AbstractA relative of the rearrangement inequality of Hardy, Littlewood, and Polya is presented. From it are derived matrix product bounds
AbstractLet M denote the set of all complex n×n matrices whose columns span certain given linear sub...
AbstractA matrix inequality is obtained, in an elementary way, for the Schur product of two positive...
AbstractLet S be a Hermitian matrix, and S1 a principal submatrix with r less rows and columns. Let ...
AbstractA relative of the rearrangement inequality of Hardy, Littlewood, and Polya is presented. Fro...
AbstractHermitian matrices can be thought of as generalizations of real numbers. Many matrix inequal...
AbstractThis article corrects, clarifies, and extends results in [5] on inequalities for sequence re...
AbstractLet a complex p x n matrix A be partitioned as A′=(A′1,A′2,…,A′k). Denote by ϱ(A), A′, and A...
AbstractThe well-known Cauchy theorem connects the eigenvalues of a Hermitian matrix to the eigenval...
AbstractSome new results on the Löwner partial ordering between certain sums, products, and direct p...
AbstractLet A, B be m × n complex matrices and A ∘ B denote the Hadamard (entrywise) product of A an...
Let Aand Bbe $n \times n$ positive semidefinite Hermitian matrices, let $\alpha $ and $\beta $ be re...
AbstractLet A and B be Hermitian matrices and let C=A+iB. Inequalities and equalities for the eigenv...
Ideas related to matrix versions of the arithmetic-geometric mean inequality are explained
AbstractThe purpose of this paper is to present some inequalities on majorization, unitarily invaria...
AbstractLet A be a rectangular matrix of complex numbers whose rows are partitioned into r arbitrary...
AbstractLet M denote the set of all complex n×n matrices whose columns span certain given linear sub...
AbstractA matrix inequality is obtained, in an elementary way, for the Schur product of two positive...
AbstractLet S be a Hermitian matrix, and S1 a principal submatrix with r less rows and columns. Let ...
AbstractA relative of the rearrangement inequality of Hardy, Littlewood, and Polya is presented. Fro...
AbstractHermitian matrices can be thought of as generalizations of real numbers. Many matrix inequal...
AbstractThis article corrects, clarifies, and extends results in [5] on inequalities for sequence re...
AbstractLet a complex p x n matrix A be partitioned as A′=(A′1,A′2,…,A′k). Denote by ϱ(A), A′, and A...
AbstractThe well-known Cauchy theorem connects the eigenvalues of a Hermitian matrix to the eigenval...
AbstractSome new results on the Löwner partial ordering between certain sums, products, and direct p...
AbstractLet A, B be m × n complex matrices and A ∘ B denote the Hadamard (entrywise) product of A an...
Let Aand Bbe $n \times n$ positive semidefinite Hermitian matrices, let $\alpha $ and $\beta $ be re...
AbstractLet A and B be Hermitian matrices and let C=A+iB. Inequalities and equalities for the eigenv...
Ideas related to matrix versions of the arithmetic-geometric mean inequality are explained
AbstractThe purpose of this paper is to present some inequalities on majorization, unitarily invaria...
AbstractLet A be a rectangular matrix of complex numbers whose rows are partitioned into r arbitrary...
AbstractLet M denote the set of all complex n×n matrices whose columns span certain given linear sub...
AbstractA matrix inequality is obtained, in an elementary way, for the Schur product of two positive...
AbstractLet S be a Hermitian matrix, and S1 a principal submatrix with r less rows and columns. Let ...
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