On a fixed-point continuation method for a convex optimization problem
Abstract
We consider a variation of the classical proximal-gradient algorithm for the iterative minimization of a cost function consisting of a sum of two terms, one smooth and the other prox-simple, and whose relative weight is determined by a penalty parameter. This so-called fixed-point continuation method allows one to approximate the problem's trade-off curve, i.e. to compute the minimizers of the cost function for a whole range of values of the penalty parameter at once. The algorithm is shown to converge, and a rate of convergence of the cost function is also derived. Furthermore, it is shown that this method is related to iterative algorithms constructed on the basis of the -subdifferential of the prox-simple term. Some numerical examples are provided.
Cite
@article{arxiv.2212.12256,
title = {On a fixed-point continuation method for a convex optimization problem},
author = {Jean-Baptiste Fest and Tommi Heikkilä and Ignace Loris and Ségolène Martin and Luca Ratti and Simone Rebegoldi and Gesa Sarnighausen},
journal= {arXiv preprint arXiv:2212.12256},
year = {2024}
}
Comments
15 pages, 2 figures. Workshop on Advanced Techniques in Optimization for Machine learning and Imaging