A regularity result for the bound states of N-body Schr\"odinger operators: Blow-ups and Lie manifolds

Abstract

We prove regularity estimates in weighted Sobolev spaces for the L2-eigenfunctions of Schr\"odinger type operators whose potentials have inverse square singularities and uniform radial limits at infinity. In particular, the usual N-body Hamiltonians with Coulomb-type singular potentials are covered by our result: in that case, the weight is δF(x) := \ d(x, F), 1\, where d(x, F) is the usual euclidean distance to the union of the set of collision planes . The proof is based on blow-ups of manifolds with corners and Lie manifolds. More precisely, we start with the radial compactification X of the underlying space X and we first blow-up the spheres SY ⊂ SX at infinity of the collision planes Y ∈ to obtain the Georgescu-Vasy compactification. Then we blow-up the collision planes . We carefully investigate how the Lie manifold structure and the associated data (metric, Sobolev spaces, differential operators) change with each blow-up. Our method applies also to higher order differential operators, to certain classes of pseudodifferential operators, and to matrices of scalar operators.