Least-squares solutions and least-rank solutions of the matrix equation AXA~* D B and their relations

Yongge Tian

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Least-squares solutions and least-rank solutions of the matrix equation AXA~* D B and their relations

机译：矩阵方程AXA〜* D B的最小二乘解和最小秩解及其关系

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A Hermitian matrix X is called a least-squares solution of the inconsistent matrix equation AXA~*= B, where B is Hermitian. A~* denotes the conjugate transpose of A if it minimizes the F-norm of B - AXA~*; it is called a least-rank solution of AXA~* = B if it minimizes the rank of B - AXA~*. In this paper, we study these two types of solutions by using generalized inverses of matrices and some matrix decompositions. In particular, we derive necessary and sufficient conditions for the two types of solutions to coincide.

机译：埃尔米特矩阵X被称为不一致矩阵方程AXA〜* = B的最小二乘解，其中B是埃尔米特。如果A〜*最小化B-AXA〜*的F-范数，则表示A的共轭转置;如果它使B-AXA〜*的等级最小，则称为AXA〜* = B的最低等级的解决方案。在本文中，我们通过使用矩阵的广义逆和某些矩阵分解来研究这两种类型的解。特别是，我们得出了两种解决方案要同时满足的必要条件和充分条件。

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《Numerical linear algebra with applications》 |2013年第5期|共10页
作者
Yongge Tian;
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正文语种 eng
中图分类代数方程论、线性代数;
关键词
matrix equation; least-squares solution; least-rank solution; Moore-Penrose inverse; SVD; rank formula;

机译：矩阵方程;最小二乘解;最小秩解;Moore-Penrose逆;SVD;秩公式;

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1. Least-squares solutions and least-rank solutions of the matrix equation AXA~* D B and their relations [J] . Yongge Tian Numerical linear algebra with applications . 2013,第5期

机译：矩阵方程AXA〜* D B的最小二乘解和最小秩解及其关系
2. Equalities and inequalities for Hermitian solutions and Hermitian definite solutions of the two matrix equations AX = B and AXA* = B [J] . Tian Y. Aequationes mathematicae . 2013,第1a2期

机译：两个矩阵方程AX = B和AXA * = B的埃尔米特解和埃尔米特定解的等式和不等式
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4. Relations between the solutions to matrix equations AXA*= B and CYC*= D [C] . Jing Wang International Conference on Automation, Mechanical Control and Computational Engineering . 2015

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Least-squares solutions and least-rank solutions of the matrix equation AXA~* D B and their relations

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