Further generalizations of Bebiano-Lemos-Providência inequality
From MaRDI portal
Publication:2143929
DOI10.1007/s43036-022-00197-yzbMath1503.47021OpenAlexW4281253360WikidataQ114216169 ScholiaQ114216169MaRDI QIDQ2143929
Ritsuo Nakamoto, Masatoshi Fujii, Akemi Matsumoto
Publication date: 31 May 2022
Published in: Advances in Operator Theory (Search for Journal in Brave)
Full work available at URL: https://doi.org/10.1007/s43036-022-00197-y
Furuta inequalitygrand Furuta inequalitylog-majorizationoperator geometric meanrelative operator entropyBebiano-Lemos-Providência inequality
Linear operator inequalities (47A63) Operator means involving linear operators, shorted linear operators, etc. (47A64)
Related Items (1)
Cites Work
- Unnamed Item
- Unnamed Item
- Unnamed Item
- Unnamed Item
- Unnamed Item
- Unnamed Item
- Unnamed Item
- Furuta inequality and its related topics
- An elementary proof of an order preserving inequality
- Generalized Bebiano-Lemos-Providência inequalities and their reverses
- Furuta's inequality and its application to Ando's theorem
- Means of positive linear operators
- Log majorization and complementary Golden-Thompson type inequalities
- Matrix trace inequalities on Tsallis relative entropy of negative order
- Inequalities for quantum relative entropy
- Über monotone Matrixfunktionen
- Extension of the Furuta inequality and Ando-Hiai log-majorization
- Reverse inequalities of Araki, Cordes and Löwner--Heinz inequalities
- Ando-Hiai inequality and Furuta inequality
- Beiträge zur Störungstheorie der Spektralzerlegung
- Mean theoretic approach to the grand Furuta inequality
- Best possibility of the Furuta inequality
- Shorter Notes: Some Operator Monotone Functions
- $A \geq B \geq 0$ Assures $(B^r A^p B^r)^{1/q} \geq B^{(p+2r)/q$ for $r \geq 0$, $p \geq 0$, $q \geq 1$ with $(1 + 2r)q \geq p + 2r$
This page was built for publication: Further generalizations of Bebiano-Lemos-Providência inequality
