The Bounded Diameter Conjecture and Sharp Geometric Estimates for Mean Curvature Flow

Abstract

We show that the intrinsic diameter of mean curvature flow in R3 is uniformly bounded as one approaches the first singular time T. This confirms the bounded diameter conjecture of Haslhofer. In addition, we establish several sharp quantitative estimates: the second fundamental form A has uniformly bounded L1-norm on each time slice, A belongs to the weak L3 space on the space-time region, and the singular set S has finite H1-Hausdorff measure. All of the results are optimal due to the marriage ring example and our results do not require any convexity assumptions on the surfaces. Furthermore, our arguments extend naturally to flows through singularities, yielding the same sharp estimates.

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