AbstractGiven a matrix M=ABCD, the Schur complements of A in M are the matrices of the form S = D − CaB, where a is a generalized inverse of A. We survey several recent characterizations of Schur complements, and discuss where they arose and how they are related
AbstractAs is known, the Schur complements of diagonally dominant matrices are diagonally dominant; ...
This article presents a matrix identity on the Schur complement along with various applications. In ...
As is known, the Schur complements of diagonally dominant matrices are diagonally dominant; the same...
AbstractGiven a matrix M=ABCD, the Schur complements of A in M are the matrices of the form S = D − ...
AbstractIn this paper we discuss various properties of matrices of the type S=H−GE−1F, which we call...
AbstractWe give a unified treatment of equivalence between some old and new generalizations of the S...
AbstractIn this paper we discuss various properties of matrices of the type S=H−GE−1F, which we call...
AbstractIt is well known that if M is a nonnegative nonsingular inverse M-matrix and if A is a nonsi...
AbstractThis expository paper describes the ways in which a matrix theoretic construct called the Sc...
AbstractThis expository paper describes the ways in which a matrix theoretic construct called the Sc...
AbstractFor square matrices, the relationship is discussed between the notion of Schur complement an...
AbstractLet A be an n×n complex matrix. For a suitable subspace M of Cn the Schur compression A M an...
AbstractIt is well-known that the Schur complements of strictly diagonally dominant matrices are str...
AbstractRelated to a complex partitioned matrix P, having A, B, C, and D as its consecutive m×m, m×n...
Schur complements of generally diagonally dominant matrices and a criterion for irreducibility of ma...
AbstractAs is known, the Schur complements of diagonally dominant matrices are diagonally dominant; ...
This article presents a matrix identity on the Schur complement along with various applications. In ...
As is known, the Schur complements of diagonally dominant matrices are diagonally dominant; the same...
AbstractGiven a matrix M=ABCD, the Schur complements of A in M are the matrices of the form S = D − ...
AbstractIn this paper we discuss various properties of matrices of the type S=H−GE−1F, which we call...
AbstractWe give a unified treatment of equivalence between some old and new generalizations of the S...
AbstractIn this paper we discuss various properties of matrices of the type S=H−GE−1F, which we call...
AbstractIt is well known that if M is a nonnegative nonsingular inverse M-matrix and if A is a nonsi...
AbstractThis expository paper describes the ways in which a matrix theoretic construct called the Sc...
AbstractThis expository paper describes the ways in which a matrix theoretic construct called the Sc...
AbstractFor square matrices, the relationship is discussed between the notion of Schur complement an...
AbstractLet A be an n×n complex matrix. For a suitable subspace M of Cn the Schur compression A M an...
AbstractIt is well-known that the Schur complements of strictly diagonally dominant matrices are str...
AbstractRelated to a complex partitioned matrix P, having A, B, C, and D as its consecutive m×m, m×n...
Schur complements of generally diagonally dominant matrices and a criterion for irreducibility of ma...
AbstractAs is known, the Schur complements of diagonally dominant matrices are diagonally dominant; ...
This article presents a matrix identity on the Schur complement along with various applications. In ...
As is known, the Schur complements of diagonally dominant matrices are diagonally dominant; the same...
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