AbstractIn a recent paper by Engel and Schneider, it was asked if, for every n ⩾ 1, A ∈ τ<n> implies (A+D) ∈ τ<n> for every D = diag[d1, d2,… dn] with di ⩾ 0, 1 ⩽ i ⩽ n. We answer this question in the negative. More precisely, we show that for, any n ⩾ 3, the set (τ < n>): = {D ∈Cn,n:(A+D)∈τ < n> for all A∈τ<n>} is exactly given by(Gt<n>) = {γIn:γ ⩾ 0}
AbstractWe give a short and elementary proof of the theorem which asserts that two real symmetric ma...
AbstractA new nonsingularity criterion for matrices is derived. It improves the Levy-Desplanques the...
AbstractSome new sufficient conditions are found for n real numbers to be the spectrum of some n × n...
AbstractIn a recent paper by Engel and Schneider, it was asked if, for every n ⩾ 1, A ∈ τ<n> implies...
AbstractIf A is an n × n matrix and if S ⊂{1,…,n}, then let A(S) denote the principal submatrix of A...
AbstractLet Kn denote the set of all n X n nonnegative matrices whose entries have sum n, and let φ ...
AbstractLet ρ⊂Rn be a proper cone. From the theory of M-matrices (see e.g. [1]) it is known that if ...
AbstractSuppose λ1⩾⋯⩾λn⩾0 are the eigenvalues of an n×n totally nonnegative matrix, and λ̃1⩾⋯⩾λ̃k ar...
AbstractLet A be an n × n matrix with non-negative entries and no entry in (0, 1). We prove that the...
AbstractLet A be an n × n normal matrix over C, and Qm, n be the set of strictly increasing integer ...
AbstractIt is easy to prove that if A is a real irreducible square matrix and if a real nonsingular ...
summary:Suppose that $A$ is an $n\times n$ nonnegative matrix whose eigenvalues are $\lambda = \rho ...
summary:Suppose that $A$ is an $n\times n$ nonnegative matrix whose eigenvalues are $\lambda = \rho ...
AbstractResults on ω- and τ-matrices are surveyed. The question whether an ω-matrix with positive le...
Abstract In this paper we present two theorems for computing of inertia of Diagonally Dominant Matri...
AbstractWe give a short and elementary proof of the theorem which asserts that two real symmetric ma...
AbstractA new nonsingularity criterion for matrices is derived. It improves the Levy-Desplanques the...
AbstractSome new sufficient conditions are found for n real numbers to be the spectrum of some n × n...
AbstractIn a recent paper by Engel and Schneider, it was asked if, for every n ⩾ 1, A ∈ τ<n> implies...
AbstractIf A is an n × n matrix and if S ⊂{1,…,n}, then let A(S) denote the principal submatrix of A...
AbstractLet Kn denote the set of all n X n nonnegative matrices whose entries have sum n, and let φ ...
AbstractLet ρ⊂Rn be a proper cone. From the theory of M-matrices (see e.g. [1]) it is known that if ...
AbstractSuppose λ1⩾⋯⩾λn⩾0 are the eigenvalues of an n×n totally nonnegative matrix, and λ̃1⩾⋯⩾λ̃k ar...
AbstractLet A be an n × n matrix with non-negative entries and no entry in (0, 1). We prove that the...
AbstractLet A be an n × n normal matrix over C, and Qm, n be the set of strictly increasing integer ...
AbstractIt is easy to prove that if A is a real irreducible square matrix and if a real nonsingular ...
summary:Suppose that $A$ is an $n\times n$ nonnegative matrix whose eigenvalues are $\lambda = \rho ...
summary:Suppose that $A$ is an $n\times n$ nonnegative matrix whose eigenvalues are $\lambda = \rho ...
AbstractResults on ω- and τ-matrices are surveyed. The question whether an ω-matrix with positive le...
Abstract In this paper we present two theorems for computing of inertia of Diagonally Dominant Matri...
AbstractWe give a short and elementary proof of the theorem which asserts that two real symmetric ma...
AbstractA new nonsingularity criterion for matrices is derived. It improves the Levy-Desplanques the...
AbstractSome new sufficient conditions are found for n real numbers to be the spectrum of some n × n...
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