2022, Vol.25, No.3, pp.245 - 253

Based on the use of the asymptotics for the wave function of a scattered particle in a Lobachevsky space in a form close to the asymptotics in flat space, general formulas for the theory of quantum mechanical scattering in this space are derived. This approach makes it possible to represent the basic formulas of the theory of scattering in the Lobachevsky space in the form that coincides with the corresponding expressions in three-dimensional Euclidean space. We o.er quantities (length of scattering, effective scattering radius), that are used in describing scattering at short-range potentials and are convenient as phenomenological parameters in describing nuclear interactions at low energies. Numerical estimates of these quantities and cross sections at low energies, that are characteristic of nuclear physics, are given.

Key words: low energy scattering, Lobachevsky space, length of scattering, radius of scattering, scattering cross section

DOI: https://doi.org/10.33581/1561-4085-2022-25-3-245-253

Full text:  Acrobat PDF  (253 KB)  

Copyright © Nonlinear Phenomena in Complex Systems. Last updated: October 20, 2022