Providencia Joao | Departamento De Fisica Universidade De Coimbra
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概要
関連著者
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Providencia Joao
Departamento De Fisica Universidade De Coimbra
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Yamamura Masatoshi
Department Of Pure And Applied Physics Faculty Of Engineering Science Kansai University
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Yamamura Masatoshi
Faculty Of Engineering Kansai University
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YAMAMURA Masatoshi
Faculty of Engineering ,Kansai University
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Kuriyama Atsushi
Faculty Of Engineering Kansai University
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Providencia Constanca
Departamento De Fisica Universidade De Coimbra
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Tsue Yasuhiko
Physics Division Faculty Of Science Kochi University
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Kuriyama A
Faculty Of Engineering Kansai University
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PROVIDENCIA Joao
Departmento de Fisica, Universidade de Coimbra
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TSUE Yasuhiko
Physics Division, Faculty of Science, Kochi University
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Providencia C
Departmento De Fisica Universidade De Coimbra
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Constanca Providencia
Departamento De Fisica Universidade De Coimbra
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PROVIDENCIA Joao
Deparatmento de Fisica, Universidate de Coimbra
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PROVIDENCIA Constanca
Departament de Fisica, Universidade de Coimbra
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PROVIDENCIA Constanca
Departmento de Fisica, Universidade de Coimbra
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YAMAMURA Masatoshi
Faculty of Engineering, Kansai University
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Providencia C
Univ. Coimbra Coimbra Prt
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YAMAMURA Masatoshi
Depertment of Physics, Kyoto University
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PROVIDENCIA Joao
Departamento de Fisica,Universidade de Coimbra
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PROVIDENCIA Joao
Departamento de Fisica, Unversidade de Coimbra
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Tsue Y
Physics Division Faculty Of Science Kochi University
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TSUE Yasuhiko
Departamento de Fisica,Universidade de Coimbra
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TSUE Yasuhiko
Department of Physics, Kyoto University
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KURIYAMA Atsushi
Faculty of Engineering, Kansai University
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Providencia Joao
Departmento De Fisica Universidade De Coimbra
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KURIYAMA Atushi
Faculty of Engineering, Kansai University
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Da Providencia
Departamento De Fisica Centro De Fisica Computacional Faculdade De Ciencias E Tecnologia Universidade De Coimbra
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KURIYAMA Atsushi
Faculty of Engineering, Kansai Universidade
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KURIYAMA Atsushi
Department of Physics, Kyusyu University
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KURIYAMA Atsushi
Department of Physics, Kyushu University /Department of Physics, Kyoto University
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KURIYAMA Atushi
Department of Physics, Kyushu University
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Tsue Yasuhiko
Department 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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YAMAMURA Masatoshi
Department of Physics, Kyoto University : Faculty of Engineering, Kansai University
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PROVIDENCIA Constancia
Departmento de Fisica, Universidade de Coimbra
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PROVIDENCIA Constanca
Dpartamento de Fisica, Universidade de Coimbra
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TSUE Yasuhiro
