Singularity models of pinched solutions of mean curvature flow in higher codimension

Abstract

We consider ancient solutions to the mean curvature flow in Rn+1 (n ≥ 3) that are weakly convex, uniformly two-convex, and satisfy derivative estimates |∇ A| ≤ γ1 |H|2, |∇2 A| ≤ γ2 |H|3. We show that such solutions are noncollapsed. As an application, in arbitrary codimension, we consider compact n-dimensional (n ≥ 5) solutions to the mean curvature flow in RN that satisfy the pinching condition |H| > 0 and |A|2 < c(n) |H|2, c(n) = \1n-2, 3(n+1)2n(n+2)\. We conclude that any blow-up model at the first singular time must be a codimension one shrinking sphere, shrinking cylinder, or translating bowl soliton.