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基于压缩态光场的量子增强型光学相位追踪

孙小聪 李卫 王雅君 郑耀辉

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基于压缩态光场的量子增强型光学相位追踪

孙小聪, 李卫, 王雅君, 郑耀辉

Quantum-enhanced optical phase tracking via squeezed state

Sun Xiao-Cong, Li Wei, Wang Ya-Jun, Zheng Yao-Hui
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  • 量子增强型光学相位追踪作为高精度跟踪和测量光学相位的量子光学技术, 在目标定位、量子测距以及相控阵雷达和唢呐等领域中有着重要应用. 本文提出一种基于压缩态光场的量子增强型光学相位追踪协议. 采用中心波长为1064 nm的连续固体激光光源, 结合光学参量振荡器以及Pound-Drever-Hall (PDH)锁定技术, 制备得到初始压缩度为(8.0±0.2) dB的相位压缩态光场. 通过信号调制及解调技术, 实现对压缩态光场相位的控制, 从而实现对光学相位0—2π范围内的量子增强型追踪. 与经典协议相比, 这一协议可以将相位追踪的噪声起伏抑制至散粒噪声基准以下至少6.27 dB, 实现了相位追踪精度至少76.4%的量子增强. 由于到达角估计、相控阵雷达、相控阵唢呐等应用领域对相位测量精度要求极高, 这一协议有望将相位估计的精度提高至突破散粒噪声极限, 为相关领域提供压缩光源, 也为更高精度的空间定位及量子测距技术提供理论和实验基础.
    Quantum-enhanced optical phase tracking is a quantum optical technique for tracking and measuring optical phases with high accuracy. It has important applications in laser interferometry, spectral analysis, and optical measurements. In this study, we propose a quantum-enhanced optical phase tracking protocol based on squeezed state optical fields. By using a continuous solid-state laser source with a central wavelength of 1064 nm, combing second harmonic generation, optical parametric oscillator, and PDH (Pound-Drever-Hall) locking technology, we prepare an initial squeezed state with a squeezing level of (8.0±0.2) dB. Through signal modulation technique and demodulation technique, we control the phase of the squeezed state optical field, thereby realizing the quantum-enhanced tracking of optical phases within the range of 0-2π. Compared with classical protocols, this protocol can suppress the noise fluctuations of phase tracking to at least 6.27 dB below the shot noise limit, improving the phase tracking accuracy by more than 76.4%. Because of the high requirements for phase measurement accuracy in applications such as angle estimation, phased array radar, and phased array sonar, this protocol is expected to improve the phase estimation accuracy beyond the shot noise limit. It provides compressed light sources for relevant fields, laying a theoretical and experimental foundation for higher-precision spatial positioning and quantum ranging techniques. The probe is made of amino acids arranged in a linear chain and joined together by peptide bonds between the carboxyl and amino groups of adjacent amino acid residues. The sequence of amino acids in a protein is determined by a gene and encoded in the genetic code. This can happen either before the protein is used in the cell, or as part of control mechanism.
      通信作者: 郑耀辉, yhzheng@sxu.edu.cn
    • 基金项目: 国家自然科学基金 (批准号: 62225504, 62027821, 62035015, U22A6003, 12174234, 12274275, 12304403)、国家重点研发计划 (批准号: 2020YFC2200402)和山西省重点研发计划 (批准号: 202102150101003) 资助的课题.
      Corresponding author: Zheng Yao-Hui, yhzheng@sxu.edu.cn
    • Funds: Project supported by the National Natural Science Foundation of China (Grant Nos. 62225504, 62027821, 62035015, U22A6003, 12174234, 12274275, 12304403), the National Key R&D Program of China (Grant No. 2020YFC2200402), and the Key R&D Program of Shanxi Province, China (Grant No. 202102150101003).
    [1]

    Giovannetti V, Lloyd S, Maccone L 2011 Nat. Photon. 5 222Google Scholar

    [2]

    Pezze L, Smerzi A, Oberthaler M K, Schmied R, Treutlein P 2018 Rev. Mod. Phys. 90 035005Google Scholar

    [3]

    Caves C M 1981 Phys. Rev. D 23 1693Google Scholar

    [4]

    Tse M, Yu H, Kijbunchoo N, et al. 2019 Phys. Rev. Lett. 123 231107Google Scholar

    [5]

    Li B B, Blek J, Hoff U B, Madsen L S, Forstner S, Prakash V, Schäfermeier C, Gehring T, Bowen W P, Andersen U L 2018 Optica 5 850Google Scholar

