On the structure of hypersurfaces in Hn× R with finite strong total curvature

Abstract

We prove that if X:Mnn× R, n≥ 3, is a an orientable, complete immersion with finite strong total curvature, then X is proper and M is diffeomorphic to a compact manifold M minus a finite number of points q1, … qk. Adding some extra hypothesis, including Hr=0, where Hr is a higher order mean curvature, we obtain more information about the geometry of a neighbourhood of each puncture. The reader will also find in this paper a classification result for the hypersurfaces of Hn× R which satisfy Hr=0 and are invariant by hyperbolic translations and a maximum principle in a half space for these hypersurfaces.