THE WEAKER CONVERGENCE OF NON-STATIONARY MATRIX MULTISPLITTING METHODS FOR ALMOST LINEAR SYSTEMS

被引：13

作者：

Zhang, Li-Tao ^{[1
]}

Huang, Ting-Zhu ^{[2
]}

Cheng, Shao-Hua ^{[1
]}

Gu, Tong-Xiang ^{[3
]}

机构：

[1] Zhengzhou Inst Aeronaut Ind Management, Dept Math & Phys, Zhengzhou 450015, Henan, Peoples R China

[2] Univ Elect Sci & Technol China, Sch Appl Math, Chengdu 610054, Sichuan, Peoples R China

[3] Lab Computationary Phys, Beijing 100088, Peoples R China

来源：

TAIWANESE JOURNAL OF MATHEMATICS | 2011年 / 15卷 / 04期

关键词：

H-matrix; M-matrix; Almost linear systems; Non-stationary matrix multisplitting multi-parameters methods; ALGORITHMS;

D O I：

10.11650/twjm/1500406354

中图分类号：

O1 [数学];

学科分类号：

0701 ; 070101 ;

摘要：

In 1999, Arnal et al. [Numerical linear algebra and its applications, 6(1999): 79-92] introduced the non-stationary matrix multisplitting algorithms for almost linear systems and studied the convergence of them. In this paper, we generalize Amal's algorithms and study the non-stationary matrix multisplitting multi-parameters methods for almost linear systems. The parameters can be adjusted suitably so that the convergence property of methods can be substantially improved. Furthermore, the convergence results of our new method in this paper are weaker than those of Arnal's. Finally, numerical examples show that our new convergence results are better and more efficient than Arnal's.

引用

页码：1423 / 1436

页数：14

共 50 条

[1] Non-stationary parallel multisplitting algorithms for almost linear systems
Arnal, J
Migallón, V
Penadés, J
NUMERICAL LINEAR ALGEBRA WITH APPLICATIONS, 1999, 6 (02) : 79 - 92
[2] The Weaker, Convergence of Matrix Multisplitting Methods for the Linear Complementarity Problem
Zhang, Li-Tao
Huang, Ting-Zhu
Gu, Tong-Xiang
Zuo, Xian-Yu
ADVANCES IN MATRIX THEORY AND ITS APPLICATIONS, VOL 1: PROCEEDINGS OF THE EIGHTH INTERNATIONAL CONFERENCE ON MATRIX THEORY AND ITS APPLICATIONS, 2008, : 433 - 436
[3] Convergence of non-stationary parallel multisplitting methods for hermitian positive definite matrices
Castel, MJ
Migallon, V
Penades, J
MATHEMATICS OF COMPUTATION, 1998, 67 (221) : 209 - 220
[4] ON THE CONVERGENCE DOMAIN OF THE MATRIX MULTISPLITTING RELAXATION METHODS FOR LINEAR SYSTEMS
BAI ZHONGZHI
AppliedMathematics:AJournalofChineseUniversities, 1998, (01) : 47 - 54
[5] On the convergence of asynchronous nested matrix multisplitting methods for linear systems
Bai, ZZ
Wang, DR
Evans, DJ
JOURNAL OF COMPUTATIONAL MATHEMATICS, 1999, 17 (06) : 575 - 588
[6] On the convergence of asynchronous nested matrix multisplitting methods for linear systems
J Comput Math, 6 (575-588):
[7] On the convergence domain of the matrix multisplitting relaxation methods for linear systems
Bai Z.Z.
Applied Mathematics-A Journal of Chinese Universities, 1998, 13 (1) : 45 - 52
[8] Non-stationary two-stage multisplitting iterative methods for the parallel solutions of linear systems
Gongcheng Shuxue Xuebao/Chinese Journal of Engineering Mathematics, 1997, 14 (04): : 25 - 32
[9] Weaker Convergence of Global Relaxed Multisplitting USAOR Methods for an H-matrix
Li-Tao Zhang
Ding-De Jiang
Xian-Yu Zuo
Ying-Chao Zhao
Mobile Networks and Applications, 2021, 26 : 755 - 765
[10] Weaker Convergence of Global Relaxed Multisplitting USAOR Methods for anH-matrix
Zhang, Li-Tao
Jiang, Ding-De
Zuo, Xian-Yu
Zhao, Ying-Chao
MOBILE NETWORKS & APPLICATIONS, 2021, 26 (02): : 755 - 765

← 1 2 3 4 5 →