[1] Wang J, Wiseman H M, Milburn G J. Dynamical creation of entanglement by homodyne-mediated feedback［J］. Physical Review A, 2005, 71(4): 042309.

[2] Carvalho A R R, Reid A J S, Hope J J. Controlling entanglement by direct quantum feedback［J］. Physical Review A, 2008, 78(1): 012334.

[3] Li Y, Luo B, Guo H. Entanglement and quantum discord dynamics of two atoms under practical feedback control［J］. Physical Review A, 2011, 84(1): 012316.

[4] 杨秀丽, 孙童, 张博, 等. 经典场辅助下的三原子量子纠缠动力学［J］. 光学学报, 2016, 36(12): 1227001.

    Yang X L, Sun T, Zhang B, et al. Classical-field-assisted three-atom quantum entanglement dynamics［J］. Acta Optica Sinica, 2016, 36(12): 1227001.

[5] 邱昌东, 卢道明. 两维耦合腔系统中的纠缠特性［J］. 光学学报, 2016, 36(5): 0527001.

    Qiu C D, Lu D M. Entanglement characteristics in two-dimensional coupled cavity systems［J］. Acta Optica Sinica, 2016, 36(5): 0527001.

[6] 闫丽. 两子系统间纠缠演化特性［J］. 激光与光电子学进展, 2017, 54(3): 032701.

    Yan L. Evolution property of entanglement between two subsystems［J］. Laser & Optoelectronics Progress, 2017, 54(3): 032701.

[7] Baumgratz T, Cramer M, Plenio M B. Quantifying coherence［J］. Physical Review Letters, 2014, 113(14): 140401.

[8] Shao L H, Xi Z J, Fan H, et al. Fidelity and trace-norm distances for quantifying coherence［J］. Physical Review A, 2015, 91(4): 042120.

[9] Rana S, Parashar P, Lewenstein M. Trace-distance measure of coherence［J］. Physical Review A, 2016, 93(1): 012110.

[10] Streltsov A, Singh U, Dhar H S, et al. Measuring quantum coherence with entanglement［J］. Physical Review Letters, 2015, 115(2): 020403.

[11] Ma J, Yadin B, Girolami D, et al. Converting coherence to quantum correlations［J］. Physical Review Letters, 2016, 116(16): 160407.

[12] Girolami D. Observable measure of quantum coherence in finite dimensional systems［J］. Physical Review Letters, 2014, 113(17): 170401.

[13] Pires D P, Céleri L C, Soares-Pinto D O. Geometric lower bound for a quantum coherence measure［J］. Physical Review A, 2015, 91(4): 042330.

[14] Winter A, Yang D. Operational resource theory of coherence［J］. Physical Review Letters, 2016, 116(12): 120404.

[15] Singh U, Bera M N, Dhar H S, et al. Maximally coherent mixed states: Complementarity between maximal coherence and mixedness［J］. Physical Review A, 2015, 91(5): 052115.

[16] Chitambar E, Streltsov A, Rana S, et al. Assisted distillation of quantum coherence［J］. Physical Review Letters, 2016, 116(7): 070402.

[17] Wiseman H M, Milburn G J. Quantum theory of optical feedback via homodyne detection［J］. Physical Review Letters, 1993, 70(5): 548-551.

[18] Wiseman H M. Quantum theory of continuous feedback［J］. Physical Review A, 1994, 49(3): 2133-2150.

[19] Wiseman H M. Adaptive phase measurements of optical modes: Going beyond the marginal Q distribution［J］. Physical Review Letters, 1995, 75(25): 4587-4590.

[20] Geremia J M, Stockton J K, Mabuchi H. Real-time quantum feedback control of atomic spin-squeezing［J］. Science, 2004, 304(5668): 270-273.

[21] Reiner J E, Smith W P, Orozco L A, et al. Quantum feedback in a weakly driven cavity QED system［J］. Physical Review A, 2004, 70(2): 023819.

[22] Bushev P, Rotter D, Wilson A, et al. Feedback cooling of a single trapped ion［J］. Physical Review Letters, 2006, 96(4): 043003.

[23] Zheng Q, Ge L, Yao Y, et al. Enhancing parameter precision of optimal quantum estimation by direct quantum feedback［J］. Physical Review A, 2015, 91(3): 033805.

[24] Wang L C, Huang X L, Yi X X. Effect of feedback on the control of a two-level dissipative quantum system［J］. Physical Review A, 2008, 78(5): 052112.

[25] Sun H Y, Shu P L, Li C, et al. Feedback control on geometric phase in dissipative two-level systems［J］. Physical Review A, 2009, 79(2): 022119.

[26] 廖庆洪, 许娟, 鄢秋荣, 等. 缀饰态表象下驱动原子和场相互作用系统的纠缠和熵压缩调控［J］. 中国激光, 2015, 42(5): 0518001.

    Liao Q H, Xu J, Yan Q R, et al. Control of entanglement and entropy squeezing of the atom driven by a classical field interacting with field under the dressed-state representation［J］. Chinese Journal of Lasers, 2015, 42(5): 0518001.