On the Essential Spectrum of N-Body Hamiltonians with Asymptotically Homogeneous Interactions

Abstract

We determine the essential spectrum of Hamiltonians with N-body type interactions that have radial limits at infinity. This extends the HVZ-theorem, which treats perturbations of the Laplacian by potentials that tend to zero at infinity. Our proof involves C*-algebra techniques that allows one to treat large classes of operators with local singularities and general behavior at infinity. In our case, the configuration space of the system is a finite dimensional, real vector space X, and we consider the C*-algebra E(X) of functions on X generated by functions of the form vπY, where Y runs over the set of all linear subspaces of X, πY is the projection of X onto the quotient X/Y, and v:X/Y is a continuous function that has uniform radial limits at infinity. The group X acts by translations on E(X), and hence the crossed product E(X) := E(X) X is well defined; the Hamiltonians that are of interest to us are the self-adjoint operators affiliated to it. We determine the characters of E(X). This then allows us to describe the quotient of E(X) with respect to the ideal of compact operators, which in turn gives a formula for the essential spectrum of any self-adjoint operator affiliated to (X).