Rising Regge Trajectories and Finite Energy Sum Rules
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概要
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It is shown in the narrow-resonance approximation that in order to satisfy the finite energy sum rules (FESR), all Regge trajectories except for the Pomeranchukon must be accompanied by an infinite number of daughter trajectories, which are asymptotically parallel to the leading ones. In the presence of an infinite number of daughter trajectories, the narrow-resonance saturation of the FESR cannot give effective constraints on the asymptotic energy-dependence of the trajectory functions, without aid of additional assumptions on the Regge parameters.
- 理論物理学刊行会の論文
- 1970-01-25
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関連論文
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