Optimal parameter for the SOR-like iteration method for solving the system of absolute value equations
Abstract
The SOR-like iteration method for solving the absolute value equations~(AVE) of finding a vector such that with is investigated. The convergence conditions of the SOR-like iteration method proposed by Ke and Ma ([{\em Appl. Math. Comput.}, 311:195--202, 2017]) are revisited and a new proof is given, which exhibits some insights in determining the convergent region and the optimal iteration parameter. Along this line, the optimal parameter which minimizes with and the approximate optimal parameter which minimizes are explored. The optimal and approximate optimal parameters are iteration-independent and the bigger value of is, the smaller convergent region of the iteration parameter is. Numerical results are presented to demonstrate that the SOR-like iteration method with the optimal parameter is superior to that with the approximate optimal parameter proposed by Guo, Wu and Li ([{\em Appl. Math. Lett.}, 97:107--113, 2019]). In some situation, the SOR-like itration method with the optimal parameter performs better, in terms of CPU time, than the generalized Newton method (Mangasarian, [{\em Optim. Lett.}, 3:101--108, 2009]) for solving the AVE.
Cite
@article{arxiv.2001.05781,
title = {Optimal parameter for the SOR-like iteration method for solving the system of absolute value equations},
author = {Cairong Chen and Dongmei Yu and Deren Han},
journal= {arXiv preprint arXiv:2001.05781},
year = {2023}
}
Comments
23 pages, 7 figures, 7 tables