Analysis of Schrödinger operators with inverse square potentials I: regularity results in 3D

Abstract

Let V be a potential on 3 that is smooth everywhere except at a discrete set of points, where it has singularities of the form Z/ρ2, with ρ(x) = |x - p| for x close to p and Z continuous on 3 with Z(p) > -1/4 for p ∈ . Also assume that ρ and Z are smooth outside and Z is smooth in polar coordinates around each singular point. We either assume that V is periodic or that the set is finite and V extends to a smooth function on the radial compactification of 3 that is bounded outside a compact set containing . In the periodic case, we let Λ be the periodicity lattice and define := 3/ Λ. We obtain regularity results in weighted Sobolev space for the eigenfunctions of the Schrödinger-type operator H = -Δ+ V acting on L2(), as well as for the induced k--Hamiltonians obtained by restricting the action of H to Bloch waves. Under some additional assumptions, we extend these regularity and solvability results to the non-periodic case. We sketch some applications to approximation of eigenfunctions and eigenvalues that will be studied in more detail in a second paper.