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| 线性流形上反埃尔米特广义反汉密尔顿矩阵反问题的最小二乘解及其最佳逼近问题 | |
| 引用本文: | 关力,江燕. 线性流形上反埃尔米特广义反汉密尔顿矩阵反问题的最小二乘解及其最佳逼近问题[J]. 湘潭大学自然科学学报, 2006, 28(2): 13-18 |
| 作者姓名: | 关力 江燕 |
| 作者单位: | 东莞理工学院数学系,广东,东莞,523808 |
| 基金项目: | 国家自然科学基金资助项目(10571047) |
| 摘 要: | 利用反埃尔米特广义反汉密尔顿矩阵的特征性质和矩阵的分解理论,给出了线性流形上反埃尔米特广义反汉密尔顿矩阵反问题的最小二乘解的一般表达式.运用正交投影矩阵的性质和希尔伯特空间的逼近理论,对任意给定的n阶复矩阵,证明了最佳逼近解的存在性与惟一性,并得到了最佳逼近解的表达式. |
| 关 键 词: | 反埃尔米特广义反汉密尔顿矩阵 线性流形 最佳逼近 最小二乘解 |
| 文章编号: | 1000-5900(2006)02-0013-06 |
| 收稿时间: | 2005-12-05 |
| 修稿时间: | 2005-12-05 |
Least-squares Solutions for Inverse Problem of Anti-Hermitian Generalized Anti-Hamiltonian Matrices on the Linear Manifold and Optimal Approximation Problem |
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| GUAN Li,JIANG Yan. Least-squares Solutions for Inverse Problem of Anti-Hermitian Generalized Anti-Hamiltonian Matrices on the Linear Manifold and Optimal Approximation Problem[J]. Natural Science Journal of Xiangtan University, 2006, 28(2): 13-18 | |
| Authors: | GUAN Li JIANG Yan |
| Affiliation: | Department of Mathematies, Dongguan University of Technology,Dongguan 523808 China |
| Abstract: | Using the properties of anti-Hermitian generalized anti-Hamiltonian matrices and decomposition theory of matrix,we obtained a general expression of the least-squares solutions for inverse problem of anti-Hermitian generalized anti-Hamiltonian matrix on the linear manifold.We established some necessary and sufficient conditions for the linear matrix equation AX=B to have a solution on the linear manifold.For any n by n complex matrix,we also derived an expression of the solution for relevant optimal approximate problem. |
| Keywords: | anti-Hermitian generalized anti-Hamiltonian matrices linear manifold optimal approximation least-squares solution |
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