Quantitative Stratification and the Regularity of Mean Curvature Flow

Abstract

Let be a Brakke flow of n-dimensional surfaces in RN. The singular set ⊂ has a stratification 0⊂1⊂..., where X∈ j if no tangent flow at X has more than j symmetries. Here, we define quantitative singular strata jη,r satisfying η>00<r jη,r=j. Sharpening the known parabolic Hausdorff dimension bound j≤ j, we prove the effective Minkowski estimates that the volume of r-tubular neighborhoods of jη,r satisfies (Tr(jη,r) B1)≤ CrN+2-j-. Our primary application of this is to higher regularity of Brakke flows starting at k-convex smooth compact embedded hypersurfaces. To this end, we prove that for the flow of k-convex hypersurfaces, any backwards selfsimilar limit flow with at least k symmetries is in fact a static multiplicity one plane. Then, denoting by r⊂ the set of points with regularity scale less than r, we prove that (Tr(r))≤ C rn+4-k-. This gives Lp-estimates for the second fundamental form for any p<n+1-k. In fact, the estimates are much stronger and give Lp-estimates for the inverse of the regularity scale. These estimates are sharp. The key technique that we develop and apply is a parabolic version of the quantitative stratification method introduced in Cheeger and Naber (arXiv:1103.1819v3) and Cheeger and Naber (arXiv:1107.3097v1).