Hopf potentials for the Schr\"odinger operator

Abstract

We establish the Hopf boundary point lemma for the Schr\"odinger operator - + V involving potentials V that merely belong to the space L1loc(). More precisely, we prove that among all supersolutions u of - + V which vanish on the boundary ∂ and are such that V u ∈ L1(), if there exists one supersolution which satisfies ∂ u/∂ n < 0 almost everywhere on ∂ with respect to the outward unit vector n, then such a property holds for every nontrivial supersolution in the same class. We rely on the existence of nontrivial solutions of the nonhomogeneous Dirichlet problem with boundary datum in L∞(∂).