Lower bound of Schr\"odinger operators on Riemannian manifolds

Abstract

We show that a weighted manifold which admits a relative Faber Krahn inequality admits the Fefferman Phong inequality V , CV 2 , with the constant depending on a Morrey norm of V , and we deduce from it a condition for a L 2 Hardy inequality to holds, as well as conditions for Schr\"odinger operators to be positive. We also obtain an estimate on the bottom of the spectrum for Schr\"odinger operators.