The Gauss map on translational Riemannian manifolds and the topology of hypersurfaces

Abstract

We introduce the notion of translational Riemannian manifolds and define a Gauss map for orientable immersed hypersurfaces lying in these ambients, an associated translational curvature and prove a Gauss-Bonnet theorem. We also use this Gauss map to prove that if Mn is a compact, connected and oriented immersed hypersurface of the unit sphere Sn+1 (n≥2) contained in a geodesic ball of radius R and whose principal curvatures are strictly bigger than ( R/2 ), then M is diffeomorphic to Sn. Additionally, we show that for any ∈(0,2-1) there exists a compact, connected and oriented immersed hypersurface M of Sn+1 whose principal curvatures are strictly bigger than ( R/2 ) but M is not homeomorphic to a sphere. Finally, using this previous result, we reobtain a theorem of Qiaoling Wang and Changyu Xia (see [4]) which asserts that if a compact and oriented hypersurface of Sn+1 is contained in an open hemisphere and has nowhere zero Gauss-Kronecker curvature, then it is diffeomorphic to Sn.