Point interactions for 3D sub-Laplacians

Abstract

In this paper we show that, for a sub-Laplacian on a 3-dimensional manifold M, no point interaction centered at a point q0∈ M exists. When M is complete w.r.t. the associated sub-Riemannian structure, this means that acting on C∞0(M\q0\) is essentially self-adjoint. A particular example is the standard sub-Laplacian on the Heisenberg group. This is in stark contrast with what happens in a Riemannian manifold N, whose associated Laplace-Beltrami operator is never essentially self-adjoint on C∞0(N\q0\), if N 3. We then apply this result to the Schr\"odinger evolution of a thin molecule, i.e., with a vanishing moment of inertia, rotating around its center of mass.