Summary
This paper related to apply Berry’s theory of topological phase to coherent states. The calculations of Berry’s phase for several coherent states were completed under the condition that the parameters contained in every coherent state changed slowly round a closed pathC in parameter space.
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References
M. V. Berry:Proc. R. Soc. London Ser. A,392, 45 (1984).
B. Simon:Phys. Rev. Lett.,51, 2167 (1983).
A. Tomita andR. Y. Chiao:Phys. Rev. Lett.,57, 937 (1986).
G. Delacrétaz, E. R. Grand, R. L. Whetten, L. Wöste andJ. W. Zwanziger:Phys. Rev. Lett,56, 2598 (1986).
Y. Aharonov andJ. Anandan:Phys. Rev. Lett.,58, 1593 (1987).
J. Samuel andR. Bhandari:Phys. Rev. Lett.,60, 2339(1988).
J. R. Klauder, Bo-Sture Skagerstam:Coherent States: Applications in Physics and Mathematical Physics (World Scientific Publishing, Singapore, 1985).
T. F. Jordan:J. Math. Phys. (N.Y.),28, 1759 (1987).
Jin-quan Cheng:The New Approach for Group Representation Theory (Chinese) (Publishing House of Science and Technology of Shanghai, China, 1984).
Hong-yi Fan andTu-nan Ruan:SU(3) Charged + Hypercharged Coherent State and the Color Quantum Number (Physica Energiae Fortis et Physica Nuclearis (Chinese)), Vol. 8, No. 4, 416 (1984).
Advances in Nuclear Physics, edited byJ. W. Negele andE. Vogt, Vol.13 (Plenum Press, New York, N.Y., 1984).
Zhong Tang, Yong-de Zhang:The coherent state representation and its applications in IBM-II Theory, will be sent toNuovo Cimenta.
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Yong-de, Z., Lei, M. Berry’s phase for coherent states. Nuov Cim B 105, 1343–1358 (1990). https://doi.org/10.1007/BF02742688
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DOI: https://doi.org/10.1007/BF02742688