Comparison theorems for the Dirac equation with spin-symmetric and pseudo-spin-symmetric interactions

Abstract

A single Dirac particle is bound in d dimensions by vector V(r) and scalar S(r) central potentials. The spin-symmetric S=V and pseudo-spin-symmetric S = - V cases are studied and it is shown that if two such potentials are ordered V(1) V(2), then corresponding discrete eigenvalues are all similarly ordered E (1) E (2). This comparison theorem allows us to use envelope theory to generate spectral approximations with the aid of known exact solutions, such as those for Coulombic, harmonic-oscillator, and Kratzer potentials. The example of the log potential V(r) = v(r) is presented. Since V(r) is a convex transformation of the soluble Coulomb potential, this leads to a compact analytical formula for lower-bounds to the discrete spectrum. The resulting ground-state lower-bound curve EL(v) is compared with an accurate graph found by direct numerical integration.