Prog. Theor. Phys. Vol. 62 No. 3 (1979) pp. 681-689
On the Canonical Variables Derived from the Schwinger Boson Representation for the Quantized Rotator
— Classical Theory
Department of Physics, Kyoto University, Kyoto 606
(Received March 20, 1979)
With the aid of the correspondence between commutator and Poisson bracket, a set of canonical variables is derived from the Schwinger boson representation for the quantized rotator. By the use of these variables, Euler's equations of motion are given through Hamilton's equations of motion in the case of the rotator. Further, wobbling motion is described in the classical sense. Finally, for the purpose of applying the ATDHB theory to a microscopic description of collective roation, a basic idea is given.
DOI : 10.1143/PTP.62.681
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- J. Schwinger, in Quantum Theory of Angular Momentum, edited by L. Biedenharn and H. van Dam (Academic Press, New York, 1965), p. 229.
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Citing Article(s) :
Progress of Theoretical Physics Vol. 64 No. 1 (1980) pp. 94-100
A Simple Example of the Exactly Soluble Hamiltonian with Coordinate-Dependent Mass in the Semi-Classical Theory
Progress of Theoretical Physics Vol. 64 No. 1 (1980) pp. 101-113
A Description of the Rotator as an Example of Hamiltonian with Coordinate-Dependent Mass
Progress of Theoretical Physics Vol. 70 No. 3 (1983) pp. 783-789
Utility of the Elliptic Function for Classical SU(2)-Models of Nuclear Collective Motions
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