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Quantum Information Processing

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01-02-2020

Optimal uniform continuity bound for conditional entropy of classical–quantum states

Author: Mark M. Wilde

Published in: Quantum Information Processing | Issue 2/2020

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Abstract

In this short note, I show how a recent result of Alhejji and Smith (A tight uniform continuity bound for equivocation, 2019. arXiv:1909.00787v1) regarding an optimal uniform continuity bound for classical conditional entropy leads to an optimal uniform continuity bound for quantum conditional entropy of classical–quantum states. The bound is optimal in the sense that there always exists a pair of classical–quantum states saturating the bound, and so, no further improvements are possible. An immediate application is a uniform continuity bound for the entanglement of formation that improves upon the one previously given by Winter (Commun Math Phys 347(1):291–313, 2016. arXiv:1507.07775). Two intriguing open questions are raised regarding other possible uniform continuity bounds for conditional entropy: one about quantum–classical states and another about fully quantum bipartite states.

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Alhejji M.A., Smith, G.: A tight uniform continuity bound for equivocation (2019). arXiv:1909.00787v1

Zhang, Zhengmin: Estimating mutual information via Kolmogorov distance. IEEE Trans. Inf. Theory 53(9), 3280–3282 (2007)MathSciNetCrossRef

Audenaert, K.M.R.: A sharp continuity estimate for the von Neumann entropy. J. Phys. A Math. Theor. 40(28), 8127 (2007). arXiv:quant-ph/0610146 ADSMathSciNetCrossRef

Leung, Debbie, Smith, Graeme: Continuity of quantum channel capacities. Commun. Math. Phys. 292(1), 201–215 (2009)ADSMathSciNetCrossRef

Sutter, David, Scholz, Volkher B., Winter, Andreas, Renner, Renato: Approximate degradable quantum channels. IEEE Trans. Inf. Theory 63(12), 7832–7844 (2017). arXiv:1412.0980 MathSciNetCrossRef

Leditzky, F., Leung, D., Smith, G.: Quantum and private capacities of low-noise channels. Phys. Rev. Lett. 120(16), 160503 (2018). arXiv:1705.04335 ADSCrossRef

Leditzky, F., Kaur, E., Datta, N., Wilde, M.M.: Approaches for approximate additivity of the Holevo information of quantum channels. Phys. Rev. A 97(1), 012332 (2018). arXiv:1709.01111 ADSCrossRef

Kaur, E., Wilde, M.M.: Amortized entanglement of a quantum channel and approximately teleportation-simulable channels. J. Phys. A Math. Theor. (2017). arXiv:1707.07721

Sharma, K., Wilde, M.M., Adhikari, S., Takeoka, M.: Bounding the energy-constrained quantum and private capacities of bosonic thermal channels. New J. Phys. 20, 063025 (2018). arXiv:1708.07257 ADSCrossRef

10.

Khatri, S., Sharma, K., Wilde, M.M.: Information-theoretic aspects of the generalized amplitude damping channel (2019). arXiv:1903.07747

11.

Kaur, E., Guha, S., Wilde, M.M.: Asymptotic security of discrete-modulation protocols for continuous-variable quantum key distribution (2019). arXiv:1901.10099

12.

Fannes, Mark: A continuity property of the entropy density for spin lattices. Commun. Math. Phys. 31, 291 (1973)ADSMathSciNetCrossRef

13.

Alicki, Robert, Fannes, Mark: Continuity of quantum conditional information. J. Phys. A Math. Gen. 37(5), L55–L57 (2004). arXiv:quant-ph/0312081 ADSMathSciNetCrossRef

14.

Winter, A.: Tight uniform continuity bounds for quantum entropies: conditional entropy, relative entropy distance and energy constraints. Commun. Math. Phys. 347(1), 291–313 (2016). arXiv:1507.07775 ADSMathSciNetCrossRef

15.

Shirokov, Maksim E.: Tight uniform continuity bounds for the quantum conditional mutual information, for the Holevo quantity, and for capacities of quantum channels. J. Math. Phys. 58(10), 102202 (2017)ADSMathSciNetCrossRef

16.

Shirokov, M.E.: Adaptation of the Alicki–Fannes–Winter method for the set of states with bounded energy and its use. Rep. Math. Phys. 81(1), 81–104 (2018). arXiv:1609.07044 MathSciNetCrossRef

17.

Shirokov, M.E.: Uniform continuity bounds for information characteristics of quantum channels depending on input dimension and on input energy. J. Phys. A Math. Theor. 52(1), 014001 (2018). arXiv:1610.08870 ADSMathSciNetCrossRef

18.

Shirokov, M.E.: Advanced Alicki–Fannes–Winter method for energy-constrained quantum systems and its use (2019). arXiv:1907.02458

19.

Petz, Denes: Quantum Information Theory and Quantum Statistics. Springer, Berlin (2008)MATH

20.

Bennett, Charles H., DiVincenzo, David P., Smolin, John A., Wootters, William K.: Mixed-state entanglement and quantum error correction. Phys. Rev. A 54(5), 3824–3851 (1996). arXiv:quant-ph/9604024 ADSMathSciNetCrossRef

21.

Kuznetsova, Anna A.: Quantum conditional entropy for infinite-dimensional systems. Theory Probab. Appl. 55(4), 709–717 (2011). arXiv:1004.4519 MathSciNetCrossRef

22.

Falk, Harold: Inequalities of J. W. Gibbs. Am. J. Phys. 38(7), 858–869 (1970)ADSMathSciNetCrossRef

23.

Lindblad, Göran: Entropy, information and quantum measurements. Commun. Math. Phys. 33(4), 305–322 (1973)ADSMathSciNetCrossRef

Title: Optimal uniform continuity bound for conditional entropy of classical–quantum states
Author: Mark M. Wilde
Publication date: 01-02-2020
Publisher: Springer US
Published in: Quantum Information Processing / Issue 2/2020
Print ISSN: 1570-0755
Electronic ISSN: 1573-1332
DOI: https://doi.org/10.1007/s11128-019-2563-4

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