Finite Index and Do Carmo Question for Constant Mean Curvature Hypersurfaces

Abstract

We prove that any finite δ-index hypersurface M in Rn+1 with constant mean curvature must be minimal, provided either of the following conditions holds: - the volume growth of M is sub-exponential; - the Ricci curvature of M satisfies RicM≥ -3(1-δ)n-1|A|2g, where A is the second fundamental form and g is the metric on M. In the second case, our result further implies that, in addition to being minimal, such an M must be a hyperplane. We emphasize that no restriction on the dimension is imposed. Moreover, the statement in the second case is new even for finite index hypersurfaces (δ=0).