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The α to 1 Limit of the Sharp Quantum R\'enyi Divergence

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arxiv 2102.06576 v3 pith:TVBOFHIS submitted 2021-02-12 quant-ph math-phmath.MP

The α to 1 Limit of the Sharp Quantum R\'enyi Divergence

classification quant-ph math-phmath.MP
keywords divergencealphaenyiquantumdivergenceslimitsharpfawzi
verification ladder T0 review T1 audit T2 compute T3 formal T4 reserved
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Fawzi and Fawzi recently defined the sharp R\'enyi divergence, $D_\alpha^\#$, for $\alpha \in (1, \infty)$, as an additional quantum R\'enyi divergence with nice mathematical properties and applications in quantum channel discrimination and quantum communication. One of their open questions was the limit ${\alpha} \to 1$ of this divergence. By finding a new expression of the sharp divergence in terms of a minimization of the geometric R\'enyi divergence, we show that this limit is equal to the Belavkin-Staszewski relative entropy. Analogous minimizations of arbitrary generalized divergences lead to a new family of generalized divergences that we call kringel divergences, and for which we prove various properties including the data-processing inequality.

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  1. No off-diagonal quantum focusing for R\'enyi divergences

    hep-th 2026-07 accept novelty 7.0

    No Rényi-type divergence obeying DPI, tensor additivity and matched cq conditioning admits a universal off-diagonal quantum focusing inequality.