On type number of real hypersurfaces in \(P_ n(C)\) (Q1177318)

The type number \(t\) of a real hypersurface \(M\) in \({\mathbb{P}}^ n({\mathbb{C}})\) is the rank of the second fundamental form of \(M\). The author proves that if \(M\) is complete and \(n\geq3\) there exists a point \(p\in M\) such that \(t(p)\geq3\).