Sharp Quartic Pinching for the Mean Curvature Flow in the Sphere

Abstract

We prove a sharp quartic curvature pinching for the mean curvature flow in Sn+m, m2, which generalises Pu's work on the convergence of submanifolds in Sn+m to a round point. Using a blow up argument, we prove a codimension and a cylindrical estimate, where in regions of high curvature, the submanifold becomes approximately codimension one, quantitatively, and is weakly convex and moves by translation or is a self shrinker. With a decay estimate, the rescaling converges smoothly to a totally geodesic limit in infinite time, without using Stampacchia iteration or integral analysis.