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R. Horn, Xingzhi Zhan (1999)
Inequalities for C-S seminorms and Lieb functionsLinear Algebra and its Applications, 291
F. Kittaneh, Yousef Manasrah (2010)
Improved Young and Heinz inequalities for matricesJournal of Mathematical Analysis and Applications, 361
R. Horn, R. Mathias (1990)
Cauchy-Schwarz inequalities associated with positive semidefinite matricesLinear Algebra and its Applications, 142
H. Araki (1990)
On an inequality of Lieb and ThirringLetters in Mathematical Physics, 19
Xingzhi Zhan (2002)
Matrix Inequalities
R. Bhatia (1996)
Matrix Analysis
T. Furuta (1989)
NORM INEQUALITIES EQUIVALENT TO LÖWNER-HEINZ THEOREMReviews in Mathematical Physics, 01
J. Goldstein, M. Reed, B. Simon (1973)
Methods of Mathematical Physics, V. I: Functional Analysis.American Mathematical Monthly, 80
T. Andô, F. Hiai (1994)
Log majorization and complementary Golden-Thompson type inequalitiesLinear Algebra and its Applications, 197
T. Furuta, Jôsuke Hakeda (1990)
Applications Of Norm Inequalities Equivalent To Löwner-Heinz TheoremNihonkai mathematical journal, 1
F. Hiai (1997)
Log-majorizations and norm inequalities for exponential operatorsBanach Center Publications, 38
R. Bhatia, F. Kittaneh (1990)
On the singular values of a product of operatorsSIAM Journal on Matrix Analysis and Applications, 11
A. Marshall, I. Olkin (1979)
Inequalities: Theory of Majorization and Its Application
Xingzhi Zhan, F. Hiai (2002)
Inequalities Involving Unitarily Invariant Norms and Operator Monotone Functions (作用素および作用素不等式の最近の話題 研究集会報告集), 1259
H. Kosaki (1998)
Arithmetic–Geometric Mean and Related Inequalities for OperatorsJournal of Functional Analysis, 156
R. Bhatia (1988)
Perturbation inequalities for the absolute value map in norm ideals of operators
R. Bhatia, Chandler Davis (1995)
A CAUCHY-SCHWARZ INEQUALITY FOR OPERATORS WITH APPLICATIONSLinear Algebra and its Applications
R. Horn, R. Mathias (1990)
An analog of the Cauchy-Schwarz inequality for Hadamard products and unitarily invariant normsSIAM Journal on Matrix Analysis and Applications, 11
A. Marshall, I. Olkin (1965)
Norms and inequalities for condition numbersPacific Journal of Mathematics, 15
M. Krein, I. Gohberg (1969)
Introduction to the theory of linear nonselfadjoint operators
Robert Schatten (1970)
Norm Ideals of Completely Continuous Operators
A. Marshall, I. Olkin, B. Arnold (1980)
Inequalities: Theory of Majorization and Its Applications
For any unitarily invariant norm on Hilbert-space operators, we prove Hölder and Cauchy–Schwarz inequalities. As a consequence, several inequalities are lifted to the operator settings. Some more associated, norm inequalities for operators are obtained.
Advances in Operator Theory – Springer Journals
Published: Jul 1, 2020
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