Influence of α-Clustering on the Odd-Parity Levels in A=18 Nuclei
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概要
- 論文の詳細を見る
The odd-parity levels of A=18 nuclei are investigated by using a model which amalgamates the 3p-1h shell states and α-widths and E2-transitions are shown to be well understood by the model. It is discussed that in spite of their large deformations the α-cluster states couple strongly with the 3p-1h states.
- 理論物理学刊行会の論文
- 1978-05-25
著者
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Sakuda Toshimi
Department Of Physics Faculty Of Education Miyazaki University
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Sakuda Toshimi
Department Of Applied Physics Faculty Of Engineering Miyazaki University
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NAGATA Shinobu
Department of Applied Physics, Miyazaki University
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Nagata Shinobu
Department Of Applied Physics Faculty Of Engineering Miyazaki University
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Nagata Sinobu
Department Of Applied Physics Faculty Of Engineering Miyazaki University
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NEMOTO Fumiki
Mihara High School, Minamikawachi
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Nemoto Fumiki
Mihara High School
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NAGATA Sinobu
Department of Computer Science and Systems Engineering, Miyazaki University
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NAGATA Sinobu
Department of Applied Physics, Miyazaki University
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NAGATA Sinobu
Department of Applied Physics, Faculty of Engineering, Miyazaki University
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SAKUDA Toshimi
Department of Physics, Kyoto University
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SAKUDA Toshimi
Department of Applied Physics, Faculty of Engineering, Miyazaki University
関連論文
- Chapter IV Charge Form Factors of ^3He and ^4He
- On p-He^4 Effective Potential and Nuclear Forces
- Nuclear Binding Mechanism and Structure of Neutron-Rich Be and B Isotopes by Molecular-Orbital Model
- Chapter VII Hartree-Fock Calculations of Nuclear Bulk Properties with Density- and Starting-Energy-Dependent Effective Interaction
- Reaction Matrix Calculations for Neutron-Rich He-Isotopes
- Hyperon-Nucleon and Hyperon-Hyperon Interactions in Nuclei
- Elastic and Inelastic Collisions of 55 MeV Proton with ^4He
- Binding Energy of Nuclear Matter by the Hole Line Expansion Method
- Study of ^F by α-^N plus t-^O Coupled Channel Orthogonality Condition Model. I : Energy Levels
- Backward Angle Anomaly in Alpha+^O Scattering and Alpha-Cluster States in ^Ne
- Backward Angle Anomaly in Alpha-Nucleus Scattering and Parity-Dependent Optical Model
- On the Collective Mode of Internal Motion of the Nucleus to be coupled with the Irrotational Surface Motion
- Influence of α-Clustering on the Odd-Parity Levels in A=18 Nuclei
- Structure of Intrinsic States of K^π=0^+ Bands in ^Ne : Study of Transient Character
- Study of α-^O Scattering by the Generate Coordinate Method
- Binding Energy of Nuclear Matter by the Hole Line Expansion Method. I
- Optical Model Potential in the Lowest Order Brueckner Theory and Complex Effective N-N Interaction
- Microscopic Study of Nucleon-^4He Scattering and Effective Nuclear Potentials
- Chapter IV Coupling Effects of Two-Particle and Alpha Two-Hole States in A=18 Nuclei
- Admixtures of Shell and Cluster States in ^F
- On Coupling between Shell and Cluster States in ^F
- Study of ^F by α-^N plus t-^O Coupled Channel Orthogonality Condition Model. II : Electromagnetic Transitions and Spectroscopic Factors
- Microscopic Study of Proton-^4He Scattering with Complex Effective N-N Interaction
- Capter III Study of Non-Alpha-Nuclei Based on the Viewpoint of Cluster Correlations
- On the (γ-π^-p) Reaction with Complex Nuclei
- Chapter I Introduction
- Multiple Scattering Equation for Two Particle-One Hole System and Generalized Vertex in Core Polarization of Nuclei. III : Effective Interactions
- Multiple Scattering Equation for Two Particle-One Hole System and Generalized Vertex in Core Polarization of Nuclei. II : Polarization Charges
- Effective Interactions in Finite Nuclei Based on Reaction Matrix Theory. II : Properties of Reaction Matrix and Core-Phonon-Exchange Interaction
- Effective Interactions in Finite Nuclei Based on Reaction Matrix Theory. I : Reaction Matrix Consistent with Model Space
- Chapter VI Reaction Matrix Approach to the Cluster State
- Brueckner-Generator-Coordinate Method and Application to a-a Scattering
- Reaction Matrix Theory for Cluster States in Light Nuclei. II : Clustering Dependence of the Effective Interaction
- Reaction Matrix Theory for Cluster States in Light Nuclei. I : Be^8
- Chapter II Nuclear Reaction Matrix and Nuclear Forces
- Chapter VII Nuclear Forces in Nuclei and Alpha-Clusterization
- On a Calculational Method of Folding Model Potential with Density-Dependent Effective Interactions : Progress Letters
- Systematic Analyses of Proton Elastic Scattering between 65
- Foundation of Deformed Potential Model for Nuclear Rotation
- Tensor Force of the Pion-Theoretical Potential and the Doublet Splitting in n-He^4 Scattering
- Note on the Vibrational Motion in Light Nuclei
- Nuclear Deformation and Nuclear Force. II
- Effective Hamiltonian and Energy Gap in Finite Nuclei
- Application of Variational Principle with Natural Boundary Condition to Scattering in Generator Coordinate Method
- Effective Interaction with Three-Body Effects
- Effective Mass of a Λ-Particle in Nuclear Matter and OBE Λ-N Interactions
- On the Effective Range of the Residual Potential in the Shell Model
- Effects of Correlation in the Core on the Motion of Outer Two Nucleons
- Flavor Nuclei and One-Boson-Exchange Potentials
- Heavy Ion Collision with Friction Model : Nulcear Physics
- On the Quadruple Correlation in the Extra Binding Energy of the s-d Shell Nuclei
- On the Bahaviour of the Wave Function of the Ground State of Li^6
- Nuclear Force and Energy Gap in Finite Nuclei
- Nuclear Deformation and Nuclear Force. I
- N-^O Scattering Derived from a Realistic N-N Interaction : Complex Reaction Matrix Approach
- Binding Energies of He and H in Reaction Matrix Theory
- Identification of One Glue-Like Mechanism of the Λ-Hyperon in Hypernuclei
- Binding Energies of Double-Λ Hypernuclei and ΛΛ G-Matrix : Nuclear Physics
- Chapter 4 Microscopic Study of Coexistence of Alpha-Cluster and Shell-Model Structure in the ^Ca-^Ti Region
- Admixtures of Shell and Cluster States in ^O
- Structure of ^_∧Ne Hypernucleus : Prediction of the Negative Parity Ground State
- Ground State of ^Li
- Hypernuclear Matter with Nijmegen Baryon-Baryon Interaction : Nuclear Physics
- Reaction Matrix Approach to the Cluster State (Effective Interactions in Nuclear Models and Nuclear Forces)
- Cluster Model Study of Electron Scattering on ^F : Nuclear Physics