Top

Quantum Information Processing

Published in:

01-04-2021

The verification of a requirement of entanglement measures

Authors: Xianfei Qi, Ting Gao, Fengli Yan

Published in: Quantum Information Processing | Issue 4/2021

Activate our intelligent search to find suitable subject content or patents.

search-config

AI-assisted search

Off

Abstract

The quantification of quantum entanglement is a difficult and fundamental question in quantum information theory. We devote to the refinement of axiomatic approach of quantifying entanglement. Recently, Gao et al. (Phys Rev Lett 112:180501, 2014) pointed out that the maximum of entanglement measure of the permutational invariant part \(\rho ^{\mathrm {PI}}\) of a state \(\rho \) ought to be a lower bound on entanglement measure of the original state \(\rho \). They further argued to add this result as requirement on any (multipartite) entanglement measure. Whether any individual proposed entanglement measure satisfies the new requirement still has to be proved. In this paper, we show that most existing entanglement measures of bipartite quantum systems satisfy the new criterion, including all convex-roof entanglement measures, the relative entropy of entanglement, the negativity, the logarithmic negativity and the logarithmic convex-roof extended negativity. Our approach gives a refinement in quantifying entanglement and provides new insights on better understanding of entanglement properties of composite quantum systems.

previous article Probing Chern number of quasicrystals with disorders in optical lattices

next article An improved hybrid quantum optimization algorithm for solving nonlinear equations

Dont have a licence yet? Then find out more about our products and how to get one now:

Springer Professional "Wirtschaft+Technik"

Online-Abonnement

Mit Springer Professional "Wirtschaft+Technik" erhalten Sie Zugriff auf:

über 102.000 Bücher
über 537 Zeitschriften

aus folgenden Fachgebieten:

Automobil + Motoren
Bauwesen + Immobilien
Business IT + Informatik
Elektrotechnik + Elektronik
Energie + Nachhaltigkeit
Finance + Banking
Management + Führung
Marketing + Vertrieb
Maschinenbau + Werkstoffe
Versicherung + Risiko

Jetzt Wissensvorsprung sichern!

inform now

Springer Professional "Technik"

Online-Abonnement

Mit Springer Professional "Technik" erhalten Sie Zugriff auf:

über 67.000 Bücher
über 390 Zeitschriften

aus folgenden Fachgebieten:

Automobil + Motoren
Bauwesen + Immobilien
Business IT + Informatik
Elektrotechnik + Elektronik
Energie + Nachhaltigkeit
Maschinenbau + Werkstoffe

Jetzt Wissensvorsprung sichern!

inform now

Springer Professional "Wirtschaft"

Online-Abonnement

Mit Springer Professional "Wirtschaft" erhalten Sie Zugriff auf:

über 67.000 Bücher
über 340 Zeitschriften

aus folgenden Fachgebieten:

Bauwesen + Immobilien
Business IT + Informatik
Finance + Banking
Management + Führung
Marketing + Vertrieb
Versicherung + Risiko

Jetzt Wissensvorsprung sichern!

inform now

Horodecki, R., Horodecki, P., Horodecki, M., Horodecki, K.: Quantum entanglement. Rev. Mod. Phys. 81, 865 (2009)ADSMathSciNetMATHCrossRef

Bennett, C.H., DiVincenzo, D.P.: Quantum information and computation. Nature 404, 247 (2000)ADSMATHCrossRef

Ekert, A.K.: Quantum cryptography based on Bell’s theorem. Phys. Rev. Lett. 67, 661 (1991)ADSMathSciNetMATHCrossRef

Bennett, C.H., Brassard, G., Crépeau, C., Jozsa, R., Peres, A., Wootters, W.K.: Teleporting an unknown quantum state via dual classical and Einstein–Podolsky–Rosen channels. Phys. Rev. Lett. 70, 1895 (1993)ADSMathSciNetMATHCrossRef

Gao, T., Yan, F.L., Li, Y.C.: Optimal controlled teleportation. Europhys. Lett. 84, 50001 (2008)ADSCrossRef

Bennett, C.H., Wiesner, S.J.: Communication via one- and two-particle operators on Einstein–Podolsky–Rosen states. Phys. Rev. Lett. 69, 2881 (1992)ADSMathSciNetMATHCrossRef

Gross, C., Zibold, T., Nicklas, E., Estève, J., Oberthaler, M.K.: Nonlinear atom interferometer surpasses classical precision limit. Nature 454, 1165 (2010)ADSCrossRef

Gühne, O., Tóth, G.: Entanglement detection. Phys. Rep. 474, 1 (2009)ADSMathSciNetCrossRef

Hassan, A.S.M., Joag, P.S.: Separability criterion for multipartite quantum states based on the Bloch representation of density matrices. Quantum Inf. Comput. 8, 773 (2008)MathSciNetMATH

10.

