AbstractAn algorithm proposed recently by Melman reduces the costs of computing the product Ax with a symmetric centrosymmetric matrix A as compared to the case of an arbitrary A. We show that the same result can be achieved by a simpler algorithm, which requires only that A be centrosymmetric. However, if A is hermitian or symmetric, this can be exploited to some extent. Also, we show that similar gains are possible when A is a skew-centrosymmetric or a centrohermitian matrix
AbstractGiven a square matrix A, we discuss the problem of seeking some constrained matrix C which s...
AbstractIn this paper we consider symmetric and skew-antisymmetric solutions to certain matrix equat...
In this paper, we constructively prove that for any matrix A over a _eld of characteristic 0 and its...
AbstractAn algorithm proposed recently by Melman reduces the costs of computing the product Ax with ...
AbstractWe present a method for the multiplication of an arbitrary vector by a symmetric centrosymme...
AbstractEvery n×n generalized K-centrosymmetric matrix A can be reduced into a 2×2 block diagonal ma...
AbstractCentrohermitian and skew-centrohermitian matrices are defined in analogy to centrosymmetric ...
For computing square roots of a nonsingular matrix A, which are functions of A, two well known fast ...
AbstractAn algorithm is given for calculation of eigenvalues and eigenvectors of centrosymmetric and...
In this paper we give conditions on a matrix which guarantee that it is similar to a centrosymmetric...
AbstractA nonsingular n×n-matrix A=(aij) is called centrogonal if A−1=(an+1−i,n+1−j); it is called p...
AbstractA matrix P∈Rn×n is said to be a symmetric orthogonal matrix if P=PT=P−1. A matrix A∈Rn×n is ...
AbstractIt is shown how the property of a Toeplitz matrix to be centro-symmetric or centro-skewsymme...
The algorithm for computing determinant of centrosymmetric matrix has been evaluated before. This al...
AbstractCentrosymmetric Toeplitz-plus-Hankel matrices are investigated on the basis of their “splitt...
AbstractGiven a square matrix A, we discuss the problem of seeking some constrained matrix C which s...
AbstractIn this paper we consider symmetric and skew-antisymmetric solutions to certain matrix equat...
In this paper, we constructively prove that for any matrix A over a _eld of characteristic 0 and its...
AbstractAn algorithm proposed recently by Melman reduces the costs of computing the product Ax with ...
AbstractWe present a method for the multiplication of an arbitrary vector by a symmetric centrosymme...
AbstractEvery n×n generalized K-centrosymmetric matrix A can be reduced into a 2×2 block diagonal ma...
AbstractCentrohermitian and skew-centrohermitian matrices are defined in analogy to centrosymmetric ...
For computing square roots of a nonsingular matrix A, which are functions of A, two well known fast ...
AbstractAn algorithm is given for calculation of eigenvalues and eigenvectors of centrosymmetric and...
In this paper we give conditions on a matrix which guarantee that it is similar to a centrosymmetric...
AbstractA nonsingular n×n-matrix A=(aij) is called centrogonal if A−1=(an+1−i,n+1−j); it is called p...
AbstractA matrix P∈Rn×n is said to be a symmetric orthogonal matrix if P=PT=P−1. A matrix A∈Rn×n is ...
AbstractIt is shown how the property of a Toeplitz matrix to be centro-symmetric or centro-skewsymme...
The algorithm for computing determinant of centrosymmetric matrix has been evaluated before. This al...
AbstractCentrosymmetric Toeplitz-plus-Hankel matrices are investigated on the basis of their “splitt...
AbstractGiven a square matrix A, we discuss the problem of seeking some constrained matrix C which s...
AbstractIn this paper we consider symmetric and skew-antisymmetric solutions to certain matrix equat...
In this paper, we constructively prove that for any matrix A over a _eld of characteristic 0 and its...