A Homogeneous Second-Order Descent Method for Nonconvex Optimization
Abstract
In this paper, we introduce a Homogeneous Second-Order Descent Method (HSODM) using the homogenized quadratic approximation to the original function. The merit of homogenization is that only the leftmost eigenvector of a gradient-Hessian integrated matrix is computed at each iteration. Therefore, the algorithm is a single-loop method that does not need to switch to other sophisticated algorithms and is easy to implement. We show that HSODM has a global convergence rate of to find an -approximate second-order stationary point, and has a local quadratic convergence rate under the standard assumptions. The numerical results demonstrate the advantage of the proposed method over other second-order methods.
Cite
@article{arxiv.2211.08212,
title = {A Homogeneous Second-Order Descent Method for Nonconvex Optimization},
author = {Chuwen Zhang and Dongdong Ge and Chang He and Bo Jiang and Yuntian Jiang and Chenyu Xue and Yinyu Ye},
journal= {arXiv preprint arXiv:2211.08212},
year = {2025}
}
Comments
Add inexactness, significantly improve the paper