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基于非广延熵纠缠平方的严格单配性不等式
引用本文:苑光明,王学文,董明慧,白志明,刘恩超. 基于非广延熵纠缠平方的严格单配性不等式[J]. 计算物理, 2020, 37(6): 745-749. DOI: 10.19596/j.cnki.1001-246x.8150
作者姓名:苑光明  王学文  董明慧  白志明  刘恩超
作者单位:1. 齐鲁理工学院基础部, 山东 济南 250200;2. 河北科技大学理学院, 河北 石家庄 050018
基金项目:Foundation of Qilu Institute of Technology(JG201858)
摘    要:非广延熵纠缠是一种很好的纠缠度量方式,其本身在参数q∈[2,3]范围服从严格单配性关系.我们提出基于非广延熵纠缠平方服从的严格单配性关系,将参数范围扩展至q∈[(5-√13])/2,(5+√13)/2].该单配性关系更加严格,比非广延熵纠缠的严格单配性不等式成立范围更广.

关 键 词:量子光学  纠缠  单配性  非广延熵纠缠  
收稿时间:2019-09-20
修稿时间:2019-11-12

Tighter Monogamy Inequality for Squared Tsallis-q Entanglement
YUAN Guangming,WANG Xuewen,DONG Minghui,BAI Zhiming,LIU Enchao. Tighter Monogamy Inequality for Squared Tsallis-q Entanglement[J]. Chinese Journal of Computational Physics, 2020, 37(6): 745-749. DOI: 10.19596/j.cnki.1001-246x.8150
Authors:YUAN Guangming  WANG Xuewen  DONG Minghui  BAI Zhiming  LIU Enchao
Affiliation:1. Department of Basic Courses, Qilu Institute of Technology, Jinan, Shandong 250200, China;2. School of Science, Hebei University of Science and Technology, Shijiazhuang, Hebei 050018, China
Abstract:Tsallis-q entanglement is a well-known entanglement measures which obeys a tighter monogamy inequality with q∈[2,3]. We extend the range of q for analytic formula of Tsallis-q entanglement to q∈[(5-√13)/2,(5+√13)/2], and prove that it is a tighter monogamy inequality of quantum entanglement in terms of squared Tsallis-q entanglement. It is tighter than existing ones,and the range of q become broader than tighter monogamy inequality using Tsallis-q entanglement.
Keywords:quantum optics  entanglement  monogamy  Tsallis-q entanglement  
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