AbstractDenote by Hn the convex cone of n-by-n positive semi-definite hermitian matrices. Let d2 be the normalized immanant afforded by Sn and the partition (2, 1n−2). Then h(A) + (Δ − 1) det(A) ⩾ Δd2(A), AϵHn, where h(A) is the main diagonal product of A and Δ is approximately (n − 1)e
AbstractA matrix inequality is obtained, in an elementary way, for the Schur product of two positive...
AbstractIt is known that if A is positive definite Hermitian, then A·A-1⩾I in the positive semidefin...
AbstractIf A and C are n x n Hermitian matrices and if B is an n x n symmetric matrix, we consider i...
AbstractDenote by Hn the convex cone of n-by-n positive semi-definite hermitian matrices. Let d2 be ...
AbstractDenote by Hn the cone of n-by-n positive semidefinite Hermitian matrices. Let d2 be the gene...
AbstractLet d̄k denote the normalized generalized matrix function based upon the irreducible charact...
AbstractDenote by Hn the cone of n-by-n positive semidefinite Hermitian matrices. Let d2 be the gene...
AbstractThe authors find the best possible bounds for some functions of the eigenvalues of (A ∘ C)C−...
AbstractLet A = (aij) be a positive semidefinite matrix with a11 = a22⋯ =ann = 1, and let B = (|aij|...
AbstractThere are many known inequalities involving the restriction of immanants and other generaliz...
AbstractFor an n×n positive semi-definite (psd) matrix A, Peter Heyfron showed in [9] that the norma...
AbstractIt is known that if A is positive definite Hermitian, then A·A-1⩾I in the positive semidefin...
We are concerned with the class ∏n of nxn complex matrices A for which the Hermitian part H(A) = A+A...
Let Aand Bbe $n \times n$ positive semidefinite Hermitian matrices, let $\alpha $ and $\beta $ be re...
Let Aand Bbe $n \times n$ positive semidefinite Hermitian matrices, let $\alpha $ and $\beta $ be re...
AbstractA matrix inequality is obtained, in an elementary way, for the Schur product of two positive...
AbstractIt is known that if A is positive definite Hermitian, then A·A-1⩾I in the positive semidefin...
AbstractIf A and C are n x n Hermitian matrices and if B is an n x n symmetric matrix, we consider i...
AbstractDenote by Hn the convex cone of n-by-n positive semi-definite hermitian matrices. Let d2 be ...
AbstractDenote by Hn the cone of n-by-n positive semidefinite Hermitian matrices. Let d2 be the gene...
AbstractLet d̄k denote the normalized generalized matrix function based upon the irreducible charact...
AbstractDenote by Hn the cone of n-by-n positive semidefinite Hermitian matrices. Let d2 be the gene...
AbstractThe authors find the best possible bounds for some functions of the eigenvalues of (A ∘ C)C−...
AbstractLet A = (aij) be a positive semidefinite matrix with a11 = a22⋯ =ann = 1, and let B = (|aij|...
AbstractThere are many known inequalities involving the restriction of immanants and other generaliz...
AbstractFor an n×n positive semi-definite (psd) matrix A, Peter Heyfron showed in [9] that the norma...
AbstractIt is known that if A is positive definite Hermitian, then A·A-1⩾I in the positive semidefin...
We are concerned with the class ∏n of nxn complex matrices A for which the Hermitian part H(A) = A+A...
Let Aand Bbe $n \times n$ positive semidefinite Hermitian matrices, let $\alpha $ and $\beta $ be re...
Let Aand Bbe $n \times n$ positive semidefinite Hermitian matrices, let $\alpha $ and $\beta $ be re...
AbstractA matrix inequality is obtained, in an elementary way, for the Schur product of two positive...
AbstractIt is known that if A is positive definite Hermitian, then A·A-1⩾I in the positive semidefin...
AbstractIf A and C are n x n Hermitian matrices and if B is an n x n symmetric matrix, we consider i...
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