An Optimal Differentiable Sphere Theorem for Complete Manifolds

Abstract

A new differentiable sphere theorem is obtained from the view of submanifold geometry. An important scalar is defined by the scalar curvature and the mean curvature of an oriented complete submanifold Mn in a space form Fn+p(c) with c0. Making use of the Hamilton-Brendle-Schoen convergence result for Ricci flow and the Lawson-Simons-Xin formula for the nonexistence of stable currents, we prove that if the infimum of this scalar is positive, then M is diffeomorphic to Sn. We then introduce an intrinsic invariant I(M) for oriented complete Riemannian n-manifold M via the scalar, and prove that if I(M)>0, then M is diffeomorphic to Sn. It should be emphasized that our differentiable sphere theorem is optimal for arbitrary n(2).