On the ricci curvature of a compact hypersurface in Euclidean space

We give an estimate for the Ricci curvature of a complete hypersurface M in a hyperbolic space H and in a sphere S under the same condition. As its application, we give the condition for unboundedness of a complete hypersurface M.

Wiener space will be given to study how the signs of their Ricci curvatures varies. As a result, it will be concluded that the Ricci curvature is no longer a geometrical object in contrast with the curvatures of finite dimensional manifolds. 1996 Academic Press, Inc. H Â2], l # B\*, where ( } , } )

We obtain a characterization for a compact and connected hypersurface of R n + 1 to be a sphere in terms of the lower bound on the Ricci curvature.

In this paper we establish a sufficient condition for a compact spacelike hypersurface in de Sitter space to be spherical in terms of a lower bound for the square of its mean curvature. Our result will be a consequence of the maximum principle for the Laplacian operator. We also derive some other ap

The last years many results have been published about the existence of a RIEMANNian metric on a differentiable manifold, with prescribed RICCI tensor. However, if the RIEMANNian manifold (M, (,)) has positive RICCI curvature, then the RICCI tensor defines a new RIEMANNian metric on M, which is denot