NISHIYAMA Seiya | Research Institute for Fundamental Physics, Kyoto University:Department of Physics, Kochi University
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概要
- 同名の論文著者
- Research Institute for Fundamental Physics, Kyoto University:Department of Physics, Kochi Universityの論文著者
関連著者
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NISHIYAMA Seiya
Department of Physics,Kochi University
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NISHIYAMA Seiya
Research Institute for Fundamental Physics, Kyoto University:Department of Physics, Kochi University
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Nishiyama Seiya
Department Of Physics Faculty Of Science Kochi University
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FUKUTOME Hideo
Department of Physics, Kyoto University
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Fukutome Hideo
Department Of Physics Faculty Of Science Kyoto University
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Nishiyama Seiya
Department of Physics, Faculty of Science, Kochi University
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Yamamura Masatoshi
Department Of Physics Kyoto University
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FUKUTOME Hideo
Department of Physics, Faculty of Science, Kyoto University
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Nishiyama Seiya
Depertment Of Physics Kochi University
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MIZOBUCHI Yutaka
Research Division, Hamamatsu Phtonics
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Yamamura Masatoshi
Depertment Of Physics Kyoto University
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MIZOBUCHI Yutaka
Depertment of Physics, Kyoto University
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Mizobuchi Yutaka
Depertment Of Physics Kyoto University
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Yamamura Msatoshi
Department Of Physics Kyoto University
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MIZOBUCHI Yutaka
Department of Physics, Kyoto University
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Mizobuchi Yutaka
Department Of Physics Kyoto University
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Iwasaki Masaharu
Department Of Applied Mathematics Faculty Of Engineering Science Osaka University
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FUKUTOME Hideo
Department of Physics, Kyoto Unversity
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FUKUTOME Hideo
Deoartment of Physics, Kyoto University
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YAMAMURA Masatoshi
Department of Pure and Applied Physics, Faculty of Engineering Science, Kansai University
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IWASAKI Masaharu
Department of Physics, Kochi University
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Iwasaki Masaharu
Department Of Material Science Kochi University
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Fukutome Hideo
Department Of Physics Kyoto University
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YAMAMURA Msatoshi
Department of Physics, Kyoto University
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Nishiyama S
Department Of Physics Kochi University
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Nishiyama Seiya
Department Of Physics Kochi University
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Nishiyama Seiya
Department Of Physics Kyoto University
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Nishiyama Seiya
Research Institute For Fundamental Physics Kyoto University:department Of Physics Kochi University
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WAKIMARU Kyoichi
Department of Physics, Kochi University
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YAMAMURA Masatoshi
Depertment of Physics, Kyoto University
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YAMAMURA Masatoshi
Department of Physics,Kyoto University
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NISHIYAMA Seiya
Department of Physics, Kochi University
著作論文
- Application of the Improper Hartree-Bogoliubov Formalism to the Schematic Model of Odd Nuclei
- A Variational Foundation of the Improper Hartree-Bogoliubov Formalism
- A New Fermion Many-Body Theory Based on the SO(2N+1) Lie Algebra of the Fermion Operators
- Resonating Hartree-Bogoliubov Theory for a Superconducting Fermion System with Large Quantum Fluctuations : Condensed Matter and Statistical Physics
- Time Dependent SO(2N+1) Theory for Unified Description of Bose and Fermi Type Collective Excitations : Nuclear Physics
- Resonating Random Phase Approximation for Excitations in a Superconducting Fermion System with Large Quantum Fluctuations : Condensed Matter and Statistical Physics
- On the Applicability of Generalized Schwinger Representation of the Fermion Pairs to the Anharmonicity. II
- In the Applicability of Generalized Schwinger Representation of the Fermion Pairs to the Anharmonicity. I
- A Note on Pairing Vibration in the Closed Shell Nuclei
- Derivation of Random Phase Approximation on the Basis of the Generalized Schwinger Representation of the Fermion-Pairs
- An a priori Quantized Time-Dependent Hartree-Bogoliubov Theory : A Generalization of the Schwinger Representation of Quasi-Spin to the Fermion-Pair Algebra
- A Jacobi Equation on the Coset Manifold SO(2N)/U(N) and the Quasi-Particle RPA Equation
- On the Exact Canonical Conjugate Momenta in the Quadrupole Type Nuclear Collective Motion
- On an Algebraic Foundation of Kinematical Constraints of Pair Operators in a Many-Nucleon System
- An Application of the Glauber Approximation to High Energy Heavy-Ion Collisions. I : Theoretical Formulation
- Remarks on a Relation between BZ Boson Expansion and Algebraic Recursion Formuals Constructed in so(2n)
- An Equation for the Quasi-Particle RPA Based on the SO(2N+1) Lie Algebra of the Fermion Operators