AbstractInequalities for norms of different versions of the geometric mean of two positive definite matrices are presented
AbstractWe propose a definition for geometric mean of k positive (semi) definite matrices. We show t...
AbstractA sharper form of the arithmetic-geometric-mean inequality for a pair of positive definite m...
AbstractAn arithmetic-geometric mean inequality for unitarily invariant norms and matrices,2∥A∗XB∥⩽∥...
summary:We study some geometric properties associated with the $t$-geometric means $A\sharp _{t}B :=...
summary:We study some geometric properties associated with the $t$-geometric means $A\sharp _{t}B :=...
AbstractIdeas related to matrix versions of the arithmetic-geometric mean inequality are explained
Ideas related to matrix versions of the arithmetic-geometric mean inequality are explained
AbstractFor positive semi-definite n×n matrices, the inequality 4|||AB|||⩽|||(A+B)2||| isshown to ho...
AbstractWe settle in the affirmative a question of Bhatia and Kittaneh. For P and Q positive semidef...
AbstractWe give a simple proof of the inequality ⦀ AA∗X + XBB∗ ⦀ ⩾ 2 ⦀ A∗AB ⦀, where A, B, and X are...
AbstractInequalities for norms of different versions of the geometric mean of two positive definite ...
Inequalities for norms of different versions of the geometric mean of two positive definite matrices...
AbstractOn basis of the geometric mean proposed recently by T. Ando, Chi-Kwong Li and Roy Mathias, i...
AbstractGiven matrices of the same size, A = [aij] and B = [bij], we define their Hadamard product t...
This survey paper contains recent results for power matrix means and related inequalities for convex...
AbstractWe propose a definition for geometric mean of k positive (semi) definite matrices. We show t...
AbstractA sharper form of the arithmetic-geometric-mean inequality for a pair of positive definite m...
AbstractAn arithmetic-geometric mean inequality for unitarily invariant norms and matrices,2∥A∗XB∥⩽∥...
summary:We study some geometric properties associated with the $t$-geometric means $A\sharp _{t}B :=...
summary:We study some geometric properties associated with the $t$-geometric means $A\sharp _{t}B :=...
AbstractIdeas related to matrix versions of the arithmetic-geometric mean inequality are explained
Ideas related to matrix versions of the arithmetic-geometric mean inequality are explained
AbstractFor positive semi-definite n×n matrices, the inequality 4|||AB|||⩽|||(A+B)2||| isshown to ho...
AbstractWe settle in the affirmative a question of Bhatia and Kittaneh. For P and Q positive semidef...
AbstractWe give a simple proof of the inequality ⦀ AA∗X + XBB∗ ⦀ ⩾ 2 ⦀ A∗AB ⦀, where A, B, and X are...
AbstractInequalities for norms of different versions of the geometric mean of two positive definite ...
Inequalities for norms of different versions of the geometric mean of two positive definite matrices...
AbstractOn basis of the geometric mean proposed recently by T. Ando, Chi-Kwong Li and Roy Mathias, i...
AbstractGiven matrices of the same size, A = [aij] and B = [bij], we define their Hadamard product t...
This survey paper contains recent results for power matrix means and related inequalities for convex...
AbstractWe propose a definition for geometric mean of k positive (semi) definite matrices. We show t...
AbstractA sharper form of the arithmetic-geometric-mean inequality for a pair of positive definite m...
AbstractAn arithmetic-geometric mean inequality for unitarily invariant norms and matrices,2∥A∗XB∥⩽∥...
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