A characterization of quadric constant mean curvature hypersurfaces of spheres

Abstract

Let φ:Mn+1⊂Rn+2 be an immersion of a complete n-dimensional oriented manifold. For any v∈Rn+2, let us denote by v:M the function given by v(x)=φ(x),v and by fv:M, the function given by fv(x)=(x),v, where :Mn is a Gauss map. We will prove that if M has constant mean curvature, and, for some v 0 and some real number λ, we have that v=λ fv, then, φ(M) is either a totally umbilical sphere or a Clifford hypersurface. As an application, we will use this result to prove that the weak stability index of any compact constant mean curvature hypersurface Mn in Sn+1 which is neither totally umbilical nor a Clifford hypersurface and has constant scalar curvature is greater than or equal to 2n+4.