Related papers: Convergence conditions for the quantum relative entropy and other applications of the deneralized quantum Dini lemma

Convergence conditions for the quantum relative entropy and other applications of the deneralized quantum Dini lemma

URL: http://arxiv.org/abs/2205.09108v2
Date: Sun, 11 Dec 2022 12:30:37 GMT
Title: Convergence conditions for the quantum relative entropy and other applications of the deneralized quantum Dini lemma
Authors: M.E.Shirokov
Abstract summary: We prove two general dominated convergence theorems and the theorem about preserving local continuity under convex mixtures. A simple convergence criterion for the von Neumann entropy is also obtained.
Score: 0.0
License: http://arxiv.org/licenses/nonexclusive-distrib/1.0/
Abstract: We describe a generalized version of the result called quantum Dini lemma that was used previously for analysis of local continuity of basic correlation and entanglement measures. The generalization consists in considering sequences of functions instead of a single function. It allows us to expand the scope of possible applications of the method. We prove two general dominated convergence theorems and the theorem about preserving local continuity under convex mixtures. By using these theorems we obtain several convergence conditions for the quantum relative entropy and for the mutual information of a quantum channel considered as a function of a pair (channel, input state). A simple convergence criterion for the von Neumann entropy is also obtained.

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