Dynamical Properties of the GCM Rotational Hamiltonian : Dynamics of the Transition from Collective to Noncollective Rotation : Nuclear Physics
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概要
- 論文の詳細を見る
The general form of the rotational Hamiltonian is derived using the generator coordinate method for a well-deformed intrinsic state without any symmetry property. It is shown that this Hamiltonian can describe the dynamics of the band termination, that is, the transition from collective to noncollective rotation for a simple nuclear system.
- 理論物理学刊行会の論文
- 1993-12-25
著者
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UNE Tsutomu
Institute of Physics, University of Tsukuba
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Une Tsutomu
Institute Of Physics University Of Tsukuba
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UNE Tsutom
Institute of Physics, University of Tsukuba
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UNE Tsutomu
Institute of Physics, University of Tsukaba
関連論文
- A Possible Microscopic Description of Nuclear Collective Rotation in Band-Crossing Region:Occurrence Mechanism of s-Band
- Geometry of the Self-Consistent Collective-Coordinate Method for the Large-Amplitude Collective Motion : Stability Condition of Maximally-Decoupled Collective Submanifold
- Maximally-Decoupled Collective Submanifold in a Simple Solvable Model
- An Attempt toward Quantum Theory of "Maximally-Decoupled"Collective Motion
- Quantum Theory of Collective Motion : Quantized Self-Consistent Collective-Coordinate Method for the Large-Amplitude Nuclear Collective Motion
- Local Gaussian Approximation in the Generator Coordinate Method
- A Step toward Large-Amplitude Description of the Ground Band around Band Crossing
- On the Extended Siegert Theorem
- Quantization of the Adiabatic TDHF Theory of Large Amplitude Collective Motion
- Collective Hamiltonian in the Generator Coordinate Method with Local Gaussian Approximation
- Finite-Range DWBA Analysis of Anomalous Analyzing Powers in (p,α) Reactions
- Dynamical Properties of the GCM Rotational Hamiltonian : Dynamics of the Transition from Collective to Noncollective Rotation : Nuclear Physics
- Study of Tilted Rotation Based on the Method of Variation after Projection