The inertia of the symmetric approximation for low-rank matrices

A Decomposition Method for Weighted Least Squares Low-rank Approximation of Symmetric Matrices

de Leeuw, Jan

April 2006

We discuss an alternating least squares algorithm that uses both decomposition and block relaxation ...

An alternating least squares method for the weighted approximation of a symmetric matrix

ten Berge, Jos M.F.
Kiers, Henk A.L.

March 1993

Bailey and Gower examined the least squares approximation C to a symmetric matrix B, when the square...

On maximum volume submatrices and cross approximation for symmetric semidefinite and diagonally dominant matrices

Cortinovis A.
Kressner D.
Massei S.

January 2020

The problem of finding a k×k submatrix of maximum volume of a matrix A is of interest in a variety o...

The inertia of the symmetric approximation for low-rank matrices

Casanellas Rius, Marta
Fernández Sánchez, Jesús
Garrote López, Marina

Low rank approximation of positive semi-definite symmetric matrices using Gaussian elimination and volume sampling

Hegland, Markus
de Hoog, Frank

November 2021

Positive semi-definite matrices commonly occur as normal matrices of least squares problems in stati...

Best rank-1 approximations without orthogonal invariance for the 1-norm

Vasudevan, Varun A

January 2016

Data measured in the real-world is often composed of both a true signal, such as an image or experim...

Approximation of Positive Semidefinite Matrices Using the Nyström Method

Nicholas Arcolano
Patrick J. Wolfe
Nicholas Arcolano

January 2011

Positive semidefinite matrices arise in a variety of fields, including statistics, signal processing...

Approximation in trace norm by positive semidefinite matrices

Ando, T.

November 1985

AbstractInformation is obtained about best approximation of a matrix by positive semidefinite ones, ...

On A Problem Of Weighted Low-Rank Approximation Of Matrices

Dutta, Aritra
Li, Xin

January 2017

We study a weighted low-rank approximation that is inspired by a problem of constrained low-rank app...

Determining the inertia of a matrix pencil as a function of the parameter

Väliaho, H.

August 1988

AbstractWe determine the inertia of a linear real symmetric matrix pencil A(t)=A−tB of order n as a ...

Restricted rank modification of the symmetric eigenvalue problem: Theoretical considerations

Arbenz, Peter
Gander, Walter
Golub, Gene H.

June 1988

AbstractThe problem is considered how to obtain the eigenvalues and vectors of a matrix A+VVT where ...

Rank inequalities for positive semidefinite matrices

Lundquist, Michael
Barrett, Wayne

November 1996

AbstractSeveral inequalities relating the rank of a positive semidefinite matrix with the ranks of v...

Low Phase-Rank Approximation

Zhao, Di
Ringh, Axel
Qiu, Li
Khong, Sei Zhen

January 2022

In this paper, we propose and solve low phase-rank approximation problems, which serve as a counterp...

Rank-one approximation of positive matrices based on methods of tropical mathematics

Krivulin, Nikolai K.
Romanova, Elizaveta Yu.

June 2018

Low-rank matrix approximation finds wide application in the analysis of big data, in recommendation ...

Semidefiniteness Without Real Symmetry

Charles R. Johnson
Robert Reams

February 2015

Let A be an n-by-n matrix with real entries. We show that a necessary and sufficient condition for A...

A Decomposition Method for Weighted Least Squares Low-rank Approximation of Symmetric Matrices

de Leeuw, Jan

April 2006

We discuss an alternating least squares algorithm that uses both decomposition and block relaxation ...

An alternating least squares method for the weighted approximation of a symmetric matrix

ten Berge, Jos M.F.
Kiers, Henk A.L.

March 1993

Bailey and Gower examined the least squares approximation C to a symmetric matrix B, when the square...

On maximum volume submatrices and cross approximation for symmetric semidefinite and diagonally dominant matrices

Cortinovis A.
Kressner D.
Massei S.

January 2020

The problem of finding a k×k submatrix of maximum volume of a matrix A is of interest in a variety o...

The inertia of the symmetric approximation for low-rank matrices

Casanellas Rius, Marta
Fernández Sánchez, Jesús
Garrote López, Marina

Low rank approximation of positive semi-definite symmetric matrices using Gaussian elimination and volume sampling

Hegland, Markus
de Hoog, Frank

November 2021

Positive semi-definite matrices commonly occur as normal matrices of least squares problems in stati...

Best rank-1 approximations without orthogonal invariance for the 1-norm

Vasudevan, Varun A

January 2016

Data measured in the real-world is often composed of both a true signal, such as an image or experim...

Approximation of Positive Semidefinite Matrices Using the Nyström Method

Nicholas Arcolano
Patrick J. Wolfe
Nicholas Arcolano

January 2011

Positive semidefinite matrices arise in a variety of fields, including statistics, signal processing...

Approximation in trace norm by positive semidefinite matrices

Ando, T.

November 1985

AbstractInformation is obtained about best approximation of a matrix by positive semidefinite ones, ...

On A Problem Of Weighted Low-Rank Approximation Of Matrices

Dutta, Aritra
Li, Xin

January 2017

We study a weighted low-rank approximation that is inspired by a problem of constrained low-rank app...

Determining the inertia of a matrix pencil as a function of the parameter

Väliaho, H.

August 1988

AbstractWe determine the inertia of a linear real symmetric matrix pencil A(t)=A−tB of order n as a ...

Restricted rank modification of the symmetric eigenvalue problem: Theoretical considerations

Arbenz, Peter
Gander, Walter
Golub, Gene H.

June 1988

AbstractThe problem is considered how to obtain the eigenvalues and vectors of a matrix A+VVT where ...

Rank inequalities for positive semidefinite matrices

Lundquist, Michael
Barrett, Wayne

November 1996

AbstractSeveral inequalities relating the rank of a positive semidefinite matrix with the ranks of v...

Low Phase-Rank Approximation

Zhao, Di
Ringh, Axel
Qiu, Li
Khong, Sei Zhen

January 2022

In this paper, we propose and solve low phase-rank approximation problems, which serve as a counterp...

Rank-one approximation of positive matrices based on methods of tropical mathematics

Krivulin, Nikolai K.
Romanova, Elizaveta Yu.

June 2018

Low-rank matrix approximation finds wide application in the analysis of big data, in recommendation ...

Semidefiniteness Without Real Symmetry

Charles R. Johnson
Robert Reams

February 2015

Let A be an n-by-n matrix with real entries. We show that a necessary and sufficient condition for A...

A Decomposition Method for Weighted Least Squares Low-rank Approximation of Symmetric Matrices

de Leeuw, Jan

April 2006

We discuss an alternating least squares algorithm that uses both decomposition and block relaxation ...

An alternating least squares method for the weighted approximation of a symmetric matrix

ten Berge, Jos M.F.
Kiers, Henk A.L.

March 1993

Bailey and Gower examined the least squares approximation C to a symmetric matrix B, when the square...

On maximum volume submatrices and cross approximation for symmetric semidefinite and diagonally dominant matrices

Cortinovis A.
Kressner D.
Massei S.

January 2020

The problem of finding a k×k submatrix of maximum volume of a matrix A is of interest in a variety o...

The inertia of the symmetric approximation for low-rank matrices

Abstract

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The inertia of the symmetric approximation for low-rank matrices

Abstract

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