Two-component polariton condensate in optical microcavity

ZHANG Yong-Chang; ZHOU Xiang-Fa; GUO Guang-Can; ZHOU Xing-Xiang; PU Han; ZHOU Zheng-Wei

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Two-component polariton condensate in optical microcavity

ZHANG Yong-Chang 1,ZHOU Xiang-Fa 1,GUO Guang-Can 1,ZHOU Xing-Xiang 1,PU Han 2,ZHOU Zheng-Wei 1 *

1.Key Laboratory of Quantum Information and Department of Optics and Optical Engineering, University of Science and Technology of China, Chinese Academy of Sciences, Hefei, Anhui 230026, China;Synergetic Innovation Center of Quantum Information and Quantum Physics, University of Science and Technology of China, Hefei, Anhui 230026, China

2.Department of Physics and Astronomy, Rice University, Houston, TX 77005, USA

*Correspondence author

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Funding: National Natural Science Foundation of China （No.Grant No. 11174270）, Fund of CAS and Research Fund for the Doctoral Program of Higher Education of China （No.Grant No. 20103402110024）

Opened online:27 January 2014

Accepted by: none

Citation: ZHANG Yong-Chang,ZHOU Xiang-Fa,GUO Guang-Can.Two-component polariton condensate in optical microcavity[OL]. [27 January 2014] http://en.paper.edu.cn/en_releasepaper/content/4583524

This paper presents a scheme for engineering the extended two-component Bose-Hubbard model using polariton condensate supported by optical microcavity. Compared to the usual two-component Bose-Hubbard model with only Kerr nonlinearity, this model includes a nonlinear tunneling term which depends on the number difference of the particle in the two modes. In the mean field treatment, this model is an analog to a nonrigid pendulum with a variable pendulum length whose sign can be also changed. This paper studies the dynamic and ground state properties of this model and shows that there exists a first-order phase transition as the strength of the nonlinear tunneling rate is varied. Furthermore, a scheme to obtain the polariton condensate wave function is proposed.

Keywords:Quantum simulation; Optical microcavity; Polariton; Nonlinear tunneling

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