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37. Zhen Jiang, Hongwei Wang, Yikai Su, Chun Jiang*, and Guangqiang He*. Topological Protected Transport of Broadband Quantum Frequency Comb in Valley Photonic Crystals. [C]//Fundamental Science. Conference on Lasers and Electro-Optics, 2024: FW3M.6.
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36. Yang Shen, Yuechen Yang, Kailu Zhou, Yuanzhuo Ding, Tinghao Jiang, and Guangqiang He*. Optical Ranging Using Coherent Kerr Soliton Dual microcombs with Extended Ambiguity Distance. [C]//Fundamental Science. Conference on Lasers and Electro-Optics, 2024: AF2E.5.
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35. Nianqin Li, Bo Ji, Yang Shen, and Guangqiang He*. A Platform for Designing Bipartite Entangled Quantum Frequency Combs via Silicon Nitride Microring Resonators. [C]//Fundamental Science. Conference on Lasers and Electro-Optics, 2024: JW2A.172.
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34. Zhen Jiang, Chaoxiang Xi, Chun Jiang*, and Guangqiang He*. Manipulation of Entangled Photon Pairs in Sandwich Valley Photonic Crystals. [C]//Fundamental Science. Conference on Lasers and Electro-Optics, 2023: JW2A.139. |
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33. Chenhua Hu, Zhen Jiang, Chaoxiang Xi, Hui Wang, and Guangqiang He*. Topologically Protected Entangled Biphoton States in High-order Topological Insulators. [C]//Fundamental Science. Conference on Lasers and Electro-Optics, 2023: JW2A.89. |
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32. Yuechen Yang, Kailu Zhou, Chenhua Hu, Yang Shen, and Guangqiang He*. Dual-Comb Ranging Using Soliton Microcombs with Tunable Repetition Rate. [C]//Fundamental Science. Conference on Lasers and Electro-Optics, 2023: JTu2A.37. |
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31. Chaoxiang Xi, Chenhua Hu, Yang Shen, Lefeng Zhou, Hui Wang, and Guangqiang He*, A Standalone Soliton Microcomb Prototype [C]// Ultra-high Rep Lasers and Frequency Comb. 15th Pacific Rim Conference on Lasers and Electro-Optics (CLEO-PR 2022): CFA1J-03.
https://confit.atlas.jp/guide/event/cleopr2022/subject/CFA1J-03/tables?cryptoId=
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30. Zhen Jiang, Chaoxiang Xi, Guangqiang He*, and Chun Jiang*, Topologically Protected Entangled Photon Pairs in Honeycomb Photonic Crystals [C]//Fundamental Science. Conference on Lasers and Electro-Optics, 2022: JW3B.82.
https://opg.optica.org/abstract.cfm?uri=CLEO_QELS-2022-JW3B.82
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29. Zhen Jiang, Chaoxiang Xi, Guangqiang He*, and Chun Jiang*, Four-Wave Mixing Interaction in a Topological Resonator [C]//Fundamental Science. Conference on Lasers and Electro-Optics, 2022: JW3B.45.
https://opg.optica.org/abstract.cfm?uri=CLEO_SI-2022-JW3B.45
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28. Chaoxiang Xi, Zhen Jiang, Lefeng Zhou, and Guangqiang He*, Topological Protection of Supercontinuum Generation [C]//Science and Innovations. Conference on Lasers and Electro-Optics, 2022: JTh3B.54.
https://opg.optica.org/abstract.cfm?uri=CLEO_QELS-2022-JTh3B.54
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27. Xin Huang, Chaoxiang Xi, Lefeng Zhou, Yang Shen, and Guangqiang He*. Dissipative Kerr solitons burst in microresonator and time-frequency analysis[C/OL] // High-Brightness Sources and Light-Driven Interactions Congress (MICS) 2022. Budapest, Hungary. Optica Publishing Group, 2022: MW2C.3. https://doi.org/10.1364/MICS.2022.MW2C.3 |
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26. Xi C, Ding Y, He G*. Frequency-Multipath Hyperentangled Photons Generation Using Quasi-Phase-Matched Nonlinear Photonic Crystal[C]//Advanced Photonics Congress 2020: Nonlinear Photonics. Optical Society of America, 2020: NpTu4D. 11. https://doi.org/10.1364/NP.2020.NpTu4D.11
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25. Yizhou Ding, Chaoxiang Xi and Guangqiang He*, "Generation of Path-Frequency Hyperentanglement by Simultaneous Multiple Quasi-Phase Matching in Nonlinear Photonic Crystals", CLEO JTh2A.68, 10 – 15 May 2020, San Jose, CA, USA. https://doi.org/10.1364/CLEO_AT.2020.JTh2E.25
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24. Aiguo Sheng, Yilong Zhao, and Guangqiang He*, "Characterization of Kerr Solitons in Microresonators with Parameter Optimization and Nonlinear Fourier Spectrum," in Conference on Lasers and Electro-Optics, OSA Technical Digest (Optical Society of America, 2019), paper JW2A.47.
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23. Aiguo Sheng, Yilong Zhao, and Guangqiang He*, "Quadratic soliton combs in doubly resonant half-harmonic generation," in Nonlinear Optics (NLO), OSA Technical Digest (Optical Society of America, 2019), paper NTu4A.18.
