English

Optimal parameter for the SOR-like iteration method for solving the system of absolute value equations

Numerical Analysis 2023-10-17 v2 Numerical Analysis Optimization and Control

Abstract

The SOR-like iteration method for solving the absolute value equations~(AVE) of finding a vector xx such that Axxb=0Ax - |x| - b = 0 with ν=A12<1\nu = \|A^{-1}\|_2 < 1 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 Tν(ω)2\|T_\nu(\omega)\|_2 with Tν(ω)=(1ωω2ν1ω1ω+ω2ν)T_\nu(\omega) = \left(\begin{array}{cc} |1-\omega| & \omega^2\nu \\ |1-\omega| & |1-\omega| +\omega^2\nu \end{array}\right) and the approximate optimal parameter which minimizes ην(ω)=max{1ω,νω2}\eta_{\nu}(\omega) =\max\{|1-\omega|,\nu\omega^2\} are explored. The optimal and approximate optimal parameters are iteration-independent and the bigger value of ν\nu is, the smaller convergent region of the iteration parameter ω\omega 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

R2 v1 2026-06-23T13:12:54.134Z