Related papers: Operational Interpretation of the Sandwiched Rényi Divergence of Order 1/2 to 1 as Strong Converse Exponents

Operational Interpretation of the Sandwiched Rényi Divergence of Order 1/2 to 1 as Strong Converse Exponents

URL: http://arxiv.org/abs/2209.00554v5
Date: Tue, 28 May 2024 06:57:41 GMT
Title: Operational Interpretation of the Sandwiched Rényi Divergence of Order 1/2 to 1 as Strong Converse Exponents
Authors: Ke Li, Yongsheng Yao,
Abstract summary: We provide the sandwiched R'enyi divergence of order $alphain(frac12,1)$, as well as its induced quantum information quantities. Specifically, we consider (a) smoothing of the max-relative entropy, (b) quantum privacy amplification, and (c) quantum information decoupling. Results are given in terms of the sandwiched R'enyi divergence of order $alphain(frac12,1)$, and its induced quantum R'enyi conditional entropy and quantum R'enyi mutual information
Score: 5.8303977553652
License: http://arxiv.org/licenses/nonexclusive-distrib/1.0/
Abstract: We provide the sandwiched R\'enyi divergence of order $\alpha\in(\frac{1}{2},1)$, as well as its induced quantum information quantities, with an operational interpretation in the characterization of the exact strong converse exponents of quantum tasks. Specifically, we consider (a) smoothing of the max-relative entropy, (b) quantum privacy amplification, and (c) quantum information decoupling. We solve the problem of determining the exact strong converse exponents for these three tasks, with the performance being measured by the fidelity or purified distance. The results are given in terms of the sandwiched R\'enyi divergence of order $\alpha\in(\frac{1}{2},1)$, and its induced quantum R\'enyi conditional entropy and quantum R\'enyi mutual information. This is the first time to find the precise operational meaning for the sandwiched R\'enyi divergence with R\'enyi parameter in the interval $\alpha\in(\frac{1}{2},1)$.

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