Poincare Group and the Relativistic Wave Equation of the Extended Particle Model
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概要
- 論文の詳細を見る
The relativistic wave equation of a point-like system with space-like extension is studied. The divergence difficulty of the norm of the wave functions satisfying the constraints is solved by modifying the invariant volume element. We have also shown that the generators of Lorentz transformations are hermitian with respect to the modified norm. It can be explicitly shown that the constraints imposed on physical states suppress the redundant variables. After eliminating the constraints, we obtain Poincare generators written in terms of true dynamical variables. From the procedure of the elimination of the redundant variables, it is obvious that our wave equation with the characteristic constraints is obtained from the canonical representation of Poincare group.
- 理論物理学刊行会の論文
- 1977-12-25
著者
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Goto Tetsuo
Department Of Physics And Atomic Energy Research Institute College Of Science And Engineering Nihon
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Goto Tetsuo
Atomic Energy Research Institute Nihon University
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Goto Tetsuo
Department Of Physics And Atomic Energy Research Institute College Of Science And Technology Nihon U
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Goto Tetsuo
Department Of Physics And Atomic Energy Reseach Institute Collefe Of Science And Engineering Nihon U
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GOTO Tetsuo
Atomic Energy Research Institute College of Science and Technology, Nihon University
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GOTO Tetsuo
Theoretical Physics Institute, Department of Physics University of Alberta
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GOTO Tetsuo
Department of Physics and Atomic Energy Research Institute College of Science and Technology, Nihon University
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