\begin{document}$ G_\alpha({\boldsymbol{\rho}})\gg0$\end{document} for experimental entanglement detection of specific state ρ. Moreover, we calculate expressions of the α-logarithmic concurrence for isotropic states, and give a the analytic expressions for isotropic states with \begin{document}$ d = 2$\end{document}. Finally, the monogamy of the α-logarithmic concurrence is also discussed. We set up a mathematical formulation for the monogamous property in terms of α-logarithmic concurrence. Here we set up the functional relation between concurrence and α-logarithmic concurrence in two qubit systems. Then we obtain some useful properties of this function, and by combining the Coffman–Kundu–Wootters (CKW) inequality, we establish the monogamy inequality about α-logarithmic concurrence. We finally prove that the monogamy inequality holds true for α-logarithmic concurrence."> Parameterized entanglement measures based on Rényi-<i>α</i> entropy - 必威体育下载

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Dai Wei-Peng, He Kan, Hou Jin-Chuan
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  • Abstract views:1572
  • PDF Downloads:59
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  • Received Date:15 September 2023
  • Accepted Date:01 November 2023
  • Available Online:16 November 2023
  • Published Online:20 February 2024

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