    [6]

    Taylor M A, Janousek J, Daria V, Knittel J, Hage B, Bachor H A, Bowen W P, 2013 Nat. Photon. 7 229Google Scholar

    [7]

    Low G H, Yoder T J, Chuang I L 2015 Phys. Rev. Lett. 114 100801Google Scholar

    [8]

    徐涵, 陈树新, 吴昊, 陈坤, 洪磊 2019 物理学报 68 024204Google Scholar

    Xu H, Chen S X, Wu H, Chen K, Hong L 2019 Acta Phys. Sin. 68 024204Google Scholar

    [9]

    Li T C, Song Y, Fan H Q 2023 Signal Process. 205 108883Google Scholar

    [10]

    Shi C, Wang Y, Salous S, Zhou J, Yan J 2022 IEEE T. Aero. Elec. Sys. 58 2762Google Scholar

    [11]

    Guo X, Breum C R, Borregaard J, Izumi S, Larsen M V, Gehring T, Christandl M, Neergaard-Nielsen J S, Andersen U L 2020 Nat. Phys. 16 281Google Scholar

    [12]

    Xia Y, Li W, Clark W, Hart D, Zhuang Q T, Zhang Z S 2020 Phys. Rev. Lett. 124 150502Google Scholar

    [13]

    Xia Y, Li W, Zhuang Q T, Zhang Z S 2021 Phys. Rev. X 11 021047

    [14]

    Sun X C, Li W, Tian Y H, Li F, Tian L, Wang Y J, Zheng Y H 2022 Photonics Res. 10 2886Google Scholar

    [15]

    田龙, 郑立昂, 张晓莉, 武奕淼, 王庆伟, 秦博, 王雅君, 李卫, 史少平, 陈力荣, 郑耀辉 2023 物理学报 72 148502Google Scholar

    Tian L, Zheng L A, Zhang X L, Wu Y M, Wang Q W, Qin B, Wang Y J, Li W, Shi S P, Chen L R, Zheng Y H 2023 Acta Phys. Sin. 72 148502Google Scholar

    [16]

    张晓莉, 王庆伟, 姚文秀, 史少平, 郑立昂, 田龙, 王雅君, 陈力荣, 李卫, 郑耀辉 2022 物理学报 71 184203Google Scholar

    Zhang X L, Wang Q W, Yao W X, Shi S P, Zheng L A, Tian L, Wang Y J, Chen L R, Li W, Zheng Y H 2022 Acta Phys. Sin. 71 184203Google Scholar

    [17]

    Sun X C, Wang Y J, Tian L J, Zheng Y H, Peng K C 2019 Chin. Opt. Lett. 17 072701Google Scholar

    [18]

    Shi S P, Wang Y J, Yang W H, Zheng Y H, Peng K C 2018 Opt. Lett. 43 5411Google Scholar

    [19]

    Zhou H J, Wang W, Chen C, Zheng Y H 2015 IEEE Sens. J. 15 2101Google Scholar

    [20]

    Zhou H J, Yang W H, Li Z X, Li X F, Zheng Y H 2014 Rev. Sci. Instrum. 85 013111Google Scholar

  • 图 1  基于压缩态光场的QOPT实验装置图. ISO-隔离器; EOM-电光相位调制器; HR-高反镜; PD-光电探测器; BS-分束镜; DBS-双色镜; SHG-二次谐波产生; OPO-光学参量振荡器; PS-移相器; BHD-平衡零拍探测器; BPF-带通滤波器; amp-前置放大器; OSC-示波器

    Fig. 1.  Experimental setup for QOPT protocol via squeezed state. ISO-isolator; EOM-electro-optic phase modulator; HR- high reflectivity mirror; PD-photoelectric detector; BS-beam splitter; DBS-dichroic beam splitter; SHG-second harmonic generator; OPO-optical parametric oscillator; PS-phase shifter; BHD-balanced homodyne detection; BPF-band-pass filter; amp-amplifier; OSC-oscilloscope.

    图 2  无调制相位时示波器采集到的正交位相分量信号 (a) 基于相干光的测量结果; (b) 基于压缩光的测量结果

    Fig. 2.  Phase quadrature components acquiesced by oscillator without phase modulation: (a) Measured results via coherent state; (b) measured results via squeezed state.

    图 3  调制相位为-π/2时示波器采集的正交位相分量 (a) 基于相干光的测量结果; (b) 基于压缩光的测量结果

    Fig. 3.  Phase quadrature components acquiesced by oscillator with phase modulation of -π/2: (a) Measured results via coherent state; (b) measured results via squeezed state.