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22. Guangqiang He* and Ya-Dong Wu, Continuous-Variable Measurement-Device-Independent Multipartite Quantum Communication, 7th International Conference on Quantum Cryptography (QCRYPT2017), 18-22 September 2017, Cambridge, United Kingdom
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21. Linxi Hu, Yuanjia Wang, Can Yang, and Guangqiang He*, Continuous-variable quantum key distribution using coherent polarization state discretely modulated by an intrinsically stable polarization-modulated unit, 7th International Conference on Quantum Cryptography (QCRYPT2017), 18-22 September 2017, Cambridge, United Kingdom
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20. Can Yang, Cheng Ma, Jingdong Wang, and Guangqiang He*, A hierarchical modulation coherent communication scheme for simultaneous four-state continuous-variable quantum key distribution and classical communication, 7th International Conference on Quantum Cryptography (QCRYPT2017), 18-22 September 2017, Cambridge, United Kingdom
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19. Guangqiang He*, Chengrui Zhu, Linxi Hu, Jietai Jing, Generation of path-polarization hyperentanglement using quasi-phase-matching in quasi-periodic nonlinear photonic crystal, OSA Nonlinear Optics Toptical Meeting (NLO), 17-21 July 2017, Waikoloa, Hawaii, USA.
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) 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18. Luning Wang, Siyu Liu, Chenyang Li, Guangqiang He*, A Combination of Eigenvalue and Spectral FunctionModulation in Nonlinear Frequency Division Multiplexing, OSA Nonlinear Optics Toptical Meeting (NLO), 17-21 July 2017, Waikoloa, Hawaii, USA.
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![](data:image/png;base64,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) |
17. Siyu Liu, Luning Wang, Chenyang Li, Guangqiang He*, Spectral Function Modulation based on Nonlinear Fourier Transform, OSA Nonlinear Optics Toptical Meeting (NLO), 17-21 July 2017, Waikoloa, Hawaii, USA.
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16. Chengrui Zhu, Xikun Chen, Linxi Hu, Jietai Jing, Guangqiang He*, Generation of path-polarization hyperentanglement using quasi-phase-matching in quasi-periodic nonlinear photonic crystal, Frontiers in Optics/Laser Science Conference (FiO/LS), October 21, 2016, Rochester.
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) 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15. Zitong Xiong, Bolin Wang, Jian Ruan, Guangqiang He*, Soliton formation with controllable frequency line spacing using dual-pump in microresonator, 2016 Phontonics and Fiber Technology Conference, September 5-8, Sydney, Australia, JT4A.10.
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14. Guangqiang He, The generation of five-partite entanglement in a high-Q microresonator using cascaded four-wave mixing processes, 14th International Conference on Squeezed States and Uncertainty Relations, Gdańsk, Poland, 29 June-03 July 2015.
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13. Zeyu Zhang,Chengrui Zhu and Guangqiang He*, Improving the performance of continuous variable quantum key distribution using fading effects of free-space channel, 2015 International Conference on Optical Instrument & Technology, May 17-19 2015, 9619-85, Beijing, China.
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12. Guangqiang He*, Ruofei Shen, Sichen Pan and Qiang Lin,Highly Efficient Integrated Generator of Tripartite Entanglement from Whispering Gallery Microresonator, Nonlinear Optics (NLO) 26-31 July 2015, W4A.3, Kauai, Hawaii, USA.
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11. Guangqiang He*, Ruofei Shen and Jian Ruan, Integrated source of path-polarization hyperentanglement using quasi-periodic nonlinear photonic crystal, Advanced Photonics 2015 IpT3B.5, 27 June-1 July 2015, Boston, Massachusetts, USA.
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10. Yutian Wen, Qiang Lin and Guangqiang He*, High-Q Microresonator as a Five-Partite Entanglement Generator via Cascaded Parametric Processes, CLEO JW2A.13, 10-15 May 2015, San Jose, CA, USA.
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9. Guangqiang He*,Continuous variable multipartite entanglement and its applications in quantum information technology;Taishan Academic Forum-Laser and Quantum Communications Conference (LQCC), October 18-20, 2013, Liaocheng, Shandong, China (Invited).
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8. Guangqiang He*,Continuous variable multipartite entanglement and its applications in quantum information technology;The 15th national conference of quantum optics in China, July 14-17, 2012, Guangzhou, Guangdong, China.
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![](/userfiles/images/kycg/9.png) |
7. Guangqiang He*, Guihua Zeng, Continuous variable multipartite entanglement and its applications, 5th Asia Pacific Conference on Quantum Information Science, August 21-24, 2010, Taiyuan, Shanxi, China. |
![](/userfiles/images/kycg/10.png) |
6. Guangqiang He*,Guihua Zeng, Equivalence of continuous variable stabilizer states under local Clifford operations, 2nd Workshop on Entanglement and Quantum Control, June 7-10, 2010, Qufu, Shandong, China (Invited). |
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5. Symposium on optical interactions and quantum systems, University of Rochester, October 23-24, 2009.
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4. XI cross border workshop on laser science, Ottawa University, Canada, May 28-30, 2009.
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3. Guangqiang He*,Lijie Ren,Guihua Zeng,Universal teleportation protocol based on continuous-variable graph states, Journal of quantum optics(2008):34;The 13th national conference of quantum optics in China, Kunming. |
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2. Asian Conference on Quantum Information Science 2006, September 1-4, 2006, Beijing, China.
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1. Guangqiang He*,Jin Xiong,Yin Guo,Guihua Zeng,Quantum secure communication based on continuous variable EPR entangled pairs,Journal of quantum optics(2006), 12:42;The 12th national conference of quantum optics in China, Nanchang. |