Department of Physics, Kochi University
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PROVIDENCIA Joao
Departament de Fisica, Universidade de Coimbra
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Yamamura Masatoshi
Department Of Physics Kyoto University
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PROVIDENCIA Joao
Dpartamento de Fisica, Universidade de Coimbra
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PROVIDENCIA Joao
Department of Fisica, Universidade de Coimbra
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PROVIDENCIA Constanga
Departamento de Fisica, Universidade de Coimbra
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Nishiyama Seiya
Physics Division Faculty Of Science Kochi University
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PROVIDENCIA Constanca
Departamento de Fisica, Universidade de Coimbra
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NISHIYAMA Seiya
Physics Division, Faculty of Science, Kochi University
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TSUE Masahiko
Physics Division, Faculty of Science, Kochi University
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Tsue Masahiko
Physics Division Faculty Of Science Kochi University
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PROVIDENCIA Joao
Departamento de Fisica, Universidade de Coimbra
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TSUE Yasuhiko
Department of Material Science, Kochi University
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西山 精哉
Coimbra大
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西山 精哉
Departamento de Fisica, Universidade de Coimbra
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BRAJCZEWSKA Marta
Departamento de Fisica, Universidade de Coimbra
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Brajczewska Marta
Departamento De Fisica Universidade De Coimbra
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AKAIKE Hideaki
Department of Applied Science, Kochi University
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Akaike Hideaki
Physics Division Faculty Of Science Kochi University
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Providencia da
Departamento de Fisica,Unzversidade de Coimbra
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PROVIDENCIA Joaoda
Departamento de Fisica, Universidade de Coimbra
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Providencia Joaoda
Departamento De Fisica Universidade De Coimbra
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TSUE Yasuhiko
Center for Computational Physics, Departamento de Fisica, Universidade de Coimbra
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YAMAMURA Masatoshi
Faculty of Engineering,Kansai University
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PROVIDENCIA Joao
Departamento de Fisica, Universidade da Beira Interior
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AKAIKE Hideaki
Physics Division, Faculty of Science, Kochi University
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TSUE Yasuhiko
Center for Computational Physics, Departamento de Fisica, Universidade de Coimbra:Physics Division, Faculty of Science, Kochi University
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TSUE Yasuhiko
Department of Physics, Kochi University
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TSUE Yasuhiko
Department of Physics,Kochi University
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TSUE Yasuhiko
Physics Division, Faculty of Science, Koch University
著作論文
- First-Order Quark-Hadron Phase-Transition in a NJL-Type Model for Nuclear and Quark Matter : The Case of Symmetric Nuclear Matter(Nuclear Physics)
- Approach to a Fermionic SO(2N+2) Rotator Based on the SO(2N+1) Lie Algebra of the Fermion Operators (arXiv:1010.1642v1)
- The Lipkin Model in Many-Fermion System as an Example of the su(1, 1) ⊗ su(1, 1)-Algebraic Model(Nuclear Physics)
- A Note on the Two-Level Pairing Model Obeying the su (2) ⊗ su (2)-Algebra : Re-formation in Terms of the su (1, 1) ⊗ su (1, 1)-Algebra(Nuclear Physics)
- A New Boson Realization of the Two-Level Pairing Model in a Many-Fermion System and Its Classical Counterpart : The Role of the su (2) ⊗ su (1, 1)-Coherent State in the Schwinger Boson Representation for the su (2) ⊗ su (2)-Algebra(Nuclear P
- Note on Many-Quark Model with su(4) Algebraic Structure(Nuclear Physics)
