The blowdown of ancient noncollapsed mean curvature flows

Abstract

In this paper, we consider ancient noncollapsed mean curvature flows Mt=∂ Kt⊂ Rn+1 that do not split off a line. It follows from general theory that the blowdown of any time-slice, λ 0 λ Kt0, is at most n-1 dimensional. Here, we show that the blowdown is in fact at most n-2 dimensional. Our proof is based on fine cylindrical analysis, which generalizes the fine neck analysis that played a key role in many recent papers. Moreover, we show that in the uniformly k-convex case, the blowdown is at most k-2 dimensional. This generalizes recent results from Choi-Haslhofer-Hershkovits to higher dimensions, and also has some applications towards the classification problem for singularities in 3-convex mean curvature flow.

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