AbstractIt is proved that the eigenvectors of a symmetric centrosymmetric matrix of order N are either symmetric or skew symmetric, and that there are ⌈N/2⌉ symmetric and ⌊N/2⌋ skew symmetric eigenvectors. Some previously known but widely scattered facts about symmetric centrosymmetric matrices are presented for completeness. Special cases are considered, in particular tridiagonal matrices of both odd and even order, for which it is shown that the eigenvectors corresponding to the eigenvalues arranged in descending order are alternately symmetric and skew symmetric provided the eigenvalues are distinct
A conference matrix of order $n$ is an $n\times n$ matrix $C$ with diagonal entries $0$ and off-diag...
Abstract. Spectral properties of sign symmetric matrices are studied. A criterion for sign symmetry ...
AbstractIn the paper algebraic properties of centrosymmetric and centro-skewsymmetric Toeplitz-plus-...
AbstractAn algorithm is given for calculation of eigenvalues and eigenvectors of centrosymmetric and...
We show that the only real symmetric matrices whose spectrumis invariant modulo sign changes after e...
AbstractWe derive a readily computable sufficient condition for the existence of a nonnegative symme...
A matrix is called persymmetric (Golub and Van Loan, Matrix Computations, The Johns Hopkins Universi...
AbstractIt is shown how the property of a Toeplitz matrix to be centro-symmetric or centro-skewsymme...
AbstractIn this paper, we consider backward errors in the eigenproblem of symmetric centrosymmetric ...
V. CONCLUSION Because a symmetric Toeplitz matrix is a doubly symmetric matrix, its eigenvectors are...
This project is concerned with the solution of eigenvalues of symmetric Matrices. The basic conce...
AbstractThis paper involves related inverse eigenvalue problems of centro-symmetric matrices and the...
Twelve known symmetry patterns of matrices are combined with three modest patterns to form a steiner...
AbstractTwelve known symmetry patterns of matrices are combined with three modest patterns to form a...
How much can be said about the location of the eigenvalues of a symmetric tridiagonal matrix just by...
A conference matrix of order $n$ is an $n\times n$ matrix $C$ with diagonal entries $0$ and off-diag...
Abstract. Spectral properties of sign symmetric matrices are studied. A criterion for sign symmetry ...
AbstractIn the paper algebraic properties of centrosymmetric and centro-skewsymmetric Toeplitz-plus-...
AbstractAn algorithm is given for calculation of eigenvalues and eigenvectors of centrosymmetric and...
We show that the only real symmetric matrices whose spectrumis invariant modulo sign changes after e...
AbstractWe derive a readily computable sufficient condition for the existence of a nonnegative symme...
A matrix is called persymmetric (Golub and Van Loan, Matrix Computations, The Johns Hopkins Universi...
AbstractIt is shown how the property of a Toeplitz matrix to be centro-symmetric or centro-skewsymme...
AbstractIn this paper, we consider backward errors in the eigenproblem of symmetric centrosymmetric ...
V. CONCLUSION Because a symmetric Toeplitz matrix is a doubly symmetric matrix, its eigenvectors are...
This project is concerned with the solution of eigenvalues of symmetric Matrices. The basic conce...
AbstractThis paper involves related inverse eigenvalue problems of centro-symmetric matrices and the...
Twelve known symmetry patterns of matrices are combined with three modest patterns to form a steiner...
AbstractTwelve known symmetry patterns of matrices are combined with three modest patterns to form a...
How much can be said about the location of the eigenvalues of a symmetric tridiagonal matrix just by...
A conference matrix of order $n$ is an $n\times n$ matrix $C$ with diagonal entries $0$ and off-diag...
Abstract. Spectral properties of sign symmetric matrices are studied. A criterion for sign symmetry ...
AbstractIn the paper algebraic properties of centrosymmetric and centro-skewsymmetric Toeplitz-plus-...