English

Operator Entropy Inequalities

Functional Analysis 2014-11-04 v1 Operator Algebras

Abstract

In this paper we investigate a notion of relative operator entropy, which develops the theory started by J.I. Fujii and E. Kamei [Math. Japonica 34 (1989), 341--348]. For two finite sequences A=(A1,...,An)\mathbf{A}=(A_1,...,A_n) and B=(B1,...,Bn)\mathbf{B}=(B_1,...,B_n) of positive operators acting on a Hilbert space, a real number qq and an operator monotone function ff we extend the concept of entropy by Sqf(AB):=j=1nAj1/2(Aj1/2BjAj1/2)qf(Aj1/2BjAj1/2)Aj1/2, S_q^f(\mathbf{A}|\mathbf{B}):=\sum_{j=1}^nA_j^{1/2}(A_j^{-1/2}B_jA_j^{-1/2})^qf(A_j^{-1/2}B_jA_j^{-1/2})A_j^{1/2}\,, and then give upper and lower bounds for Sqf(AB)S_q^f(\mathbf{A}|\mathbf{B}) as an extension of an inequality due to T. Furuta [Linear Algebra Appl. 381 (2004), 219--235] under certain conditions. Afterwards, some inequalities concerning the classical Shannon entropy are drawn from it.

Keywords

Cite

@article{arxiv.1304.0159,
  title  = {Operator Entropy Inequalities},
  author = {A. Morassaei and F. Mirzapour and M. S. Moslehian},
  journal= {arXiv preprint arXiv:1304.0159},
  year   = {2014}
}

Comments

11 pages; to appear in Colloq. Math

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