The topological rigidity theorem for submanifolds in space forms

Abstract

Let M be an n(≥ 4)-dimensional compact submanifold in the simply connected space form Fn+p(c) with constant curvature c≥ 0, where H is the mean curvature of M. We verify that if the scalar curvature of M satisfies R>n(n-2)(c+H2), and if RicM≥ (n-2-2σn2n-σn)(c+H2), then M is homeomorphic to a sphere. Here σn=sgn(n-4)((-1)n+3), and sgn(·) is the standard sign function. This improves our previous sphere theorem XG2. It should be emphasized that our pinching conditions above are optimal. We also obtain some new topological sphere theorems for submanifolds with pinched scalar curvature and Ricci curvature.