Modification of Coulomb law and energy levels of the hydrogen atom in a superstrong magnetic field

Abstract

We obtain the following analytical formula which describes the dependence of the electric potential of a point-like charge on the distance away from it in the direction of an external magnetic field B: (z) = e/|z| [ 1- exp(-6me2|z|) + exp(-(2/π) e3 B + 6me2 |z|) ]. The deviation from Coulomb's law becomes essential for B > 3π Bcr/α = 3 π me2/e3 ≈ 6 1016 G. In such superstrong fields, electrons are ultra-relativistic except those which occupy the lowest Landau level (LLL) and which have the energy epsilon02 = me2 + pz2. The energy spectrum on which LLL splits in the presence of the atomic nucleus is found analytically. For B > 3 π Bcr/α, it substantially differs from the one obtained without accounting for the modification of the atomic potential.