 its solution, obtained as minimum point of the linear scalarized problem, where the objective function is the convex combination of f1,,fNf_1,\dots,f_N with weights t1,,tNt_1,\ldots,t_N. The main result of this paper gives an estimation of the averaged error that we make if we approximate x0x_0 with the minimum point of the convex combinations of nn functions, chosen among f1,,fNf_1,\dots,f_N, with probabilities t1,,tNt_1,\ldots,t_N, respectively, and weighted with the same coefficient 1/n1/n. In particular, we prove that the averaged error considered above converges to 0 as nn goes to \infty, uniformly w.r.t. the weights t1,,tNt_1,\ldots,t_N. 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 f1,,fNf_1,\dots,f_N continuously depends on the coefficients of the convex combination.

Keywords

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}
}
R2 v1 2026-06-28T08:59:03.970Z