- On the Exact Eigenstates and the Ground States Based on the Boson Realization for Many-Quark Model with su(4) Algebraic Structure(Nuclear Physics)
- Many-Quark Model with su(4) Algebraic Structure : An Example of Analytically Soluble Many-Fermion System(Nuclear Physics)
- Semi-Classical Approach to the Two-Level Pairing Model : Various Aspects of Phase Change(Nuclear Physics)
- Boson Realization of the su (3)-Algebra. IV : Holstein-Primakoff Representation for the Elliott Model (Nuclear Physics)
- Boson Realization of the su (3)-Algebra. III : Schwinger Representation for the Elliott Model (Nuclear Physics)
- Boson Realization of the su(3)-Algebra. II : Holstein-Primakoff Representation for the Lipkin Model(Nuclear Physics)
- Boson Realization of the su(3)-Algebra. I : Schwinger Representation for the Lipkin Model(Nuclear Physics)
- The Lipkin Model in the su(M+1)-Algebra for Many-Fermion System and Its Counterpart in the Schwinger Boson Representation(Nuclear Physics)
- A Possible Boson Realization of the so(4)-and the so(3, 1)-Algebra : In Relation to the Runge-Lenz-Pauli Vector(Nuclear Physics)
- A Note on the Eigenvalue Problem in the su(1, 1)-Algebra(Nuclear Physics)
- On the Eigenvalue Problem of the su(1,1)-Algebra and the Coupling Scheme of Two su(1,1)-Spins(Nuclear Physics)
- The Heisenberg Antiferromagnet : An Explicitly Rotational Invariant Formulation(Condensed Matter and Statistical Physics)
- On Parametric Resonance in Quantum Many-Body System : Collective Motion and Quantum Fluctuation around It in Coupled Lipkin Model(Nuclear Physics)
- Deformed Boson Scheme Stressing Even-Odd Boson Number Difference. III : Parameter-Dependent Deformation
- Deformed Boson Scheme Stressing Even-Odd Boson Number Difference. II : Unified Forms of Boson-Pair Coherent States in Even- and Odd-Boson Systems(Nuclear Physics)
- A Boson System Interacting with an External Harmonic Oscillator : The su(1,1)-Spin Like Behavior in the su(2)-Spin System : Nuclear Physics
- Imperfect Bose System and Its Mixed State Representation. II : Numerical Analysis with a Short-Range Replusive Force(Nuclear Physics)
- Imperfect Bose System and Its Mixed State Representation. II : Numerical Analysis with a Short-Range Replusive Force
- Deformed Boson Scheme Stressing Even-Odd Boson Number Difference. I : Various Forms of Boson-Pair Coherent State(Nuclear Physics)
- Deformed Boson Scheme Stressing Even-Odd Boson Number Difference. I : Various Forms of Boson-Pair Coherent State
- Note on the Orthogonal Set in Six Kinds of Boson Operators : In Relation to the su(1,1)- and Its Relevant Algebras
- A Possible Form of the Orthogonal Set in Six Kinds of Boson Operators : In Relation to the su(2)- and Its Relevant Algebras
- On the Boson Number Operator in the Deformed Boson Scheme
- The su(1,1)-Algebraic Boson Model in the Deformed Boson Scheme : The Second Holstein-Primakoff Representation as q-Deformed Boson Operator(Nuclear Physics)
- The su (1, 1)-Algebraic Boson Model in the Deformed Boson Scheme : The Second Holstein-Primakoff Representation as q-Deformed Boson Operator
- Note on the Deformed Boson Scheme in Four Kinds of Boson Operators
- Even-Odd Effect on the Thermal Equilibrium State of the Pairing Model. II : Mean Field Approximation and Renormalized Distribution
- Even-Odd Effect on the Thermal Equilibrium State of the Pairing Model. I : Comparison between Canonical and Grand Canonical Ensembles
- Deformed Boson Scheme including Conventional q-Deformation in Time-Dependent Variational Method. IV : The su(2)_q-and the su(1, 1)_q-Algebras in Four Kinds of Boson Operators
- Two Contrastive Boson-Pair Coherent States in Deformed Boson Scheme
- On the Multiboson Coherent State in Deformed Boson Scheme
- Deformed Boson Scheme including Conventional q-Deformation in Time-Dependent Variational Method. III : Deformation of the su(2,1)-Algebra in Terms of Three Kinds of Boson Operators
- Utility of su(1,1)-Algebra in a Schematic Nuclear su(2)-Model
- On the Color-Singlet States in Many-Quark Model with the su(4)-Algebraic Structure. I : Color-Symmetric Form(Nuclear Physics)
- Deformed Boson Scheme including Conventional q-Deformation in Time-Dependent Variational Method.II : Deformation of the su(2)- and the su(1, 1)-Algebras in the Schwinger Boson Representation
