Non-Gaussianity and entropy-bounded uncertainty relations: Application to detection of non-Gaussian entangled states

被引:10
作者
Baek, Kyunghyun [1 ]
Nha, Hyunchul [1 ]
机构
[1] Texas A&M Univ Qatar, Dept Phys, POB 23874, Doha, Qatar
来源
PHYSICAL REVIEW A | 2018年 / 98卷 / 04期
关键词
CONTINUOUS VARIABLE SYSTEMS; PARTIALLY COHERENT-LIGHT; SEPARABILITY CRITERION; NORMAL FORMS; EXCITATIONS; PRINCIPLE;
D O I
10.1103/PhysRevA.98.042314
中图分类号
O43 [光学];
学科分类号
070207 ; 0803 ;
摘要
We suggest an improved version of the Robertson-Schrodinger uncertainty relation for canonically conjugate variables by taking into account a pair of characteristics of states: non-Gaussianity and mixedness quantified by using fidelity and entropy, respectively. This relation is saturated by both Gaussian and Fock states and provides a strictly improved bound for any non-Gaussian states or mixed states. For the case of Gaussian states, it is reduced to the entropy-bounded uncertainty relation derived by Dodonov. Furthermore, we consider readily computable measures of both characteristics and find a weaker but more readily accessible bound. With its generalization to the case of two-mode states, we show applicability of the relation to detect entanglement of non-Gaussian states.
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页数:7
相关论文
共 43 条
[1]   NONCLASSICAL PROPERTIES OF STATES GENERATED BY THE EXCITATIONS ON A COHERENT STATE [J].
AGARWAL, GS ;
TARA, K .
PHYSICAL REVIEW A, 1991, 43 (01) :492-497
[2]  
[Anonymous], 1927, Z. Phys, DOI [DOI 10.1007/BF01397280, 10.1007/bf01397280]
[3]  
[Anonymous], 1927, Z. Phys. A, DOI [10.1007/bf01391200, DOI 10.1007/BF01391200]
[4]   NEW CLASS OF UNCERTAINTY RELATIONS FOR PARTIALLY COHERENT-LIGHT [J].
BASTIAANS, MJ .
JOURNAL OF THE OPTICAL SOCIETY OF AMERICA A-OPTICS IMAGE SCIENCE AND VISION, 1984, 1 (07) :711-715
[5]   UNCERTAINTY PRINCIPLE AND INFORMATIONAL ENTROPY FOR PARTIALLY COHERENT-LIGHT [J].
BASTIAANS, MJ .
JOURNAL OF THE OPTICAL SOCIETY OF AMERICA A-OPTICS IMAGE SCIENCE AND VISION, 1986, 3 (08) :1243-1246
[6]   INEQUALITIES IN FOURIER-ANALYSIS [J].
BECKNER, W .
ANNALS OF MATHEMATICS, 1975, 102 (01) :159-182
[7]   UNCERTAINTY RELATIONS FOR INFORMATION ENTROPY IN WAVE MECHANICS [J].
BIALYNICKIBIRULA, I ;
MYCIELSKI, J .
COMMUNICATIONS IN MATHEMATICAL PHYSICS, 1975, 44 (02) :129-132
[8]   EVEN AND ODD COHERENT STATES AND EXCITATIONS OF A SINGULAR OSCILLATOR [J].
DODONOV, VV ;
MALKIN, IA ;
MANKO, VI .
PHYSICA, 1974, 72 (03) :597-615
[9]   Purity- and entropy-bounded uncertainty relations for mixed quantum states [J].
Dodonov, VV .
JOURNAL OF OPTICS B-QUANTUM AND SEMICLASSICAL OPTICS, 2002, 4 (03) :S98-S108
[10]   Inseparability criterion for continuous variable systems [J].
Duan, LM ;
Giedke, G ;
Cirac, JI ;
Zoller, P .
PHYSICAL REVIEW LETTERS, 2000, 84 (12) :2722-2725
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