    图 4  光学相位的追踪结果 (a)调制相位与测量相移的依赖关系; (b) 基于相干光与压缩光两种状态下, 光学相位的噪声方差

    Fig. 4.  Optical phase tracking results: (a) Dependence of measured phase amplitude on phase modulation; (b) noise variance of optical phase via coherent state and squeezed state.

  • [1]

    Giovannetti V, Lloyd S, Maccone L 2011 Nat. Photon. 5 222Google Scholar

    [2]

    Pezze L, Smerzi A, Oberthaler M K, Schmied R, Treutlein P 2018 Rev. Mod. Phys. 90 035005Google Scholar

    [3]

    Caves C M 1981 Phys. Rev. D 23 1693Google Scholar

    [4]

    Tse M, Yu H, Kijbunchoo N, et al. 2019 Phys. Rev. Lett. 123 231107Google Scholar

    [5]

    Li B B, Blek J, Hoff U B, Madsen L S, Forstner S, Prakash V, Schäfermeier C, Gehring T, Bowen W P, Andersen U L 2018 Optica 5 850Google Scholar

    [6]

    Taylor M A, Janousek J, Daria V, Knittel J, Hage B, Bachor H A, Bowen W P, 2013 Nat. Photon. 7 229Google Scholar

    [7]

    Low G H, Yoder T J, Chuang I L 2015 Phys. Rev. Lett. 114 100801Google Scholar

    [8]

    徐涵, 陈树新, 吴昊, 陈坤, 洪磊 2019 物理学报 68 024204Google Scholar

    Xu H, Chen S X, Wu H, Chen K, Hong L 2019 Acta Phys. Sin. 68 024204Google Scholar

    [9]

    Li T C, Song Y, Fan H Q 2023 Signal Process. 205 108883Google Scholar

    [10]

    Shi C, Wang Y, Salous S, Zhou J, Yan J 2022 IEEE T. Aero. Elec. Sys. 58 2762Google Scholar

    [11]

    Guo X, Breum C R, Borregaard J, Izumi S, Larsen M V, Gehring T, Christandl M, Neergaard-Nielsen J S, Andersen U L 2020 Nat. Phys. 16 281Google Scholar

    [12]

    Xia Y, Li W, Clark W, Hart D, Zhuang Q T, Zhang Z S 2020 Phys. Rev. Lett. 124 150502Google Scholar

    [13]

    Xia Y, Li W, Zhuang Q T, Zhang Z S 2021 Phys. Rev. X 11 021047

    [14]

    Sun X C, Li W, Tian Y H, Li F, Tian L, Wang Y J, Zheng Y H 2022 Photonics Res. 10 2886Google Scholar

    [15]

    田龙, 郑立昂, 张晓莉, 武奕淼, 王庆伟, 秦博, 王雅君, 李卫, 史少平, 陈力荣, 郑耀辉 2023 物理学报 72 148502Google Scholar

    Tian L, Zheng L A, Zhang X L, Wu Y M, Wang Q W, Qin B, Wang Y J, Li W, Shi S P, Chen L R, Zheng Y H 2023 Acta Phys. Sin. 72 148502Google Scholar

    [16]

    张晓莉, 王庆伟, 姚文秀, 史少平, 郑立昂, 田龙, 王雅君, 陈力荣, 李卫, 郑耀辉 2022 物理学报 71 184203Google Scholar

    Zhang X L, Wang Q W, Yao W X, Shi S P, Zheng L A, Tian L, Wang Y J, Chen L R, Li W, Zheng Y H 2022 Acta Phys. Sin. 71 184203Google Scholar

    [17]

    Sun X C, Wang Y J, Tian L J, Zheng Y H, Peng K C 2019 Chin. Opt. Lett. 17 072701Google Scholar

    [18]

    Shi S P, Wang Y J, Yang W H, Zheng Y H, Peng K C 2018 Opt. Lett. 43 5411Google Scholar

    [19]

    Zhou H J, Wang W, Chen C, Zheng Y H 2015 IEEE Sens. J. 15 2101Google Scholar

    [20]

    Zhou H J, Yang W H, Li Z X, Li X F, Zheng Y H 2014 Rev. Sci. Instrum. 85 013111Google Scholar

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出版历程
  • 收稿日期:  2023-11-22
  • 修回日期:  2023-12-01
  • 上网日期:  2023-12-08
  • 刊出日期:  2024-03-05

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