Density-Wavefunction Mapping in Degenerate Current-Density-Functional Theory

Abstract

We show that the particle density, (r), and the paramagnetic current density, jp(r), are not sufficient to determine the set of degenerate ground-state wave functions. This is a general feature of degenerate systems where the degenerate states have different angular momenta. We provide a general strategy for constructing Hamiltonians that share the same ground state density, yet differ in degree of degeneracy. We then provide a fully analytical example for a noninteracting system subject to electrostatic potentials and uniform magnetic fields. Moreover, we prove that when (,jp) is ensemble (v,A)-representable by a mixed state formed from r degenerate ground states, then any Hamiltonian H(v',A') that shares this ground state density pair must have at least r degenerate ground states in common with H(v,A). Thus, any set of Hamiltonians that shares a ground-state density pair (,jp) by necessity has at least have one joint ground state.