Quantum Theory of Generalized Gauge Field
スポンサーリンク
概要
- 論文の詳細を見る
A canonical quantum theory of a system which is invariant under the generalized gauge group is investigated by following the approach of Rosenfeld. The Lorentz condition is introduced in order to make the whole Set of equations invariant under Lorentz transformations. The requirement of the gauge invariance of the Lorentz condition itselt leads to the necessity of q-number gauge. A brief discussion is made about the interaction representation of this system.
- 理論物理学刊行会の論文
著者
-
Goto Tetsuo
Department Of Physics Nihon University
-
Goto Tetsuo
Department Of Physics And Atomic Energy Research Institute College Of Science And Engineering Nihon
-
Utiyama Ryoyu
Department Of Physics Osaka University
-
Goto Tetsuo
Department Of Physics And Atomic Energy Reseach Institute Collefe Of Science And Engineering Nihon U
-
Utiyama Ryoyu
Department Of Physics Osaka Imperial University.
-
GOTO Tetsuo
Department of Physics, Nihon University
関連論文
- Canonical Quantization of Non-Abelian Gauge Fields : Lorentz and Gauge Invariances
- Canonical Quantization of Non-Abelian Gauge Fields
- C, P and T in c-Number Infinite Component Wave Function
- On the Vertex Function in the Bi-Local Field
- An Operator Formalism to the Path Integral Method
- Infinite Component Wave Equation and Scattering Amplitude
- Gravitational Field as a Generalized Gauge Field
- Note on the Longitudinal and Scalar Photons
- Deformable Sphere Model of Hadrons
- Proton-Proton Scattering in the Gev Region : Criticism of the Blockhintsev-Bubelev Model
- Quantum Theory of Generalized Gauge Field
- Deformable Sphere Model of Elementary Particles and the Origin of Internal Symmetries
- Deformable Sphere Model of Elementary Particles and Its Relation to Quark
- A Quantum Theory of the Rigid Body in Terms of a Two-Component Spinor
- Infinite Component Wave Function and Scattering Amplitude. II
- Note on the Non-Perturbation-Approach to Quantum Field Theory
- On the Longitudinal and Scalar Photons in Lorentz Gauge and Lorentz Condition
- Poincare Group and the Relativistic Wave Equation of the Extended Particle Model
- The Degenerate Vacuum and the Infinite Component Wave Equation
- Generalization of the Stueckelberg Formalism to the Massive Yang-Mills Field
- On the Unstable States in Quantum Field Theory
- Particle-Hole Bound States in the Many Fermion System
- Elastic Sphere Model of Elementary Particles and Its Relation to the Quadri-Local Field Model
- The Canonical Quantization of the Free Electromagnetic Field in the Landau Gauge
- On the Separation of Redundant Variables in the Quantum Theory of the Yang-Mills Field
- Rigid Sphere Model of Elementary Particles and the Electromagnetic Field
- Quantum Field Theory of Unstable Particles
- On a Classical Spinning Particle Model of Dirac Particle
- The Interaction of the Bi-Local Field with the External Field
- Extended Particle Model of Elementary Particles
- On the Interaction of Extended Particles : Formulation of Breaking and Connection of Strings
- Theory of Invariant Variation and the Generalized Canonical Dynamics
- Generalized Iso-Spin-Space; Generalized Gauge Transformation and Derivation of Meson
- The New Wave Equation of the Bi-Local Field and Its Mechanical Model
- Relativistic Quantum Mechanics of One-Dimensional Mechanical Continuum and Subsidiary Condition of Dual Resonance Model
- On Collective Motion of Rotational Invariant System Composed of N-Particles
- Quantum Field Confined to a Finite Domain as a Model of Hadrons: Case of a Spherical and Rigid Domain
- On the Classical Theory of the Electron, I.
- Introduction
- General Relativistic Aspect of the Quantum Field Theory
- Canonical Theory of Quantum Electrodynamics
- On the Classical Theory of the Electron. II.
- Conserving Vector Current and Non-Linear Gauge Field
- On Weyl's Gauge Field. II
- On the Canonical Transformation in Quantum Theory.
- On Weyl's Gauge Field
- On the Interaction of Mesons with the Gravitational Field.I.
- On the Covergence of the Perturbation Method in the Quantum Field Theory
- On the Interaction of Mesons with the Gravitational Field. (II).
- Bose Quarks and Non-Leptonic Weak Interactions
- Quantum Theory and General Relativity