Convex quartic problems: homogenized gradient method and preconditioning
Abstract
We consider a convex minimization problem for which the objective is the sum of a homogeneous polynomial of degree four and a linear term. Such task arises as a subproblem in algorithms for quadratic inverse problems with a difference-of-convex structure. We design a first-order method called Homogenized Gradient, along with an accelerated version, which enjoy fast convergence rates of respectively and in relative accuracy, where is the iteration counter. The constant is the quartic condition number of the problem. Then, we show that for a certain class of problems, it is possible to compute a preconditioner for which this condition number is , where is the problem dimension. To establish this, we study the more general problem of finding the best quadratic approximation of an norm composed with a quadratic map. Our construction involves a generalization of the so-called Lewis weights.
Cite
@article{arxiv.2306.17683,
title = {Convex quartic problems: homogenized gradient method and preconditioning},
author = {Radu-Alexandru Dragomir and Yurii Nesterov},
journal= {arXiv preprint arXiv:2306.17683},
year = {2024}
}
Comments
27 pages, 2 figures