Quadratically pinched submanifolds of the sphere via mean curvature flow with surgery

Abstract

We study mean curvature flow of n-dimensional submanifolds of SKn+, the round (n+)-sphere of sectional curvature K>0, under the quadratic curvature pinching condition |A|2 < 1n-2|H|2 + 4K when n≥ 8, |A|2 < 43n|H|2+n2K when n=7, and |A|2<3(n+1)2n(n+2)|H|2+2n(n-1)3(n+1)K when n=5 or 6. This condition is related to a theorem of Li and Li [Arch. Math., 58:582--594, 1992] which states that the only n-dimensional minimal submanifolds of SKn+ satisfying |A|2<2n3K are the totally geodesic n-spheres. We prove the existence of a suitable mean curvature flow with surgeries starting from initial data satisfying the pinching condition. As a result, we conclude that any smoothly, properly immersed submanifold of SKn+1 satisfying the pinching condition is diffeomorphic either to the sphere Sn or to the connected sum of a finite number of handles S1× Sn-1. The results are sharp when n≥ 8 due to hypersurface counterexamples.