On Stable Hypersurfaces with Vanishing Scalar Curvature

Abstract

We will prove that there are no stable complete hypersurfaces of R4 with zero scalar curvature, polynomial volume growth and such that (-K)H3≥ c>0 everywhere, for some constant c>0, where K denotes the Gauss-Kronecker curvature and H denotes the mean curvature of the immersion. Our second result is the Bernstein type one there is no entire graphs of R4 with zero scalar curvature such that (-K)H3≥ c>0 everywhere. At last, it will be proved that, if there exists a stable hypersurface with zero scalar curvature and (-K)H3≥ c>0 everywhere, that is, with volume growth greater than polynomial, then its tubular neighborhood is not embedded for suitable radius.