Gabriel, A., Hiesmayr, B.C., Huber, M.: Criterion for \(k\)-separability in mixed multipartite systems. Quantum Inf. Comput. 10, 829 (2010)MathSciNet

11.

Gao, T., Hong, Y.: Detection of genuinely entangled and nonseparable \(n\)-partite quantum states. Phys. Rev. A 82, 062113 (2010)ADSCrossRef

12.

Gao, T., Hong, Y., Lu, Y., Yan, F.L.: Efficient \(k\)-separability criteria for mixed multipartite quantum states. Europhys. Lett. 104, 20007 (2013)ADSCrossRef

13.

Hong, Y., Luo, S., Song, H.: Detecting \(k\)-nonseparability via quantum Fisher information. Phys. Rev. A 91, 042313 (2015)ADSCrossRef

14.

Liu, L., Gao, T., Yan, F.L.: Separability criteria via sets of mutually unbiased measurements. Sci. Rep. 5, 13138 (2015)ADSCrossRef

15.

Hong, Y., Luo, S.: Detecting \(k\)-nonseparability via local uncertainty relations. Phys. Rev. A 93, 042310 (2016)ADSCrossRef

16.

Liu, L., Gao, T., Yan, F.L.: Separability criteria via some classes of measurements. Sci. China Phys. Mech. Astron. 60, 100311 (2017)ADSCrossRef

17.

Vedral, V., Plenio, M.B., Rippin, M.A., Knight, P.L.: Quantifying entanglement. Phys. Rev. Lett. 78, 2275 (1997)ADSMathSciNetMATHCrossRef

18.

Horodecki, M.: Entanglement measures. Quantum Inf. Comput. 1, 3 (2001)MathSciNetMATH

19.

Plenio, M.B., Virmani, S.: An introduction to entanglement measures. Quantum Inf. Comput. 7, 1 (2007)MathSciNetMATH

20.

Vidal, G.: Entanglement monotones. J. Mod. Opt. 47, 355 (2000)ADSMathSciNetCrossRef

21.

Eltschka, C., Siewert, J.: Quantifying entanglement resources. J. Phys. A Math. Theor. 47, 424005 (2014)ADSMathSciNetMATHCrossRef

22.

Wei, T.C., Goldbart, P.M.: Geometric measure of entanglement and applications to bipartite and multipartite quantum states. Phys. Rev. A 68, 042307 (2003)ADSCrossRef

23.

Carvalho, A.R.R., Mintert, F., Buchleitner, A.: Decoherence and multipartite entanglement. Phys. Rev. Lett. 93, 230501 (2004)ADSCrossRef

24.

Ma, Z.H., Chen, Z.H., Chen, J.L., Spengler, C., Gabriel, A., Huber, M.: Measure of genuine multipartite entanglement with computable lower bounds. Phys. Rev. A 83, 062325 (2011)ADSCrossRef

25.

Hong, Y., Gao, T., Yan, F.L.: Measure of multipartite entanglement with computable lower bounds. Phys. Rev. A 86, 062323 (2012)ADSCrossRef

26.

Gao, T., Yan, F.L., van Enk, S.J.: Permutationally invariant part of a density matrix and nonseparability of \(N\)-qubit states. Phys. Rev. Lett. 112, 180501 (2014)ADSCrossRef

27.

Bennett, C.H., DiVincenzo, D.P., Smolin, J.A., Wootters, W.K.: Mixed-state entanglement and quantum error correction. Phys. Rev. A 54, 3824 (1996)ADSMathSciNetMATHCrossRef

28.

Barnum, H., Linden, N.: Monotones and invariants for multi-particle quantum states. J. Phys. A Math. Gen. 34, 6787 (2001)ADSMathSciNetMATHCrossRef

29.

Lee, S., Chi, D.P., Oh, S.D., Kim, J.: Convex-roof extended negativity as an entanglement measure for bipartite quantum systems. Phys. Rev. A 68, 062304 (2003)ADSCrossRef

30.

