宇宙微波背景辐射对量子卫星信道性能及纠缠储备量的影响
[1] Srianand R,Petitjean P,Leddoux C.The Cosmic Microwave Background Radiation Temperature at a Redshift of 2.34[J].Nature,2000,408(6815):931-935.DOI:10.1038/35050020.
[2] Yin J,Ren J,Lu H,et al.Quantum Teleportation and Entanglement Distribution over 100-kilomentre Free-space Channels[J].Nature,2012,488(7410):185-188.DOI: 10.1038/nature 11332.
[3] Yin J,Cao Y,Yong H L,et al.Lower Bound on the Speed of Nonlocal Correlations without Locality and Measurement Choice Loopholes[J].Physical Review Letters,2013,110(26):919-919.DOI: 10.1103/PhysRevLett.110.260407.
[4] Vallone G,D'Ambrosio V,Sponselli A,et al.Free-Space Quantum Key Distribution by Rotation-Invariant Twisted Photons[J].Physical Review Letters, 2014,113(6):060503-060503.DOI:10.1103/PhysRevLett.113.060503.
[5] 裴昌幸, 阎毅, 刘丹, 等.一种基于纠缠态的量子中继通信系统[J].光子学报, 2008,37(12):2422-2426.DOI:10.3969/j.issn.1003-8329.2009.02.007
[6] Zhang Y Q,Jin X R,Zhang S.Teleportation of an Unknown Two-particle Three-level Entangled State by Unitary Operations[J].ActaSinica Quantum Optica,2006,12(2):75-79.DOI: 10.1088/0253-6102/45/2/017.
[7] 杨光, 廉保旺, 聂敏.振幅阻尼信道量子隐形传态保真度恢复机理[J].物理学报,2015,64(1):24-32.DOI:10.7498/aps.64.010303.
[8] 董义乔, 张笋.暴涨中粒子的生成对大尺度宇宙微波背景各项异性功率谱的影响[J].天文学报,2010,51(4):336-340.
[9] 安辉耀, 于涛, 刘敦伟, 等.基于稳定子码在噪声信道的量子安全直接通信方案研究[J].量子光学学报,2014(2014年03):187-191. DOI:10.3788/asqo20142003.0187.
[10] Mani A,Karimipour V,Memarzadeh L.A Comparison of Parallel and Anti-parallel Two Qubit Mixed States[J].Physical Review A, 2015, 91(1):201-201.DOI: 10.1103/PhysRevA.91.012304.
[11] 李照鑫, 邹健, 蔡金芳, 等.电荷量子比特与量子化光场之间的纠缠[J].物理学报,2006,55(4):1580-1584. DOI:10.3321/j.issn:1000-3290.2006.04.008.
[12] Liu H,Li T P.Inconsistency Between WMAP Data and Released Map[J].Chinese Science Bulletin, 2010,55(10): 907-909.DOI:10.1007/s11434-010-0131-5.
[13] 左维, Lombardo U,沈彩万, 等.自旋极化核物质的状态方程[J].Chinese Physics C,2004,28(3):284-289. DOI:10.3321/j.issn:0254-3052.2004.03.014.
[14] Tsallis C,SáBarreto F C,Ed L.Generalization of the Plank Radiation Law and Application to the Cosmic Microwave Background Radiation[J].Physical Review E Statistical Physics Plasmas Fluids & Related Interdisciplinary Topics,1995,52(2):1447-1451.DOI: 10.1103/PhysRevE.52.1477.
[15] 于波,景明勇,胡建勇,等.基于实时优化单光子干涉可视度的相位编码量子密钥分发[J].量子光学学报,2016,3: 005. DOI:10.3788/JQO20162203.0005.
[16] Zure W H.Decoherence,Einselection,and the Quantum Origins of the Classical[J].Review of Modern Physics,2001,75(3):715-775.DOI: 10.1103/RevModPhys.75.715.
[17] 何敏, 王衍波, 朱勇, 等.实际QKD系统误码检测的进错比特数研究[J].量子光学学报,2015(2): 107-112. DOI:10.3788/ASQO20152102.0107.
[18] 聂敏, 任杰, 杨光, 等.PM2.5大气污染对自由空间量子通信性能的影响[J].物理学报,2015,64(15):1-8. DOI: 10.7498/aps.64.150301.
[19] Michael A.Nielsen,Isaac L.Chuang.量子计算和量子信息[M].赵千川, 译.北京:清华大学出版社,2004:60-75.
[20] Vedral V.Quantum Physics: Entanglement Hits the Big Time[J].Nature,2003,425(6953):28-29. DOI:10.1038/425028a.
[21] 章礼华.量子纠缠的直接测量研究[D].安徽大学,2014.
[22] Hill B S,Wootters.W.K.: Entanglement of a Pair of Quantum Bits[C].Phys Rev Lett,2013,78(26):5022-5025.DOI:https://doi.org/10.1103/PhysRevLett.78.5022.
[23] Rezkhani A T.Characterization of Two-qubit Perfect Entanglers[J],Physical Review A,2004,70(5):469-469.DOI: 10.1103/PhysRevA.70.052313.
[24] 董颖娣,彭进业.基于正交频分复用的连续变量量子密钥分发方案[J].量子光学学报,2016,22(4): 348-355. DOI: 10.3788/jqo20162204.0009.
[25] 郝刘祥.外尔的统一场论及其影响[J].自然科学史研究,2004,23(1):50-63.DOI:10.3969/j.issn.1000-0224.2004.01.005.
[26] 林青.普适单体偏振高维量子态幺正操作的光学实现[J].中国科学:物理学力学天文学,2014,3:317-325.DOI: 10.1360/N132013-00027.
贾娜, 聂敏, 杨光, 张美玲, 裴昌幸. 宇宙微波背景辐射对量子卫星信道性能及纠缠储备量的影响[J]. 量子光学学报, 2017, 23(2): 111. JIA Na, NIE Min, YANG Guang, ZHANG Mei-ling, PEI Chang-xing. Influences of Cosmic Microwave Background Radiation on the Quantum Satellite Down-chain Communication Performance and Entanglement Reserves[J]. Acta Sinica Quantum Optica, 2017, 23(2): 111.