Geometrical Corrections to the Glauber Multiple-Scattering Theory
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概要
- 論文の詳細を見る
If used without any small-angle approximations, the multiplicativity of the S matrix is pointed out to provide a geometrical generalization of the additivity of the phase shift which is usually written in the impact-parameter representation. On the basis of this multiplicative law a multiple-scattering formalism is developed which is a direct geometrical generalization of the ordinary Glauber formalism. With the use of the generalized theory geometrical corrections to the Glauber theory are evaluated for two examples, double scattering of ∿10 GeV/c protons and pions by deuterons and elastic scattering of 1 GeV protons by ^4He. It is emphasized that the calculation by the generalized theory is of much significance especially when done in parallel with the ordinary theory.
- 理論物理学刊行会の論文
- 1974-07-25
著者
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Obu Mitsuaki
Department Of Physics And Atomic Energy Research Institute College Of Science And Engineering Nihon
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OBU Mitsuaki
Department of Physics and Atomic Energy Research Institute, College of Science and Engineering, Nihon University
関連論文
- Generalized Eikonal Approximation and Multiple-Scattering Formalism at High Energies
- Kohn-Hulthen Variational Method for Bound-State Problems
- Comments on the Ordering Problem in the Application of the Glauber Multiple-Scattering Theory
- Linked Cluster Decomposition of an S Matrix : Generalization of the Eikonal Approximation
- Geometrical Corrections to the Glauber Multiple-Scattering Theory
- Multiple Scattering from Overlapping Potentials : The Effective Propagator Approximation