A Colding-Minicozzi Stability inequality and its applications

Abstract

We consider operators L acting on functions on a Riemannian surface, , of the form L = + V +a K. Here is the Laplacian of , V a non-negative potential on , K the Gaussian curvature and a is a non-negative constant. Such operators L arise as the stability operator of immersed in a Riemannian 3-manifold with constant mean curvature (for particular choices of V and a). We assume L is nonpositive acting on functions compactly supported on and we obtain results in the spirit of some theorems of Ficher-Colbrie-Schoen, Colding-Minicozzi, and Castillon. We extend these theorems to a ≤ 1/4. We obtain results on the conformal type of and a distance (to the boundary) lemma.