Strengthened Monotonicity of Relative Entropy via Pinched Petz Recovery Map
Abstract
The quantum relative entropy between two states satisfies a monotonicity property meaning that applying the same quantum channel to both states can never increase their relative entropy. It is known that this inequality is only tight when there is a "recovery map" that exactly reverses the effects of the quantum channel on both states. In this paper we strengthen this inequality by showing that the difference of relative entropies is bounded below by the measured relative entropy between the first state and a recovered state from its processed version. The recovery map is a convex combination of rotated Petz recovery maps and perfectly reverses the quantum channel on the second state. As a special case we reproduce recent lower bounds on the conditional mutual information such as the one proved in [Fawzi and Renner, Commun. Math. Phys., 2015]. Our proof only relies on elementary properties of pinching maps and the operator logarithm.
 Publication:

arXiv eprints
 Pub Date:
 July 2015
 arXiv:
 arXiv:1507.00303
 Bibcode:
 2015arXiv150700303S
 Keywords:

 Quantum Physics;
 Mathematical Physics
 EPrint:
 v3: minor changes, published version. v2: 11 pages, proof of the main result simplified (see Lemma 3.12), setting generalized, new upper bound added (see Proposition 3.8)