Gour, G.: Family of concurrence monotones and its applications. Phys. Rev. A 71, 012318 (2005)ADSCrossRef

31.

Życzkowski, K., Horodecki, P., Sanpera, A., Lewenstein, M.: Volume of the set of separable states. Phys. Rev. A 58, 883 (1998)ADSMathSciNetCrossRef

32.

Vidal, G., Werner, R.F.: Computable measure of entanglement. Phys. Rev. A 65, 032314 (2002)ADSCrossRef

33.

Audenaert, K., Plenio, M.B., Eisert, J.: Entanglement cost under positive-partial-transpose-preserving operations. Phys. Rev. Lett. 90, 027901 (2003)ADSCrossRef

34.

Gao, L.M., Yan, F.L., Gao, T.: Monogamy of logarithmic negativity and logarithmic convex-roof extended negativity. arXiv preprint arXiv:2007.09573 (2020)

35.

Zhu, H., Ma, Z., Cao, Z., Fei, S.M., Vedral, V.: Operational one-to-one mapping between coherence and entanglement measures. Phys. Rev. A 96, 032316 (2017)ADSCrossRef

36.

Du, S., Bai, Z., Qi, X.: Coherence measures and optimal conversion for coherent states. Quantum Inf. Comput. 15 & 16, 1307 (2015)

37.

Yuan, X., Zhou, H., Cao, Z., Ma, X.: Intrinsic randomness as a measure of quantum coherence. Phys. Rev. A 92, 022124 (2015)ADSCrossRef

38.

Winter, A., Yang, D.: Operational resource theory of coherence. Phys. Rev. Lett. 116, 120404 (2016)ADSCrossRef

39.

Liu, C.L., Zhang, D.J., Yu, X.D., Ding, Q.M., Liu, L.J.: A new coherence measure based on fidelity. Quantum Inf. Process. 16, 198 (2017)ADSMathSciNetMATHCrossRef

40.

Qi, X.F., Gao, T., Yan, F.L.: Measuring coherence with entanglement concurrence. J. Phys. A Math. Theor. 50, 285301 (2017)MathSciNetMATHCrossRef

41.

Streltsov, A., Adesso, G., Plenio, M.B.: Quantum coherence as a resource. Rev. Mod. Phys. 89, 041003 (2017)ADSMathSciNetCrossRef

42.

Hu, M.L., Hu, X.Y., Wang, J.C., Peng, Y., Zhang, Y.R., Fan, H.: Quantum coherence and geometric quantum discord. Phys. Rep. 762–764, 1 (2018)ADSMathSciNetMATH

43.

Schumacher, B., Westmoreland, M.D.: Relative entropy in quantum information theory. arXiv preprint arXiv:quant-ph/0004045 (2000)

44.

Vedral, V.: The role of relative entropy in quantum information theory. Rev. Mod. Phys. 74, 197 (2002)ADSMathSciNetMATHCrossRef

45.

Lieb, E.H., Ruskai, M.B.: A fundamental property of quantum-mechanical entropy. Phys. Rev. Lett. 30, 434 (1973)ADSMathSciNetCrossRef

46.

Lieb, E.H., Ruskai, M.B.: Proof of the strong subadditivity of quantum-mechanical entropy. J. Math. Phys. 14, 1938 (1973)ADSMathSciNetCrossRef

Title: The verification of a requirement of entanglement measures
Authors: Xianfei Qi
Ting Gao
Fengli Yan
Publication date: 01-04-2021
Publisher: Springer US
Published in: Quantum Information Processing / Issue 4/2021
Print ISSN: 1570-0755
Electronic ISSN: 1573-1332
DOI: https://doi.org/10.1007/s11128-021-03068-2

Springer Professional

Abstract

Please log in to get access to your license.

Dont have a licence yet? Then find out more about our products and how to get one now:

Springer Professional "Wirtschaft+Technik"

Springer Professional "Technik"

Springer Professional "Wirtschaft"

Other articles of this Issue 4/2021

Characterizing Bell state analyzer using weak coherent pulses

Quantum Bell states-based anonymous voting with anonymity trace

Quantum three-box paradox: a proposal for atom optics implementation

Quantum private comparison of size using d-level Bell states with a semi-honest third party

Quantum k-means algorithm based on trusted server in quantum cloud computing

Three-party semi-quantum protocol for deterministic secure quantum dialogue based on GHZ states