A Microscopic Description of Nuclear Rotational Motion. II : Rotation and HF Approximation
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概要
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A previous work in which we have attempted to construct a microscopic theory of the rotational problem is developed further. For the purpose of improving our method the structure of the intrinsic state is reinvestigated in connection with the equation of motion and the properties of the operator R^<2M> which generates rotational states. On the assumption that R^<2M> is a one-body operator, it is found that each intrinsic state can be described by a single Slater determinant of individual particle states. On the basis of this result our previous method is reformulated into the form of the HF approximation for the intrinsic Hamiltonian H_<in>=H-(1/2g) J^2. In contrast with the usual HF approximation method effects of the residual interaction can be reduced by an appropriate choice of the moment of inertia g. Single-j schell system is analyzed according to this prescription and the moment, of inertia obtained agrees with that in a previous paper. A comment on the interrelation between rotations and independent particle motions is also given.
- 理論物理学刊行会の論文
- 1980-07-25
著者
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Shono Yoshiyuki
Division Of Mathematical Physics Faculty Of Engineering Fukui University
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SHONO Yoshiyuki
Division of Mathematical Physics, Faculty of Engineering Fukui University
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SHONO Yoshiyuki
Division of Mathematical Physics, Faculty of Engineering, Fukui University
関連論文
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- A Microscopic Description of Nuclear Rotational Motion. I
- Microscopic Cluster Model for the ^9_∧Be Hypernucleus
- A Microscopic Description of Nuclear Rotational Motions. III : Equation of Motion in the Intrinsic Space
- A Microscopic Description of Nuclear Rotational Motion. II : Rotation and HF Approximation