Hearing the shape of ancient noncollapsed flows in R4

Abstract

We consider ancient noncollapsed mean curvature flows in R4 whose tangent flow at -∞ is a bubble-sheet. We carry out a fine spectral analysis for the bubble-sheet function u that measures the deviation of the renormalized flow from the round cylinder R2 × S1(2) and prove that for τ -∞ we have the fine asymptotics u(y,θ,τ)= (y Qy -2tr(Q))/|τ| + o(|τ|-1), where Q=Q(τ) is a symmetric 2× 2-matrix whose eigenvalues are quantized to be either 0 or -1/8. This naturally breaks up the classification problem for general ancient noncollapsed flows in R4 into three cases depending on the rank of Q. In the case rk(Q)=0, generalizing a prior result of Choi, Hershkovits and the second author, we prove that the flow is either a round shrinking cylinder or R×2d-bowl. In the case rk(Q)=1, under the additional assumption that the flow either splits off a line or is selfsimilarly translating, as a consequence of recent work by Angenent, Brendle, Choi, Daskalopoulos, Hershkovits, Sesum and the second author we show that the flow must be R×2d-oval or belongs to the one-parameter family of 3d oval-bowls constructed by Hoffman-Ilmanen-Martin-White, respectively. Finally, in the case rk(Q)=2 we show that the flow is compact and SO(2)-symmetric and for τ-∞ has the same sharp asymptotics as the O(2)×O(2)-symmetric ancient ovals constructed by Hershkovits and the second author. The full classification problem will be addressed in subsequent papers based on the results of the present paper.