The q-Number Schwinger Term and the Breakdown of the Associative Law for Current Operators
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概要
- 論文の詳細を見る
It is suggested that there cannot exist the q-number Schwinger term which was discussed by Buccella, Veneziano, Gatto and Okubo in order to explain incompatibility of the usual commutation relations of current operators with the Jacobi identity. The incompatibility arises from the fact that current operators do not satisfy the associative law of multiplication. This is because they are not the ordinary linear operators but distribution-valued operators on the Hilbert space.
- 理論物理学刊行会の論文
- 1967-04-25
著者
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Konisi Gaku
Department Of Physics Kwansei Gakuin University
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Yamamoto Kunio
Institute Of Physics College Of General Education Osaka University
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Yamamoto Kunio
Institute Of Physics College Of General Education. Osaka University
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YAMAMOTO Kunio
Institute of Physics, College of General Education. Osaka University
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