AbstractIn this paper, we prove that the diagonal-Schur complement of a strictly doubly diagonally dominant matrix is strictly doubly diagonally dominant matrix. The same holds for the diagonal-Schur complement of a strictly generalized doubly diagonally dominant matrix and a nonsingular H-matrix. We point out that under certain assumptions, the diagonal-Schur complement of a strictly doubly (doubly product) γ-diagonally dominant matrix is also strictly doubly (doubly product) γ-diagonally dominant. Further, we provide the distribution of the real parts of eigenvalues of a diagonal-Schur complement of H-matrix. We also show that the Schur complement of a γ-diagonally dominant matrix is not always γ-diagonally dominant by a numerical example...
AbstractIn the first part of the paper, we deal with Euclidean Jordan algebraic generalizations of s...
AbstractIn this paper we discuss various properties of matrices of the type S=H−GE−1F, which we call...
AbstractGiven a matrix M=ABCD, the Schur complements of A in M are the matrices of the form S = D − ...
AbstractAs is known, the Schur complements of diagonally dominant matrices are diagonally dominant; ...
AbstractIt is well-known that the Schur complements of strictly diagonally dominant matrices are str...
AbstractIt is known that the Schur complements of doubly diagonally dominant matrices are doubly dia...
As is known, the Schur complements of diagonally dominant matrices are diagonally dominant; the same...
It is known that the Schur complements of H-matrices and doubly diagonally dominant matrices are clo...
AbstractWe consider the class of doubly diagonally dominant matrices (A = [aij] ϵ Cn, n, ∥aii||ajj∥ ...
AbstractIn this paper, we obtain some estimates for the γ-diagonally and product γ-diagonally domina...
AbstractIn this paper, we obtain a theorem on the distribution of eigenvalues for Schur complements ...
We consider the Gersgorin disc separation from the origin for (doubly) diagonally dominant matrices ...
[EN] It is well known that the Schur complement of some H-matrices is an H-matrix. In this paper, th...
Abstract The result on the Geršgorin disc separation from the origin for strictly diagonally dominan...
The purpose of this paper is twofold: We first present a sufficient condition for testing strictly g...
AbstractIn the first part of the paper, we deal with Euclidean Jordan algebraic generalizations of s...
AbstractIn this paper we discuss various properties of matrices of the type S=H−GE−1F, which we call...
AbstractGiven a matrix M=ABCD, the Schur complements of A in M are the matrices of the form S = D − ...
AbstractAs is known, the Schur complements of diagonally dominant matrices are diagonally dominant; ...
AbstractIt is well-known that the Schur complements of strictly diagonally dominant matrices are str...
AbstractIt is known that the Schur complements of doubly diagonally dominant matrices are doubly dia...
As is known, the Schur complements of diagonally dominant matrices are diagonally dominant; the same...
It is known that the Schur complements of H-matrices and doubly diagonally dominant matrices are clo...
AbstractWe consider the class of doubly diagonally dominant matrices (A = [aij] ϵ Cn, n, ∥aii||ajj∥ ...
AbstractIn this paper, we obtain some estimates for the γ-diagonally and product γ-diagonally domina...
AbstractIn this paper, we obtain a theorem on the distribution of eigenvalues for Schur complements ...
We consider the Gersgorin disc separation from the origin for (doubly) diagonally dominant matrices ...
[EN] It is well known that the Schur complement of some H-matrices is an H-matrix. In this paper, th...
Abstract The result on the Geršgorin disc separation from the origin for strictly diagonally dominan...
The purpose of this paper is twofold: We first present a sufficient condition for testing strictly g...
AbstractIn the first part of the paper, we deal with Euclidean Jordan algebraic generalizations of s...
AbstractIn this paper we discuss various properties of matrices of the type S=H−GE−1F, which we call...
AbstractGiven a matrix M=ABCD, the Schur complements of A in M are the matrices of the form S = D − ...