Approximate Solutions to the Klein-Fock-Gordon Equation for the sum of Coulomb and Ring-Shaped like potentials

Abstract

We consider the quantum mechanical problem of the motion of a spinless charged relativistic particle with massM, described by the Klein-Fock-Gordon equation with equal scalar S(r) and vector V(r) Coulomb plus ring-shaped potentials. It is shown that the system under consideration has both a discrete at |E|<Mc2 and a continuous at |E|>Mc2 energy spectra. We find the analytical expressions for the corresponding complete wave functions. A dynamical symmetry group SU(1,1) for the radial wave equation of motion is constructed. The algebra of generators of this group makes it possible to find energy spectra in a purely algebraic way. It is also shown that relativistic expressions for wave functions, energy spectra and group generators in the limit c ∞ go over into the corresponding expressions for the nonrelativistic problem.