The second pinching theorem for hypersurfaces with constant mean curvature in a sphere

Abstract

We generalize the second pinching theorem for minimal hypersurfaces in a sphere due to Peng-Terng, Wei-Xu, Zhang, and Ding-Xin to the case of hypersurfaces with small constant mean curvature. Let Mn be a compact hypersurface with constant mean curvature H in Sn+1. Denote by S the squared norm of the second fundamental form of M. We prove that there exist two positive constants γ(n) and δ(n) depending only on n such that if |H|≤γ(n) and β(n,H)≤ S≤β(n,H)+δ(n), then Sβ(n,H) and M is one of the following cases: (i) Sk(kn)× Sn-k(n-kn), \,1 k n-1; (ii) S1(11+μ2)× Sn-1(μ1+μ2). Here β(n,H)=n+n32(n-1)H2+n(n-2)2(n-1)n2H4+4(n-1)H2 and μ=n|H|+n2H2+4(n-1)2.