Some results on Chern's problem

Abstract

For a compact minimal hypersurface M in Sn+1 with the squared length of the second fundamental form S we confirm that there exists a positive constant (n) depending only on n, such that if n≤ S≤ n +δ(n), then S n, i.e., M is a Clifford minimal hypersurface, in particular, when n 6, the pinching constant (n)=n23.