# Maps on positive operators preserving R\'enyi type relative entropies   and maximal $f$-divergences

**Authors:** Marcell Ga\'al, Gerg\H{o} Nagy

arXiv: 1703.05244 · 2017-11-22

## TL;DR

This paper characterizes maps on positive operators that preserve certain quantum relative entropies, specifically Re9nyi type and maximal f-divergences, with implications for quantum information theory.

## Contribution

It provides a complete description of structure-preserving maps for these quantum divergences in finite-dimensional settings.

## Key findings

- Characterization of maps preserving Re9nyi relative entropy-like quantities.
- Characterization of maps preserving maximal f-divergences.
- Results applicable to finite-dimensional quantum systems.

## Abstract

In this paper we deal with two quantum relative entropy preserver problems on the cones of positive (either positive definite or positive semidefinite) operators. The first one is related to a quantum R\'enyi relative entropy like quantity which plays an important role in classical-quantum channel decoding. The second one is connected to the so-called maximal $f$-divergences introduced by D. Petz and M. B. Ruskai who considered this quantity as a generalization of the usual Belavkin-Staszewski relative entropy. We emphasize in advance that all the results are obtained for finite dimensional Hilbert spaces.

## Full text

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## References

25 references — full list in the complete paper: https://tomesphere.com/paper/1703.05244/full.md

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Source: https://tomesphere.com/paper/1703.05244