Abstract
The MIC–Kepler system is studied via the Milshtein and Strakhovenko variant of the so(2,1) Lie algebra. The Green function is constructed in parabolic coordinates, with the help of the Kustaanheimo–Stiefel variables and the generators of the SO(2,1) group. The energy spectrum and the normalized wave functions of the bound states are obtained.
Publisher
Canadian Science Publishing
Subject
General Physics and Astronomy