Exact propagating Dirac wave packets in an attractive Coulomb-like potential

Abstract

We construct exact, positive-energy, normalizable wave-packet solutions of the Dirac equation in the axisymmetric potential V=-\,v0/ρ -- to our knowledge, the first such solutions in any external potential. Remarkably, one family comprises only elementary functions whose longitudinal profiles reproduce the free-Schrödinger Hermite--Gauss wave packets in the nonrelativistic limit. All packets share two striking features: (i) a probability density that is pointwise decoupled from spin orientation -- despite the inherent spin-orbit coupling of the Dirac equation -- and (ii) a complete freezing of their time evolution at the critical coupling v0 c/2. We also present a simple scheme that maps solutions of the 2D Helmholtz equation to further exact Dirac wave packets.