首页 | 本学科首页   官方微博 | 高级检索  
     

一类矩阵方程的极小Frobenius范数双对称解
引用本文:黄敬频. 一类矩阵方程的极小Frobenius范数双对称解[J]. 应用数学与计算数学学报, 2004, 18(2): 49-56
作者姓名:黄敬频
作者单位:广西民族学院计算机与信息科学学院,南宁,530006
摘    要:利用矩阵的广义奇异值分解,给出了实矩阵方程ATXA=B存在极小Frobenius范数双对称解的充要条件及其解的表达式.

关 键 词:矩阵方程  广义奇异值分解  Frobenius范数  双对称矩阵
修稿时间:2001-09-20

The Bisymmetric Solution of Minimum Frobenius Norm For a Class of Matrix Equations
Huang Jingpin College of Computer and Information Science,Guangxi University for Nationalities,Nanning,Guangxi ,China. The Bisymmetric Solution of Minimum Frobenius Norm For a Class of Matrix Equations[J]. Communication on Applied Mathematics and Computation, 2004, 18(2): 49-56
Authors:Huang Jingpin College of Computer  Information Science  Guangxi University for Nationalities  Nanning  Guangxi   China
Affiliation:Huang Jingpin College of Computer and Information Science,Guangxi University for Nationalities,Nanning,Guangxi 530006,China
Abstract:By using generalized Singular value decomposition of matrices,the necessary and sufficient conditions of the real matrix equation ATXA = B having the bisymmetric of minimum norm solutions and their general forms are derived.
Keywords:matrix equation   generalized singular value decomposition   Frobenius norm   bisymmetric matrix
本文献已被 CNKI 维普 万方数据 等数据库收录!
设为首页 | 免责声明 | 关于勤云 | 加入收藏

Copyright©北京勤云科技发展有限公司  京ICP备09084417号