Finite Field Theory in Solvable Models
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概要
- 論文の詳細を見る
- 理論物理学刊行会の論文
- 1971-11-25
著者
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Yamamoto Kunio
Institute Of Physics College Of General Education Osaka University
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Kikuchi Kozo
Department Of Physics Osaka University
関連論文
- Gauge-Independent Calculation of S-Matrix Elements in Quantum Electrodynamics
- Finite and Covariant Formulation of Local Field Theory Based on Improved Operator Products
- Inevitable Surface Dependence of Some Operator Products and Integrability
- Integrability and Definition of Current in the Thirring Model
- Boson Field Description of Fermions in Two Dimensions
- Absence of Phase Transition in the Goldstone Model : Progress Letters
- M(12) and Meson-Baryon Inelastic Two-Body Scattering at High Energy
- Sum Rules for Magnetic Moments of Spin 1 and 3/2 Nuclei
- Electromagnetic Mass Shifts by Dispersion Theory
- A Self-Consistent Formulation of Local Field Theory. I
- Transformation Properties of Operators in Local Field Theory
- Finite Field Theory in Solvable Models
- The q-Number Schwinger Term and the Breakdown of the Associative Law for Current Operators
- A Self-Consistent Formulation of Local Field Theory. II
- Sum Rule for the Magnetic Moment of the Dirac Particle
- M(12) and Vector-Meson Production at High Energy
- Mass and Width of Δ(1236)
- Lorentz Invariance and Finite Self-Mass in Local Field Theory
- Integrability and Regularization in Local Field Theory
- Covariant Axial-Vector Current and Its Divergence Equation
- Shrinkage of Effective Core and Large Angle Scattering at High Energy
- Breakdown of the Associative Law for Current Operators in a Model in Two-Dimensional Space-Time
- Problem of Lorentz Invariance in Local Field Theory
- Divergence Difficulties in Local Field Theory
- Validity of Sum Rules and High Energy Theorems by Current Algebra
- A Finite Local Field Theory
- Lorentz Invariance and Normal Product
- Lorentz Invariance and Normal Product in an Interacting System
- Nonperturbation Approach to Decay Problems
- Sum Rule for the Magnetic Moment of Arbitrary Spin Particle and Simple Application to Nucleus