How close is too close for singular mean curvature flows?

Abstract

Suppose (Mit)t∈ [0,T), i=1,2, are two mean curvature flows in Rn+1 encountering a multiplicity one compact singularity at time T, in such a manner that for every k, the Hausdorff distance between the two flows, dH, satisfies dH(M1t,M2t)/(T-t)k → 0. We demonstrate that M1t=M2t for every t. This generalizes a result of Martin-Hagemayer and Sesum, who proved the case where M1t is itself a self-similarly shrinking flow.

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