Cylindrical Estimates for High Codimension Mean Curvature Flow
Abstract
We study high codimension mean curvature flow of a submanifold Mn of dimension n in Euclidean space Rn+k subject to the quadratic curvature condition |A|2≤ cn |H|2, c n = \ 43n , 1n-2\. This condition extends the notion of two-convexity for hypersurfaces to high codimension submanifolds. We analyse singularity formation in the mean curvature flow of high codimension by directly proving a pointwise gradient estimate. We then show that near a singularity the surface is quantitatively cylindrical.
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