Shnol-type theorem for the Agmon ground state

Abstract

Let H be a Schr\"odinger operator defined on a noncompact Riemannian manifold , and let W∈ L∞(;R). Suppose that the operator H+W is critical in , and let be the corresponding Agmon ground state. We prove that if u is a generalized eigenfunction of H satisfying |u|≤ in , then the corresponding eigenvalue is in the spectrum of H. The conclusion also holds true if for some K the operator H admits a positive solution in = K, and |u|≤ in , where is a positive solution of minimal growth in a neighborhood of infinity in . Under natural assumptions, this result holds true also in the context of infinite graphs, and Dirichlet forms.