- Deformed Boson Scheme including Conventional q-Deformation in Time-Dependent Variational Method.I : The Case of Many-Body Systems Consisting of One Kind of Boson Operator
- A Possible Boson Realization of Generalized Lipkin Model for Many-Fermion System : The su(M+1)-Algebraic Model in Non-Symmetric Boson Representation
- Pairing Model and Mixed State Representation. II : Grand Partition Function and Its Mean Field Approximation
- Pairing Model and Mixed State Representation. I : Thermal Equilibrium State
- Canonical Formulation of Mixed State and Irreducible Representation of u(M) Algebra
- Time-Evolution of the Cohererut and the Squeezed States of Many-Body Systems Based on the Basic Idea of the Boson Mapping and the TDHF Method
- Imperfect Bose System and Its Mixed State Representation. I : Thermal Equilibrium State of Imperfect Bose System
- The Lipkin Model in a New Boson Realization : Basic Idea
- A Possible Description of Many-Body System Composed of Four Kinds of Boson Operators : In Relation to the su(2)- and the su(1,1)-Algebraic Model
- On the Schwinger Boson Representation of an Extended (M+1)(N+1)-Dimensional Algebra Containing the su(M+1)- and the su(N,1)-Algebra
- Description of Mixed States Based on the Time-Dependent Hartree-Fock Theory. I : Formalism of Thermo Field Dynamics in Canonical Theory with Constraints : Nuclear Physics
- Note on the Minimum Weight States in the su(2)-Algebraic Many-Fermion Model : Extension of the Role of the Auxiliary su(2)-Algebra(Nuclear Physics)
- Background of the su(2)-Algebraic Many-Fermion Models in the Boson Realization : Construction of Minimum Weight States by Means of an Auxiliary su(2)-Algebra and Its Related Problems(Nuclear Physics)
- Color-Singlet Three-Quark States in the su(4)-Algebraic Many-Quark Model : An Example of the su(4) ⨂ su(4)-Model(Nuclear Physics)
- Re-Formation of Many-Quark Model with the su(4)-Algebraic Structure in the Schwinger Boson Realization : Reconsideration in the Original Fermion Space(Nuclear Physics)
- Instability of Thermal Equilibrium State of the Lipkin Model : Nuclear Physics
- On the q-Boson Realization of the su_q(2) and su_q(1,1) Algebras : The Marumori-Yamamura-Tokunaga Method : Nuclear Physics
- A Boson System Interacting with an External Harmonic Oscillator : A Possible Description of Statistically Mixed State
- A Possible Description of Many-Body System Composed of Three Kinds of Boson Operators : The su(2,1)-Boson Model : Neuclear Physics
- Modification of the Conventional Holstein-Primakoff Boson Representation for the su(1,1)-Algebra and Its Classical Counterpart
- Three Forms of Boson Expansions for the su(2)-Spin System and Their c-Number Counterparts : Nuclear Physics
- Thermal Effect in the Lipkin Model. III : Dynamical Fluctuation of Thermal Equilibrium State
- Thermal Effect in Lipkin Model. II : Grand Partition Function and Mean Field Approximation
- Thermal Effect in Lipkin Model. I : Thermal Equilibrium State and Phase Transition : Nuclear Physics
- On the Canonical Equivalence of Classical Boson Expansions for Mixed States : Nuclear Physics
- Application of the Canonical Theory of Mixed State to the Description of Bound State of the Nucleus. II : Schematic Model and Physical Ingredients of Constraints : Nuclear Physics
- Description of Mixed States Based on the Time-Dependent Hartree-Fock Theory. III : Random Phase Approximation and Its First Order Corrections : Nuclear Physics
- Application of the Canonical Theory of Mixed State to the Description of Bound States of the Nucleus. I : Reformulation of the Theory of Mixed State : Nuclear Physics
- Two Types of Schrodinger Time Evolution in the Formalism of Thermo Field Dynamics and Their Equivalence to the Liouville-von Neumann Equation
- Effective Potential Approach to Quark Ferromagnetization in High Density Quark Matter(Nuclear Physics)
- On the Color-Singlet States in Many-Quark Model with the su(4)-Algebraic Structure. I : Color-Symmetric Form
- First-Order Quark-Hadron Phase-Transition in a NJL-Type Model for Nuclear and Quark Matter : The Case of Symmetric Nuclear Matter
- A Boson System Interacting with an External Harmonic Oscillator : A Possible Description of Statistically Mixed State
- A Possible Description of Many-Body System Composed of Three Kinds of Boson Operators : The su(2,1)-Boson Model : Neuclear Physics
- A Note on the Eigenvalue Problem in the su(1, 1)-Algebra(Nuclear Physics)