Regularity for eigenfunctions of Schrödinger operators

Abstract

We prove a regularity result in weighted Sobolev spaces (or Babuska--Kondratiev spaces) for the eigenfunctions of a Schrödinger operator. More precisely, let Kam(R3N) be the weighted Sobolev space obtained by blowing up the set of singular points of the Coulomb type potential V(x) = Σ1 j N bj|xj| + Σ1 i < j N cij|xi-xj|, x in R3N, bj, cij in R. If u in L2(R3N) satisfies (-Δ+ V) u = λu in distribution sense, then u belongs to Kam for all m ∈ Z+ and all a 0. Our result extends to the case when bj and cij are suitable bounded functions on the blown-up space. In the single-electron, multi-nuclei case, we obtain the same result for all a<3/2.