A Group Theoretical Structure of the Dual Resonance Model

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概要

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• Using the zeroth-mode oscillator method, we show that the basic operators in the dual resonance model can be written in terms of a non-unitary, local representation of SL(2, R) with reflections. The representation is that of the limit λ→-0, where λ(λ+1) is an eigenvalue of the Casimir operator -T_1^2+T_2^2+T_3^2. The momentum dependence is eliminated from the basic operators, so that the calculation is considerably simplified. Lovelace's simple N-Reggeon vertex is reobtained unambiguously.

• 一般社団法人日本物理学会の論文
• 1971-12-25

著者

• Akama Keiichi

  Institute Of Physics College Of General Education University Of Tokyo

• AKAMA Keiichi

  Institute of Physics, College of General Education University of Tokyo

関連論文

• An Analysis of Scaling in Terms of Parton Density Distributions
• Mean Value Sum Rules and Test of Scale Breaking
• A Group Theoretical Structure of the Dual Resonance Model

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