Nonreciprocal ground-state cooling of multiple mechanical resonators
Authors: Lai DG., Huang JF., Yin XL., Hou BP., Li WL., Vitali D., Nori F., Liao JQ
Autors Affiliation: Hunan Normal Univ, Key Lab Low Dimens Quantum Struct & Quantum Contr, Key Lab Matter Microstruct & Funct Hunan Prov, Dept Phys,Minist Educ, Changsha 410081, Peoples R China; Hunan Normal Univ, Synerget Innovat Ctr Quantum Effects & Applicat, Changsha 410081, Peoples R China; RIKEN, Theoret Quantum Phys Lab, Saitama 3510198, Japan; Sichuan Normal Univ, Coll Phys & Elect Engn, Inst Solid State Phys, Chengdu 610068, Peoples R China; Univ Camerino, Sch Sci & Technol, Phys Div, I-62032 Camerino, MC, Italy; INFN, Sez Perugia, I-06123 Perugia, Italy; CNR INO, Largo Enrico Fermi 6, I-50125 Florence, Italy; Univ Michigan, Phys Dept, Ann Arbor, MI 48109 USA
Abstract: The simultaneous ground-state cooling of multiple degenerate or near-degenerate mechanical modes coupled to a common cavity-field mode has become an outstanding challenge in cavity optomechanics. This is because the dark modes formed by these mechanical modes decouple from the cavity mode and prevent extracting energy from the dark modes through the cooling channel of the cavity mode. Here we propose a universal and reliable dark-mode-breaking method to realize the simultaneous ground-state cooling of two degenerate or nondegenerate mechanical modes by introducing a phase-dependent phonon-exchange interaction, which is used to form a loop-coupled configuration. We find an asymmetrical cooling performance for the two mechanical modes and expound this phenomenon based on the nonreciprocal energy transfer mechanism, which leads to the directional flow of phonons between the two mechanical modes. We also generalize this method to cool multiple mechanical modes. The physical mechanism in this cooling scheme has general validity and this method can be extended to break other dark-mode and dark-state effects in physics.
Journal/Review: PHYSICAL REVIEW A
Volume: 102 (1) Pages from: 011502-1 to: 011502-6
More Information: D.-G.L. thanks Yue-Hui Zhou and Dr. Wei Qin for valuable discussions. J.-Q.L. is supported in part by National Natural Science Foundation of China (Grants No. 11822501, No. 11774087, and No. 11935006), Natural Science Foundation of Hunan Province, China (Grant No. 2017JJ1021), and Hunan Science and Technology Plan Project (Grant No. 2017XK2018). D.-G.L. is supported in part by Hunan Provincial Postgraduate Research and Innovation project (Grant No. CX2018B290). J.-F.H. is supported in part by the National Natural Science Foundation of China (Grant No. 11505055) and Scientific Research Fund of Hunan Provincial Education Department (Grant No. 18A007). B.-P.H. is supported in part by NNSFC (Grant No. 11974009). W.L. and D.V. are supported by the European Union Horizon 2020 Programme for Research and Innovation through the Project No. 732894 (FET Proactive HOT) and the Project QuaSeRT funded by the QuantERA ERA-NET Cofund in Quantum Technologies. F.N. is supported in part by NTT Research, Army Research Office (ARO) (Grant No. W911NF-18-1-0358), Japan Science and Technology Agency (JST) (via the CREST Grant No. JPMJCR1676), Japan Society for the Promotion of Science (JSPS) (via the KAKENHI Grant No. JP20H00134, and the JSPS-RFBR Grant No. JPJSBP120194828), and the Foundational Questions Institute Fund (FQXi) (Grant No. FQXi-IAF19-06), a donor advised fund of the Silicon Valley Community Foundation.KeyWords: NON-RECIPROCITY; QUANTUM; ENTANGLEMENT; OSCILLATOR; SYSTEMSDOI: 10.1103/PhysRevA.102.011502Citations: 72data from “WEB OF SCIENCE” (of Thomson Reuters) are update at: 2023-12-03References taken from IsiWeb of Knowledge: (subscribers only)Connecting to view paper tab on IsiWeb: Click hereConnecting to view citations from IsiWeb: Click here