Moyal Quantization for Constrained System(Particles and Fields)
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概要
- 論文の詳細を見る
We study Moyal quantization for a constrained system. One of the purposes of this work is to give a proper definition of the Wigner-Weyl (WW) correspondence, which connects the Weyl symbols with the corresponding quantum operators. A Hamiltonian in terms of the Weyl symbols is different from the classical Hamiltonian for a constrained system. This difference is related to the fact that the naively constructed WW correspondence is no longer one-to-one. In the Moyal quantization, the geometrical meaning of the constraints is clear. In the proposal presented here, the second class constraints are incorporated into the definition of the WW correspondence by limiting the phase space to a hypersurface, while we assume canonical commutation relations for the phase space variables. In the case of linear constraints, we confirm that the Moyal brackets between the Weyl symbols yield the same results as those for the constrained system derived using the Dirac bracket formulation.
- 理論物理学刊行会の論文
- 2002-12-25
著者
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MAKI Takuya
Japan Women's College of Physical Education
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KOIKAWA Takao
School of Social Information Studies, Otsuma Women's University
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Koikawa T
Otsuma Women's Univ. Tama Jpn
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Koikawa Takao
School Of Social Information Studies Otsuma Women's University
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Koikawa Takao
Research Institute For Fundamental Physics Kyoto University
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HORI Takayuki
Department of Economics, Teikyo University
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Maki T
Japan Women's College Of Physical Education
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Maki Takuya
Japan Women's College Of Physical Education
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Hori Takayuki
Department Of Economics Teikyo University
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HORI Takayuki
Department of Physics, Tokyo Metropolitan Universty /Department of Physics, Tokyo Metropolitan Universty
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HORI Takayuki
Institute of Physics, Teikyo University
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MAKI Takuya
Department of Physics, Tokyo Metropolitan University
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