The Tunneling Effect for Schr\"odinger operators on a Vector Bundle

Abstract

In the semiclassical limit h to 0, we analyze a class of self-adjoint Schr\"odinger operators Hh = h2 L + h W + V idE acting on sections of a vector bundle E over an oriented Riemannian manifold M where L is a Laplace type operator, W is an endomorphism field and the potential energy V has non-degenerate minima at a finite number of points m1, ... mr in M, called potential wells. Using quasimodes of WKB-type near mj for eigenfunctions associated with the low lying eigenvalues of Hh, we analyze the tunneling effect, i.e. the splitting between low lying eigenvalues, which e.g. arises in certain symmetric configurations. Technically, we treat the coupling between different potential wells by an interaction matrix and we consider the case of a single minimal geodesic (with respect to the associated Agmon metric) connecting two potential wells and the case of a submanifold of minimal geodesics of dimension l + 1. This dimension l determines the polynomial prefactor for exponentially small eigenvalue splitting.