AbstractFor positive semi-definite n×n matrices, the inequality 4|||AB|||⩽|||(A+B)2||| isshown to hold for every unitarily invariant norm. The connection of this with some other matrix arithmetic–geometric mean inequalities and trace inequalities is discussed
AbstractGiven matrices of the same size, A = [aij] and B = [bij], we define their Hadamard product t...
AbstractWe give a simple proof of the inequality ⦀ AA∗X + XBB∗ ⦀ ⩾ 2 ⦀ A∗AB ⦀, where A, B, and X are...
AbstractSome inequalities for positive linear maps on matrix algebras are given, especially asymmetr...
AbstractIdeas 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...
AbstractThe arithmetic–geometric mean inequality for singular values due to Bhatia and Kittaneh says...
Ideas 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 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 ...
AbstractWe integrate ten unitarily invariant matrix norm inequalities equivalent to the Heinz inequa...
AbstractWe settle in the affirmative a question of Bhatia and Kittaneh. For P and Q positive semidef...
AbstractThe arithmetic–geometric mean inequality for singular values due to Bhatia and Kittaneh says...
AbstractThe main results provide comparisons between condition numbers (based on unitarily invariant...
AbstractAn arithmetic-geometric mean inequality for unitarily invariant norms and matrices,2∥A∗XB∥⩽∥...
AbstractGiven matrices of the same size, A = [aij] and B = [bij], we define their Hadamard product t...
AbstractWe give a simple proof of the inequality ⦀ AA∗X + XBB∗ ⦀ ⩾ 2 ⦀ A∗AB ⦀, where A, B, and X are...
AbstractSome inequalities for positive linear maps on matrix algebras are given, especially asymmetr...
AbstractIdeas 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...
AbstractThe arithmetic–geometric mean inequality for singular values due to Bhatia and Kittaneh says...
Ideas 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 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 ...
AbstractWe integrate ten unitarily invariant matrix norm inequalities equivalent to the Heinz inequa...
AbstractWe settle in the affirmative a question of Bhatia and Kittaneh. For P and Q positive semidef...
AbstractThe arithmetic–geometric mean inequality for singular values due to Bhatia and Kittaneh says...
AbstractThe main results provide comparisons between condition numbers (based on unitarily invariant...
AbstractAn arithmetic-geometric mean inequality for unitarily invariant norms and matrices,2∥A∗XB∥⩽∥...
AbstractGiven matrices of the same size, A = [aij] and B = [bij], we define their Hadamard product t...
AbstractWe give a simple proof of the inequality ⦀ AA∗X + XBB∗ ⦀ ⩾ 2 ⦀ A∗AB ⦀, where A, B, and X are...
AbstractSome inequalities for positive linear maps on matrix algebras are given, especially asymmetr...
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