Perturbative evaluation of the eigenvalues of the Herbst Hamiltonian
arXiv:hep-ph/9505432 · doi:10.1016/S0370-2693(02)02699-0
Abstract
We reconsider the well-known and long-debated problem of the calculation of the eigenvalues of the Herbst Hamiltonian 2\sqrt{p^2 +m^2} - κ/r. We give a formulation of the problem that allows, for the first time, a perturbative evaluation of the eigenvalues for any n and l, and in principle up to any order in κvia standard Kato perturbation theory. We present the evaluation of the energy of the n=1 and n=2 states up to κ^6, confirming the result previously obtained by Le Yaouanc et al. with a completely different technique. Moreover we give the n=2, l=1 level, which is new. Discussion of the results and comparison with previous findings are given at the end.
14 pages, Eq. (19) and (22) are corrected; as a consequence the result of Eq. (26) has changed at order alpha^6