Relativistic Path Integrals
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概要
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An elementary theory of relativistic path integrals is developed in the Lorentz-space, A path integral for a Dirac electron is formulated, in which the perturbation expansion is shown to give just the same rules as those given in the more usual formulation of field theory. A geometrical feature of path integrals is investigated by using Weyl's theory of phase connection and the interaction with the Yang-Mills field is introduced in this way into path integrals. The use of the proper-time in relativistic path integrals is discussed by using the method of the Lagrange multiplier. Path integrals in curvilinear coordinates are investigated as an example of applications of these studies.
- 理論物理学刊行会の論文
- 1979-05-25
著者
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Miura Takashi
Faculty Of Technology Kanagawa University
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MIURA Takashi
Department of Physics, Faculty of engineering Kanagawa University
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MIURA Takashi
Faculty of Technology, Kanagawa University
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MIURA Takahiro
Department of Physics, Osaka University
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