A Partially Derivative-Free Proximal Method for Composite Multiobjective Optimization in the H\"older Setting

Abstract

This paper presents an algorithm for solving multiobjective optimization problems involving composite functions, where we minimize a quadratic model that approximates F(x) - F(xk) and that can be derivative-free. We establish theoretical assumptions about the component functions of the composition and provide comprehensive convergence and complexity analysis. Specifically, we prove that the proposed method converges to a weakly -approximate Pareto point in at most O(-β+1β) iterations, where β denotes the H\"older exponent of the gradient. The algorithm incorporates gradient approximations and a scaling matrix Bk to achieve an optimal balance between computational accuracy and efficiency. Numerical experiments on a collection of benchmark problems are presented, illustrating the practical behavior of the proposed approach and its competitiveness with existing composite algorithms.