NAKANISHI Noboru | Research Institute for Mathematical Sciences Kyoto University
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概要
関連著者
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NAKANISHI Noboru
Research Institute for Mathematical Sciences Kyoto University
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Nakanishi Noboru
Reseach Institure For Mathematical Sciences Kyoto University
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ABE Mitsuo
Research Institute for Mathematical Sciences, Kyoto University
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Abe Mitsuo
Research Institute For Mathematical Sciences Kyoto University
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Noboru NAKANlSHI
Research Institute for Mathematical Sciences, Kyoto University
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中西 襄
京都大学数理解析研究所
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阿部 光雄
京都大学数理解析研究所
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中西 襄
京都大学名誉教授
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Seto Kenji
Department De Physique Faculte Des Sciences Universityersite De Hokkaido
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Seto Kenji
Department Of Physics Gakushuin University
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OJIMA Izumi
Research Institute for Mathematical Sciences Kyoto University
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Ojima Izumi
Research Institue For Mathematical Science Kyoto University
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Nakanishi N
Kyoto Univ. Kyoto Jpn
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ICHINOSE Shoichi
Research Institute for Mathematical Sciences Kyoto University
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OJIMA Izumi
Max-Planck-Institut for Physik und Astrophysik, Munchen Research Institute for Mathematical Sciences, Kyoto University
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OJIMA Izumi
Research Institute for Mathematical Science, Kyoto University
著作論文
- Subtlety in the Anomaly Calculation of String Theory in the Harmonic Gauge : Particles and fields
- A Simple Example of BRS Singlet Pair
- Operator-Formalism Approach to Two-Dimensional Quantum Gravity in the Lightcone Gauge : Particles and Fields
- New Diagrammatic Method for Quantum Field Theory in the Heisenberg Picture. III : Its Proof in Two-Dimensional Quantum Gravity : Particles and Fields
- How to Solve the Covariant Operator Formalism of Gauge Theories and Quantum Gravity in the Heisenberg Picture. IV : Cauchy Problem Involving Noncommutative Quantities : Particles and Fields
- Kerr Metric, de Donder Condition and Gravitational Energy Density
- New Diagrammatic Method for Quantum Field Theory in the Heisenberg Picture. I : Two-Dimensional Quantum Gravity : Particles and Fields
- Wightman Functions in Covariant Operator Formalism of Two-Dimensional Quantum Gravity : Particles and Fields
- How to Solve the Covariant Operator Formalism of Gauge Theories and Quantum Gravity in the Heisenberg Picture. II : Generally Covariantized Liouville-Like Theory : Particles and Fields
- How to Solve the Covariant Operator Formalism of Gauge Theories and Quantum Gravity in the Heisenberg Picture. III : Two-Dimensional Nonabelian BF Theory : Particles and Fields
- Indefinite-Metric Quantum Field Theory of General Relativity.XX : Superalgebra Unifying Quantum Gravity and Quantum Yang-Mills Field in the Suzuki Gauge : Particles and Fields
- Supersymmetric Extension of the Three-Dimensional Local Lorentz Symmetry and the Chern-Simons Term : Particles and Fields
- Zweibein Operator Formalism of Two-Dimensional Quantum Gravity : Particles and Fields
- How to Solve the Covariant Operator Formalism of Gauge Theories and Quantum Gravity in the Heisenberg Picture. I : Quantum Electrodynamics : Particles and Fields
- Wightman Functions in Covariant Operator Formalism of Two-Dimensional Quantum Gravity. II Composite Fields : Particles and Fields
- Indefinite-Metric Quantum Field Theory of General Relativity. XII : Extended Superalgebra and Its Spontaneous Breakdown
- BRS Transformation as a Nonlinear Realization of the BRS Algebra and Its Extended One : Particles and Fields
- New Diagrammatic Method for Quantum Field Theory in the Heisenberg Picture. II : Various Models : Particles and Fields
- How to Solve the Operator Formalism of Quantum Einstein Gravity without Using C-Number Background Metric : Particles and Fields
- Covariant Operator Formalism of Quantum Einstein Gravity : Brief Review and Recent Development
- Remarks on the Infinite-Component Solutions to the Bethe-Salpeter Equation
- De Donder Condition and the Gravitational Energy-Momentum Pseudotensor in General Relativity : Astrophysics and Relativity
- Indefinite-Metric Quantum Field Theory of General Relativity. III : Poincare Generators
- Operator Solutions in Terms of Asymptotic Fields in the Thirring and Schwinger Models. II
- Asymptotic Completeness and Confinement in the Massive Schwinger Model