Performance Evaluation.
Elsevier B.V..
Vol. 120.
2018.
P. 1-19
More accurate classes of jensen–type inequalities for convex and operator convex functions
Motivated by a recent refinement of the scalar Jensen inequality obtained via linear interpolation, in this paper we develop a general method for improving two classes of Jensen-type inequalities for bounded self-adjoint operators. The first class refers to a usual convexity, while the second one deals with the operator convexity. The general results are then applied to quasi-arithmetic and power operator means. As a consequence, we obtain strengthened forms of the inequalities between arithmetic, geometric and harmonic operator means. We also obtain more accurate Young-type inequalities for unitarily invariant norms as well as more precise relations for some important jointly concave mappings.
Authors
Choi D.1
,
Krni M.
2,
4
,
Peari J.3
Publisher
Element D.O.O.
Number of issue
2
Language
English
Pages
301-321
Status
Published
Link
Volume
21
Year
2018
Organizations
- 1 Southern Illinois University, Edwardsville Department of Mathematics and Statistics, Box 1653, Edwardsville, IL 62026, United States
- 2 University of Zagreb, Faculty of Electrical Engineering and Computing, Unska 3, Zagreb, 10000, Croatia
- 3 University of Zagreb, Faculty of Textile Technology, Prilaz baruna Filipovi?a 28a, Zagreb, 10000, Croatia
- 4 RUDN University, Miklukho-Maklaya str. 6, Moscow, 117198, Russian Federation
Keywords
Convexity; Jensen inequality; Operator convexity; Operator mean; Refinement; Young inequality
Date of creation
19.10.2018
Date of change
19.10.2018
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Other records
International Journal of Modern Physics D.
Vol. 27.
2018.