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Recoverability for optimized quantum $f$-divergences

Quantum Physics 2021-10-04 v2 Information Theory High Energy Physics - Theory Mathematical Physics math.IT math.MP

Abstract

The optimized quantum ff-divergences form a family of distinguishability measures that includes the quantum relative entropy and the sandwiched R\'enyi relative quasi-entropy as special cases. In this paper, we establish physically meaningful refinements of the data-processing inequality for the optimized ff-divergence. In particular, the refinements state that the absolute difference between the optimized ff-divergence and its channel-processed version is an upper bound on how well one can recover a quantum state acted upon by a quantum channel, whenever the recovery channel is taken to be a rotated Petz recovery channel. Not only do these results lead to physically meaningful refinements of the data-processing inequality for the sandwiched R\'enyi relative entropy, but they also have implications for perfect reversibility (i.e., quantum sufficiency) of the optimized ff-divergences. Along the way, we improve upon previous physically meaningful refinements of the data-processing inequality for the standard ff-divergence, as established in recent work of Carlen and Vershynina [arXiv:1710.02409, arXiv:1710.08080]. Finally, we extend the definition of the optimized ff-divergence, its data-processing inequality, and all of our recoverability results to the general von Neumann algebraic setting, so that all of our results can be employed in physical settings beyond those confined to the most common finite-dimensional setting of interest in quantum information theory.

Keywords

Cite

@article{arxiv.2008.01668,
  title  = {Recoverability for optimized quantum $f$-divergences},
  author = {Li Gao and Mark M. Wilde},
  journal= {arXiv preprint arXiv:2008.01668},
  year   = {2021}
}

Comments

Journal version; Comments are very welcome

R2 v1 2026-06-23T17:38:20.094Z