A comparison of the Georgescu and Vasy spaces associated to the N-body problems and applications

Abstract

We provide new insight into the analysis of N-body problems by studying a compactification MN of R3N that is compatible with the analytic properties of the N-body Hamiltonian HN. We show that our compactification coincides with the compactification introduced by Vasy using blow-ups in order to study the scattering theory of N-body Hamiltonians and with a compactification introduced by Georgescu using C*-algebras. In particular, the compactifications introduced by Georgescu and by Vasy coincide (up to a homeomorphism that is the identity on R3N). Our result has applications to the spectral theory of N-body problems and to some related approximation properties. For instance, results about the essential spectrum, the resolvents, and the scattering matrices of HN (when they exist) may be related to the behavior near MN R3N (i.e. "at infinity") of their distribution kernels, which can be efficiently studied using our methods. The compactification MN is compatible with the action of the permutation group SN, which allows to implement bosonic and fermionic (anti-)symmetry relations. We also indicate how our results lead to a regularity result for the eigenfunctions of HN.