A Note on Complexity for Two Classes of Structured Non-Smooth Non-Convex Compositional Optimization
Abstract
This note studies numerical methods for solving compositional optimization problems, where the inner function is smooth, and the outer function is Lipschitz continuous, non-smooth, and non-convex but exhibits one of two special structures that enable the design of efficient first-order methods. In the first structure, the outer function allows for an easily solvable proximal mapping. We demonstrate that, in this case, a smoothing compositional gradient method can find a -stationary point--specifically defined for compositional optimization--in iterations. In the second structure, the outer function is expressed as a difference-of-convex function, where each convex component is simple enough to allow an efficiently solvable proximal linear subproblem. In this case, we show that a prox-linear method can find a nearly -critical point in iterations.
Cite
@article{arxiv.2411.14342,
title = {A Note on Complexity for Two Classes of Structured Non-Smooth Non-Convex Compositional Optimization},
author = {Yao Yao and Qihang Lin and Tianbao Yang},
journal= {arXiv preprint arXiv:2411.14342},
year = {2024}
}