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2024年10月30日

Calculation and Generalization of Non-Adiabatic Geometric Phase of Isotonic Oscillator with Operator Decomposition

  • Operator decomposition approach is used to calculate the non-adiabatic geometric phase of anharmonic oscillator. As an example we focus on isotonic oscillator, a type of anharmonic oscillator. The Aharonov-Anandan phase is derived when we choose base state and the first excitation state as cyclic initial states. Then we generalize our result by choosing three states or more states as cyclic initial states. Finally we give an general formula of Aharonov-Anandan phase for time-independent systems and discuss its applicability.
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  • [1] . Berry M V. Proc. R. Soc. , 1984, A392: 45-572. Berry M V. J. Phys. A: Math. Gen. , 1985, 18: 15-273. Aharonov Y, Anandan J. Phys. Rev. Lett. , 1987, 20: 1593-15964. Moore D J. Phys. Rep. , 1991, 1: 1-435. Galogero F. J. Math. Phys. , 1969, 10: 2191-21966. Zhu D. J. Phys, 1987, A20: 4331-43367. XU Zi-Wen. Acta Physica Sinica, 1996, 45: 1807-1811 (in Chinese)(徐子二物理学报,1996,45:1807-1811)8. CHEN Chang-Yuan, LIU You-Wen. Acta Physica Sinica, 1998, 47:536-541 (in Chinese)(陈昌远,刘友文.物理学报,1998,47:536-541)
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Get Citation
An Nan and YANG Xin-E. Calculation and Generalization of Non-Adiabatic Geometric Phase of Isotonic Oscillator with Operator Decomposition[J]. Chinese Physics C, 2005, 29(4): 350-353.
An Nan and YANG Xin-E. Calculation and Generalization of Non-Adiabatic Geometric Phase of Isotonic Oscillator with Operator Decomposition[J]. Chinese Physics C, 2005, 29(4): 350-353. shu
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Received: 2004-07-12
Revised: 2004-08-07
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Calculation and Generalization of Non-Adiabatic Geometric Phase of Isotonic Oscillator with Operator Decomposition

    Corresponding author: An Nan,
  • Department of physics,School of Science,Tianjin University,Tianjin 300072,China

Abstract: Operator decomposition approach is used to calculate the non-adiabatic geometric phase of anharmonic oscillator. As an example we focus on isotonic oscillator, a type of anharmonic oscillator. The Aharonov-Anandan phase is derived when we choose base state and the first excitation state as cyclic initial states. Then we generalize our result by choosing three states or more states as cyclic initial states. Finally we give an general formula of Aharonov-Anandan phase for time-independent systems and discuss its applicability.

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