Finite index operators on surfaces

Abstract

We consider differential operators L acting on functions on a Riemannian surface, , of the form L = + V -a K ,where is the Laplacian of , K is the Gaussian curvature, a is a positive constant and V ∈ C∞(). Such operators L arise as the stability operator of immersed in a Riemannian three-manifold with constant mean curvature (for particular choices of V and a). We assume L is nonpositive acting on functions compactly supported on . If the potential, V:= c + P with c a nonnegative constant, verifies either an integrability condition, i.e. P ∈ L1() and P is non positive, or a decay condition with respect to a point p0 ∈ , i.e. |P(q)|≤ M/d(p0,q) (where d is the distance function in ), we control the topology and conformal type of . Moreover, we establish a Distance Lemma. We apply such results to complete oriented stable H-surfaces immersed in a Killing submersion.