Least squares solutions to AX=B for bisymmetric matrices under a central principal submatrix constraint and the optimal approximation

On the mixed solution of reduced biquaternion matrix equation $ \sum\limits_{i = 1}^nA_iX_iB_i = E $ with sub-matrix constraints and its application

Yimeng Xi
Zhihong Liu
Ying Li
Ruyu Tao
Tao Wang

October 2023

In this paper, we investigate the mixed solution of reduced biquaternion matrix equation $ \sum\limi...

The Solutions to Matrix Equation AX=B with Some Constraints

Chang-Zhou Dong
Yu-Ping Zhang

January 2014

Let P be a given Hermitian matrix satisfying P2=I. Using the eigenvalue decomposition of P, we consi...

Least-square solutions for inverse problems of centrosymmetric matrices

Zhou, Fu-Zhao
Zhang, Lei
Hu, Xi-Yan

June 2003

AbstractLet CSRnxn={A=(aij)ϵRnxn|aij=an+1−j, i,j=1,2…, n} In this paper, we mainly discuss solving t...

Least squares solutions to AX=B for bisymmetric matrices under a central principal submatrix constraint and the optimal approximation

Zhao, Lijun
Hu, Xiyan
Zhang, Lei

February 2008

AbstractA matrix A∈Rn×n is called a bisymmetric matrix if its elements ai,j satisfy the properties a...

The Inverse Problem of Nonsymmetric Matrices with a Submatrix Constraint and its Approximation

Yongxin Yuan
Hao Liu

July 2010

In this paper, we first give the representation of the general solution of the following least-squar...

An Iterative Method for the Least-Squares Problems of a General Matrix Equation Subjects to Submatrix Constraints

Li-fang Dai
Mao-lin Liang
Yong-hong Shen

January 2013

An iterative algorithm is proposed for solving the least-squares problem of a general matrix equatio...

The least squares Bisymmetric solution of quaternion matrix equation AXB=C

Dong Wang
Ying Li
Wenxv Ding

September 2021

In this paper, the idea of partitioning is used to solve quaternion least squares problem, we divide...

The nearness problems for symmetric matrix with a submatrix constraint

Yuan, Yongxin
Dai, Hua

March 2008

AbstractIn this paper, we first give the representation of the general solution of the following lea...

Two Iterative Algorithms to Compute the Bisymmetric Solution of the Matrix Equation A1X1B1 + A2X2B2 + ... + AlXlBl = C

A.Tajaddini

August 2013

In this paper, two matrix iterative methods are presented to solve the matrix equation A1X1B1 + A2X2...

Norm-Constrained Least-Squares Solutions to the Matrix Equation AXB=C

An-bao Xu
Zhenyun Peng

January 2013

An iterative method to compute the least-squares solutions of the matrix AXB=C over the norm inequal...

Ranks of least squares solutions of the matrix equation AXB=C

Liu, Yong Hui

March 2008

AbstractFor a complex matrix equation AXB=C, we solve the following two problems: (1) the maximal an...

Constrained Solutions of a System of Matrix Equations

Qing-Wen Wang
Juan Yu

We derive the necessary and sufficient conditions of and the expressions for the orthogonal solution...

The expansion problem of anti-symmetric matrix under a linear constraint and the optimal approximation

Gong, Lisha
Hu, Xiyan
Zhang, Lei

December 2006

AbstractThis paper mainly discusses the following two problems:Problem IGiven A∈Rn×m,B∈Rm×m,X0∈ASRq×...

On solvability of total least squares problems

Iveta Hnetynkova

January 2008

Let A be a real m by n matrix, and b a real m-vector. Consider estimating x from an orthogonally inv...

The bisymmetric solutions of the matrix equation A1X1B1+A2X2B2+⋯+AlXlBl=C and its optimal approximation

Peng, Zhuo-hua
Hu, Xi-yan
Zhang, Lei

October 2007

AbstractA matrix A=(aij)∈Rn×n is said to be bisymmetric matrix if aij=aji=an+1-j,n+1-i for all 1⩽i,j...

On the mixed solution of reduced biquaternion matrix equation $ \sum\limits_{i = 1}^nA_iX_iB_i = E $ with sub-matrix constraints and its application

Yimeng Xi
Zhihong Liu
Ying Li
Ruyu Tao
Tao Wang

October 2023

In this paper, we investigate the mixed solution of reduced biquaternion matrix equation $ \sum\limi...

The Solutions to Matrix Equation AX=B with Some Constraints

Chang-Zhou Dong
Yu-Ping Zhang

January 2014

Let P be a given Hermitian matrix satisfying P2=I. Using the eigenvalue decomposition of P, we consi...

