AbstractRecently, Sagae and Tanabe defined a geometric mean of positive definite matrices and proved the harmonic-geometric-arithmetic-mean inequality. Here, we give a reversal of these results
An attractive candidate for the geometric mean of m positive definite ma-trices A1,..., Am is their ...
This note proves the following inequality: If n = 3k for some positive integer k, then for any n pos...
AbstractThe arithmetic–geometric mean inequality for singular values due to Bhatia and Kittaneh says...
AbstractA sharper form of the arithmetic-geometric-mean inequality for a pair of positive definite m...
AbstractRecently, Sagae and Tanabe defined a geometric mean of positive definite matrices and proved...
Given matrices of the same size, A = [a ij ] and B = [b ij ], we define their Hadamard Product to b...
AbstractGiven matrices of the same size, A = [aij] and B = [bij], we define their Hadamard product t...
Inequalities for norms of different versions of the geometric mean of two positive definite matrices...
AbstractInequalities for norms of different versions of the geometric mean of two positive definite ...
In the note, using Cauchy-Schwartz-Buniakowski's inequality, the authors give a new proof of the ari...
AbstractIdeas related to matrix versions of the arithmetic-geometric mean inequality are explained
For positive semi-definite n×n matrices, the inequality 4|||AB|||≤|||(A+B)<SUP>2</SUP>||| is s...
AbstractWe point out a sharp reverse Cauchy-Schwarz/Hölder matrix inequality. The Cauchy-Schwarz ver...
For , the power mean of order of two positive numbers and is defined by . In this paper, we...
AbstractOn basis of the geometric mean proposed recently by T. Ando, Chi-Kwong Li and Roy Mathias, i...
An attractive candidate for the geometric mean of m positive definite ma-trices A1,..., Am is their ...
This note proves the following inequality: If n = 3k for some positive integer k, then for any n pos...
AbstractThe arithmetic–geometric mean inequality for singular values due to Bhatia and Kittaneh says...
AbstractA sharper form of the arithmetic-geometric-mean inequality for a pair of positive definite m...
AbstractRecently, Sagae and Tanabe defined a geometric mean of positive definite matrices and proved...
Given matrices of the same size, A = [a ij ] and B = [b ij ], we define their Hadamard Product to b...
AbstractGiven matrices of the same size, A = [aij] and B = [bij], we define their Hadamard product t...
Inequalities for norms of different versions of the geometric mean of two positive definite matrices...
AbstractInequalities for norms of different versions of the geometric mean of two positive definite ...
In the note, using Cauchy-Schwartz-Buniakowski's inequality, the authors give a new proof of the ari...
AbstractIdeas related to matrix versions of the arithmetic-geometric mean inequality are explained
For positive semi-definite n×n matrices, the inequality 4|||AB|||≤|||(A+B)<SUP>2</SUP>||| is s...
AbstractWe point out a sharp reverse Cauchy-Schwarz/Hölder matrix inequality. The Cauchy-Schwarz ver...
For , the power mean of order of two positive numbers and is defined by . In this paper, we...
AbstractOn basis of the geometric mean proposed recently by T. Ando, Chi-Kwong Li and Roy Mathias, i...
An attractive candidate for the geometric mean of m positive definite ma-trices A1,..., Am is their ...
This note proves the following inequality: If n = 3k for some positive integer k, then for any n pos...
AbstractThe arithmetic–geometric mean inequality for singular values due to Bhatia and Kittaneh says...
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