Reverses of Young and Heinz inequalities for positive linear operators
Abstract Let A, B be invertible positive operators on a Hilbert space H. We present some improved reverses of Young type inequalities, in particular, ( 1 − ν ) 2 ν ( A ∇ B ) + ( 1 − ν ) 2 ( 1 − ν ) H 2 ν ( A , B ) ≥ 2 ( 1 − ν ) ( A ♯ B ) $$ (1-\nu)^{2\nu}(A\nabla B)+(1-\nu)^{2(1-\nu)}H_{2\nu}(A,B) \...
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2016-01-01
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| Series: | Journal of Inequalities and Applications |
| Online Access: | http://link.springer.com/article/10.1186/s13660-016-0967-6 |
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doaj-2b8a849e48db4c12992df1584fccfb1f2020-11-24T21:55:13ZengSpringerOpenJournal of Inequalities and Applications1029-242X2016-01-01201611910.1186/s13660-016-0967-6Reverses of Young and Heinz inequalities for positive linear operatorsS Malekinejad0S Talebi1AG Ghazanfari2Department of Mathematics, Payame Noor UniversityDepartment of Mathematics, Payame Noor UniversityDepartment of Mathematics, Lorestan UniversityAbstract Let A, B be invertible positive operators on a Hilbert space H. We present some improved reverses of Young type inequalities, in particular, ( 1 − ν ) 2 ν ( A ∇ B ) + ( 1 − ν ) 2 ( 1 − ν ) H 2 ν ( A , B ) ≥ 2 ( 1 − ν ) ( A ♯ B ) $$ (1-\nu)^{2\nu}(A\nabla B)+(1-\nu)^{2(1-\nu)}H_{2\nu}(A,B) \geq2(1-\nu ) (A\sharp B) $$ and ( 1 − ν ) 2 ν H 2 ν ( A , B ) + ( 1 − ν ) 2 ( 1 − ν ) ( A ∇ B ) ≥ 2 ( 1 − ν ) ( A ♯ B ) , $$ (1-\nu)^{2\nu}H_{2\nu}(A,B)+(1-\nu)^{2(1-\nu)}(A\nabla B) \geq2(1-\nu ) (A\sharp B), $$ where 0 ≤ υ ≤ 1 2 $0\leq\upsilon\leq\frac{1}{2}$ . We also give some new inequalities involving the Heinz mean for the Hilbert-Schmidt norm.http://link.springer.com/article/10.1186/s13660-016-0967-6 |
| collection |
DOAJ |
| language |
English |
| format |
Article |
| sources |
DOAJ |
| author |
S Malekinejad S Talebi AG Ghazanfari |
| spellingShingle |
S Malekinejad S Talebi AG Ghazanfari Reverses of Young and Heinz inequalities for positive linear operators Journal of Inequalities and Applications |
| author_facet |
S Malekinejad S Talebi AG Ghazanfari |
| author_sort |
S Malekinejad |
| title |
Reverses of Young and Heinz inequalities for positive linear operators |
| title_short |
Reverses of Young and Heinz inequalities for positive linear operators |
| title_full |
Reverses of Young and Heinz inequalities for positive linear operators |
| title_fullStr |
Reverses of Young and Heinz inequalities for positive linear operators |
| title_full_unstemmed |
Reverses of Young and Heinz inequalities for positive linear operators |
| title_sort |
reverses of young and heinz inequalities for positive linear operators |
| publisher |
SpringerOpen |
| series |
Journal of Inequalities and Applications |
| issn |
1029-242X |
| publishDate |
2016-01-01 |
| description |
Abstract Let A, B be invertible positive operators on a Hilbert space H. We present some improved reverses of Young type inequalities, in particular, ( 1 − ν ) 2 ν ( A ∇ B ) + ( 1 − ν ) 2 ( 1 − ν ) H 2 ν ( A , B ) ≥ 2 ( 1 − ν ) ( A ♯ B ) $$ (1-\nu)^{2\nu}(A\nabla B)+(1-\nu)^{2(1-\nu)}H_{2\nu}(A,B) \geq2(1-\nu ) (A\sharp B) $$ and ( 1 − ν ) 2 ν H 2 ν ( A , B ) + ( 1 − ν ) 2 ( 1 − ν ) ( A ∇ B ) ≥ 2 ( 1 − ν ) ( A ♯ B ) , $$ (1-\nu)^{2\nu}H_{2\nu}(A,B)+(1-\nu)^{2(1-\nu)}(A\nabla B) \geq2(1-\nu ) (A\sharp B), $$ where 0 ≤ υ ≤ 1 2 $0\leq\upsilon\leq\frac{1}{2}$ . We also give some new inequalities involving the Heinz mean for the Hilbert-Schmidt norm. |
| url |
http://link.springer.com/article/10.1186/s13660-016-0967-6 |
| work_keys_str_mv |
AT smalekinejad reversesofyoungandheinzinequalitiesforpositivelinearoperators AT stalebi reversesofyoungandheinzinequalitiesforpositivelinearoperators AT agghazanfari reversesofyoungandheinzinequalitiesforpositivelinearoperators |
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