Error bounds for linear complementarity problems of weakly chained diagonally dominant B-matrices

被引:0
作者
Feng Wang
机构
[1] Guizhou Minzu University,College of Science
来源
Journal of Inequalities and Applications | / 2017卷
关键词
error bound; linear complementarity problem; weakly chained diagonally dominant matrix; -matrix; 90C33; 60G50; 65F35;
D O I
暂无
中图分类号
学科分类号
摘要
In this paper, new error bounds for the linear complementarity problem are obtained when the involved matrix is a weakly chained diagonally dominant B-matrix. The proposed error bounds are better than some existing results. The advantages of the results obtained are illustrated by numerical examples.
引用
收藏
相关论文
共 50 条
[31]   New error bounds for linear complementarity problems of S-Nekrasov matrices and B–S-Nekrasov matrices [J].
Ping-Fan Dai ;
Jicheng Li ;
Jianchao Bai ;
Liqiang Dong .
Computational and Applied Mathematics, 2019, 38
[32]   New error bounds for linear complementarity problems of S-Nekrasov matrices and B-S-Nekrasov matrices [J].
Dai, Ping-Fan ;
Li, Jicheng ;
Bai, Jianchao ;
Dong, Liqiang .
COMPUTATIONAL & APPLIED MATHEMATICS, 2019, 38 (02)
[33]   Global error bounds of the extended vertical linear complementarity problems for Dashnic–Zusmanovich matrices and Dashnic–Zusmanovich-B matrices [J].
Yingxia Zhao ;
Deshu Sun .
Journal of Inequalities and Applications, 2022
[34]   Global error bounds of the extended vertical linear complementarity problems for Dashnic-Zusmanovich matrices and Dashnic-Zusmanovich-B matrices [J].
Zhao, Yingxia ;
Sun, Deshu .
JOURNAL OF INEQUALITIES AND APPLICATIONS, 2022, 2022 (01)
[35]   Error bounds for linear complementarity problems of strong S DD1 matrices and strong S DD1-B matrices [J].
Geng, Yuanjie ;
Sun, Deshu .
AIMS MATHEMATICS, 2023, 8 (11) :27052-27064
[36]   Error bounds for regularized complementarity problems [J].
Tseng, P .
ILL-POSED VARIATIONAL PROBLEMS AND REGULARIZATION TECHNIQUES, 1999, 477 :247-274
[37]   New error bound for linear complementarity problem of S -S DDS -B matrices [J].
Liu, Lanlan ;
Han, Pan ;
Wang, Feng .
AIMS MATHEMATICS, 2021, 7 (02) :3239-3249
[38]   NEW ERROR-BOUNDS FOR THE LINEAR COMPLEMENTARITY-PROBLEM [J].
LUO, ZQ ;
MANGASARIAN, OL ;
REN, J ;
SOLODOV, MV .
MATHEMATICS OF OPERATIONS RESEARCH, 1994, 19 (04) :880-892
[39]   Some new two-sided bounds for determinants of diagonally dominant matrices [J].
Wen Li ;
Yanmei Chen .
Journal of Inequalities and Applications, 2012
[40]   On Error Bounds for the Extended Vertical Linear Complementarity Problem [J].
Wu, Shi-Liang ;
Wang, He-Hui .
JOURNAL OF THE OPERATIONS RESEARCH SOCIETY OF CHINA, 2024,
12345