AbstractIn this article, we study the concept of Schur complement in the setting of Euclidean Jordan algebras and describe Schur determinantal and Haynsworth inertia formulas
AbstractFor complex square matrices, the Levy–Desplanques theorem asserts that a strictly diagonally...
AbstractIn this paper, we obtain some estimates for the γ-diagonally and product γ-diagonally domina...
Describes the Schur complement as a tool in mathematical research and applications and discusses man...
AbstractIn this article, we study the concept of Schur complement in the setting of Euclidean Jordan...
AbstractIn a recent paper [7], Gowda et al. extended Ostrowski–Schneider type inertia results to cer...
AbstractThis expository paper describes the ways in which a matrix theoretic construct called the Sc...
AbstractThis paper deals with some inertia theorems in Euclidean Jordan algebras. First, based on th...
AbstractIn this paper we discuss various properties of matrices of the type S=H−GE−1F, which we call...
AbstractIn the first part of the paper, we deal with Euclidean Jordan algebraic generalizations of s...
AbstractFor square matrices, the relationship is discussed between the notion of Schur complement an...
Schur complements of generally diagonally dominant matrices and a criterion for irreducibility of ma...
AbstractThe starting point of this investigation is the properties of restricted quadratic forms x⊤A...
AbstractIn this paper, we introduce Jordan quadratic SSM-property and study its relation to copositi...
AbstractGiven a matrix M=ABCD, the Schur complements of A in M are the matrices of the form S = D − ...
Abstract. The purpose of this paper is to revisit Hua’s matrix equality (and inequality) through the...
AbstractFor complex square matrices, the Levy–Desplanques theorem asserts that a strictly diagonally...
AbstractIn this paper, we obtain some estimates for the γ-diagonally and product γ-diagonally domina...
Describes the Schur complement as a tool in mathematical research and applications and discusses man...
AbstractIn this article, we study the concept of Schur complement in the setting of Euclidean Jordan...
AbstractIn a recent paper [7], Gowda et al. extended Ostrowski–Schneider type inertia results to cer...
AbstractThis expository paper describes the ways in which a matrix theoretic construct called the Sc...
AbstractThis paper deals with some inertia theorems in Euclidean Jordan algebras. First, based on th...
AbstractIn this paper we discuss various properties of matrices of the type S=H−GE−1F, which we call...
AbstractIn the first part of the paper, we deal with Euclidean Jordan algebraic generalizations of s...
AbstractFor square matrices, the relationship is discussed between the notion of Schur complement an...
Schur complements of generally diagonally dominant matrices and a criterion for irreducibility of ma...
AbstractThe starting point of this investigation is the properties of restricted quadratic forms x⊤A...
AbstractIn this paper, we introduce Jordan quadratic SSM-property and study its relation to copositi...
AbstractGiven a matrix M=ABCD, the Schur complements of A in M are the matrices of the form S = D − ...
Abstract. The purpose of this paper is to revisit Hua’s matrix equality (and inequality) through the...
AbstractFor complex square matrices, the Levy–Desplanques theorem asserts that a strictly diagonally...
AbstractIn this paper, we obtain some estimates for the γ-diagonally and product γ-diagonally domina...
Describes the Schur complement as a tool in mathematical research and applications and discusses man...