Rigidity of minimal submanifolds in space forms

Abstract

In this paper, we consider the rigidity for an n(≥ 4)-dimensional submanfolds Mn with parallel mean curvature in the space form Mn+pc when the integral Ricci curvature of M has some bound. We prove that, if c+H2>0 and \|Ric-λ\|n/2< ε(n,c, λ, H) for λ satisfying n-2n-1 (c+H2) < λ c+H2, then M is the totally umbilical sphere Sn(1c+H2). Here H is the norm of the parallel mean curvature of M, and ε(n,c,λ, H) is a positive constant depending only on n, c,λ and H. This extends some of the earlier work of [15] from pointwise Ricci curvature lower bound to inetgral Ricci curvature lower bound.