Parabolic stable surfaces with constant mean curvature

Abstract

We prove that if u is a bounded smooth function in the kernel of a nonnegative Schrodinger operator -L=-( +q) on a parabolic Riemannian manifold M, then u is either identically zero or it has no zeros on M, and the linear space of such functions is 1-dimensional. We obtain consequences for orientable, complete stable surfaces with constant mean curvature H∈R in homogeneous spaces E(,τ) with four dimensional isometry group. For instance, if M is an orientable, parabolic, complete immersed surface with constant mean curvature H in H2×R, then |H|≤ 1/2 and if equality holds, then M is either an entire graph or a vertical horocylinder.