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Means Of Positive Linear Operators

F. Kubo, T. Andô
Published 1980 · Mathematics

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This paper is referenced by
10.1201/9781420036053.CH10
Pólya-TypeInequalities
C. Pearce (2000)
Metric and Spectral Geometric Means on Symmetric Cones
H. Lee (2007)
LOGARITHMIC FUNCTIONAL MEAN IN CONVEX ANALYSIS
M. Raïssouli (2009)
10.1090/S0002-9939-09-09963-8
Thompson isometries of the space of invertible positive operators
L. Molnár (2009)
10.7153/MIA-13-04
An extension of order preserving operator inequality
Takayuki Furuta (2010)
10.4064/BC112-0-2
Problems and Conjectures in Matrix and Operator Inequalities
Koenraad M. R. Audenaert (2012)
10.1137/140978168
Conic Geometric Optimization on the Manifold of Positive Definite Matrices
S. Sra (2015)
10.1186/S13660-016-1063-7
Certain integral inequalities involving tensor products, positive linear maps, and operator means
Pattrawut Chansangiam (2016)
10.1109/TIT.2016.2598835
Concavity of the Auxiliary Function for Classical-Quantum Channels
Hao-Chung Cheng (2016)
UPPER BOUNDS FOR THE DIFFERENCE BETWEEN SYMMETRIC OPERATOR MEANS
M. Fujii (2006)
REVERSES OF ANDO AND DAVIS–CHOI INEQUALITY
J. (2015)
10.1007/S00209-017-1958-0
Operator means and positivity of block operators
Hamed Najafi (2018)
10.22436/jnsa.010.04.14
An extension of Furuta's log majorization inequality
Yanbo Ren (2017)
10.15352/AFA/1396833504
Non-commutative perspectives
Edward G. Effros (2013)
10.1016/J.INDAG.2015.04.006
Some operator Bellman type inequalities
Mojtaba Bakherad (2015)
10.7153/MIA-14-75
Reverses of Ando's inequality for positive linear maps
Y. Seo (2011)
10.1063/1.532884
Connections and metrics respecting purification of quantum states
J. Dittmann (1999)
An old question asked in a new context presents strange aspects
John Holbrook (2006)
10.1109/TIT.2006.872851
The convex-concave characteristics of Gaussian channel capacity functions
H. Chen (2006)
10.1137/080719613
What Shape Is Your Conjugate? A Survey of Computational Convex Analysis and Its Applications
Y. Lucet (2009)
Matrix means and geometric constructions
Miklós Pálfia (2011)
10.1016/J.LAA.2010.09.011
Path of quasi-means as a geodesic
J. I. Fujii (2011)
10.1016/J.JFA.2011.11.012
Matrix power means and the Karcher mean
Y. Lim (2012)
10.5772/46479
Operator Means and Applications
Pattrawut Chansangiam (2012)
10.1103/PhysRevA.94.062316
Determining the continuous family of quantum Fisher information from linear-response theory
Tomohiro Shitara (2016)
et K-homologie
Michel Hilsum (1999)
10.14288/1.0074402
The resolvent average : an expansive analysis of firmly nonexpansive mappings and maximally monotone operators
Sarah M. Moffat (2014)
Distinguishability and Accessible Information in Quantum Theory
C. Fuchs (1996)
Equivalence relations among some inequalities on operator means
Satoshi Wada (2015)
10.1016/0024-3795(94)90341-7
Majorizations and inequalities in matrix theory
T. Andô (1994)
10.1016/J.LAA.2011.06.036
Weighted matrix means and symmetrization procedures
Miklós Pálfia (2011)
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