Least-square solutions for inverse problems of centrosymmetric matrices

Zhou, Fu-Zhao
Zhang, Lei
Hu, Xi-Yan

June 2003

AbstractLet CSRnxn={A=(aij)ϵRnxn|aij=an+1−j, i,j=1,2…, n} In this paper, we mainly discuss solving t...

Least squares solutions to AX=B for bisymmetric matrices under a central principal submatrix constraint and the optimal approximation

Zhao, Lijun
Hu, Xiyan
Zhang, Lei

February 2008

AbstractA matrix A∈Rn×n is called a bisymmetric matrix if its elements ai,j satisfy the properties a...

The Inverse Problem of Nonsymmetric Matrices with a Submatrix Constraint and its Approximation

Yongxin Yuan
Hao Liu

July 2010

In this paper, we first give the representation of the general solution of the following least-squar...

An Iterative Method for the Least-Squares Problems of a General Matrix Equation Subjects to Submatrix Constraints

Li-fang Dai
Mao-lin Liang
Yong-hong Shen

January 2013

An iterative algorithm is proposed for solving the least-squares problem of a general matrix equatio...

The least squares Bisymmetric solution of quaternion matrix equation AXB=C

Dong Wang
Ying Li
Wenxv Ding

September 2021

In this paper, the idea of partitioning is used to solve quaternion least squares problem, we divide...

The nearness problems for symmetric matrix with a submatrix constraint

Yuan, Yongxin
Dai, Hua

March 2008

AbstractIn this paper, we first give the representation of the general solution of the following lea...

Two Iterative Algorithms to Compute the Bisymmetric Solution of the Matrix Equation A1X1B1 + A2X2B2 + ... + AlXlBl = C

A.Tajaddini

August 2013

In this paper, two matrix iterative methods are presented to solve the matrix equation A1X1B1 + A2X2...

Norm-Constrained Least-Squares Solutions to the Matrix Equation AXB=C

An-bao Xu
Zhenyun Peng

January 2013

An iterative method to compute the least-squares solutions of the matrix AXB=C over the norm inequal...

Ranks of least squares solutions of the matrix equation AXB=C

Liu, Yong Hui

March 2008

AbstractFor a complex matrix equation AXB=C, we solve the following two problems: (1) the maximal an...

Constrained Solutions of a System of Matrix Equations

Qing-Wen Wang
Juan Yu

We derive the necessary and sufficient conditions of and the expressions for the orthogonal solution...

The expansion problem of anti-symmetric matrix under a linear constraint and the optimal approximation

Gong, Lisha
Hu, Xiyan
Zhang, Lei

December 2006

AbstractThis paper mainly discusses the following two problems:Problem IGiven A∈Rn×m,B∈Rm×m,X0∈ASRq×...

On solvability of total least squares problems

Iveta Hnetynkova

January 2008

Let A be a real m by n matrix, and b a real m-vector. Consider estimating x from an orthogonally inv...

The bisymmetric solutions of the matrix equation A1X1B1+A2X2B2+⋯+AlXlBl=C and its optimal approximation

Peng, Zhuo-hua
Hu, Xi-yan
Zhang, Lei

October 2007

AbstractA matrix A=(aij)∈Rn×n is said to be bisymmetric matrix if aij=aji=an+1-j,n+1-i for all 1⩽i,j...

On the mixed solution of reduced biquaternion matrix equation $ \sum\limits_{i = 1}^nA_iX_iB_i = E $ with sub-matrix constraints and its application

Yimeng Xi
Zhihong Liu
Ying Li
Ruyu Tao
Tao Wang

October 2023

In this paper, we investigate the mixed solution of reduced biquaternion matrix equation $ \sum\limi...

The Solutions to Matrix Equation AX=B with Some Constraints

Chang-Zhou Dong
Yu-Ping Zhang

January 2014

Let P be a given Hermitian matrix satisfying P2=I. Using the eigenvalue decomposition of P, we consi...

Least-square solutions for inverse problems of centrosymmetric matrices

Zhou, Fu-Zhao
Zhang, Lei
Hu, Xi-Yan

June 2003

AbstractLet CSRnxn={A=(aij)ϵRnxn|aij=an+1−j, i,j=1,2…, n} In this paper, we mainly discuss solving t...

Least squares solutions to AX=B for bisymmetric matrices under a central principal submatrix constraint and the optimal approximation

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Least squares solutions to AX=B for bisymmetric matrices under a central principal submatrix constraint and the optimal approximation

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