Breaking so(4) symmetry without degeneracy lift

Abstract

We argue that in the quantum motion of a scalar particle of mass "m" on S3R perturbed by the trigonometric Scarf potential (Scarf I) with one internal quantized dimensionless parameter, , the 3D orbital angular momentum, and another, an external scale introducing continuous parameter, B, a loss of the geometric hyper-spherical so(4) symmetry of the free motion can occur that leaves intact the unperturbed N2-fold degeneracy patterns, with N=( +n+1) and n denoting the nodes number of the wave function. Our point is that although the number of degenerate states for any N matches dimensionality of an irreducible so(4) representation space, the corresponding set of wave functions do not transform irreducibly under any so(4). Indeed, in expanding the Scarf I wave functions in the basis of properly identified so(4) representation functions, we find power series in the perturbation parameter, B, where 4D angular momenta K∈ [ , N-1] contribute up to the order (2mR2B2) N-1-K. In this fashion, we work out an explicit example on a symmetry breakdown by external scales that retains the degeneracy. The scheme extends to so(d+2) for any d.