Induced Gauge Structure of Quantum Mechanics on S^D : Particles and Fields
スポンサーリンク
概要
- 論文の詳細を見る
The Ohnuki-Kitakado (O-K) scheme of quantum mechanics on S^D embedded in R^<D+1> is investigated. Generators satisfying the O-K algebra are written down explicitly in term of the induced gauge potential. a direct method is developed to obtain the generators in covariant form. It is seen that there exists an induced gauge configuration which is trivial on S^D but might cause a nontrivial physical effect in R^<D+1>. The relation of the O-K scheme to extended objects such as the 't Hooft-Polyakov monopole is discussed.
- 理論物理学刊行会の論文
- 1997-04-25
著者
-
HAMADA Takeshi
Department of Physics, Kanazawa University
-
Zhang Hui-min
Department Of Dermatology Nagasaki University School Of Medicine
-
Zhang Hui-min
Department Of Physics Toyama University
-
Hirayama Minoru
Department Of Physics Faculty Of Literature And Science Toyama University
-
Hamada Takeshi
Department Of Physics Kanazawa University
-
Hirayama Minoru
Department Of Internal Medicine Yokosuka Kyosai Hospital
-
Zhang Hui-Min
Laboratory for Plasma Astrophysics and Fusion Science, Faculty of Engineering, Toyama University
-
HAMADA Takeshi
Department of Physics,Kanazawa University
関連論文
- Vanishing Theorems for Hannay Angle and Berry Phase : General and Mathematical Physics
- Malignant Lymphoma Involving the Penis Following Malignant Pleural Mesothelioma
- Renormalization Group Sum Rules for Deep Inelastic Structure Functions
- Faddeev模型とSkyrme模型の厳密平面波解(場の量子論の基礎的諸問題と応用,研究会報告)
- Distance Formula for Grassmann Manifold : Applied to Anandan-Aharonov Type Uncertainty Relation
- Riemannian Structure Induced by Parameter-Dependent Quantum State Vectors : Particles and Fields
- Gauge Field Theory of the Quantum Group SU_q(2) : Particles and Fields
- Applications of Artificial Wind Numerical Scheme for Relativistic Hydrodynamics in Astrophysics
- Two-Dimensional Simulations of Relativistic Jet-Cloud Collisions
- Two-Dimensional Simulations of Relativistic Extragalactic Jets Crossing an ISM/ICM Interface
- Consistency Conditions of the Faddeev-Niemi-Periwal Ansatz for the SU(N) Gauge Field : Particles and Fields
- Non-Abelian Stokes Theorem for Loop Variables Associated with Nontrivial Loops : Particles and Fields
- Estimation of the Lin-Yang Bound of the Least Static Energy of the Faddeev Model(Condensed Matter and Statistical Physics)
- Oscillator Representations of the Lie Algebra su(1,1) and the Quantum Algebra su_q(1,1) : General and Mathematical Physics
- Structure Function for Parton-Proton Scattering
- Affinity-purified Dermatophagoides farinae antigen induces CD23 on T and B lymphocytes and monocytes specifically in patients with atopic dermatitis
- Phase Operator Associated with the Radiation Field : General and Mathematical Physics
- Stokes Theorem for Loop Variables of Non-Abelian Gauge Field
- The Light Cone and the Elastic Scattering Amplitude
- X-η Mixing and B_8 Mass Splittings
- Bjorken Limit of Bincer's Form Factor and the Renormalization Constant of the Proton
- Non-Constant Stable Solutions of the Ginzburg-Landau Equation in Finite Domains : Progress Letters
- Non-Abelian Gauge Configuration with a Magnetic Field Concentrated at a Point
- Induced Gauge Structure of Quantum Mechanics on S^D : Particles and Fields
- Effective Compton Cross Sections in a Hot Plasma
- Non-Abelian Stokes Theorem for Wilson Loops Associated with General Gauge Groups
- Compositeness Condition for Particles with Identical Quantum Numbers
- On the Renormalization Group equations of Quantum Electrodynamics
- Fermion Representation of Quantum Group : Particles and Fields
- SO(2, 1) Structure of the Generalized Harmonic Oscillator : General and Mathematical Physics
- Fermion Fractionization and Index Theorem
- Singular Renormalization Group Equations
- Non-Abelian Stokes Theorem for Loop Variables Associated with Nontrivial Loops : Particles and Fields
- Wave Function of Anyon Systems
- Supersymmetric Quantum Mechanics and Index Theorem
- Fermion Mass Implied by Maskawa-Nakajima Equation
- Mass Variation of a Composite Particle versus That of Its Constituent