Hypersurfaces of Constant Higher Order Mean Curvature in M×R

Abstract

We consider hypersurfaces of products M× R with constant r-th mean curvature Hr 0 (to be called Hr-hypersurfaces), where M is an arbitrary Riemannian n-manifold. We develop a general method for constructing them, and employ it to produce many examples for a variety of manifolds M, including all simply connected space forms and the hyperbolic spaces H Fm (rank 1 symmetric spaces of noncompact type). We construct and classify complete rotational Hr( 0)-hypersurfaces in H Fm× R and in Sn× R as well. They include spheres, Delaunay-type annuli and, in the case of H Fm× R, entire graphs. We also construct and classify complete Hr( 0)-hypersurfaces of H Fm× R which are invariant by either parabolic isometries or hyperbolic translations. We establish a Jellett-Liebmann-type theorem by showing that a compact, connected and strictly convex Hr-hypersurface of Hn× R or Sn× R (n 3) is a rotational embedded sphere. Other uniqueness results for complete Hr-hypersurfaces of these ambient spaces are obtained.