Uniqueness of Asymptotically Conical Higher Codimension Self-Shrinkers and Self-Expanders
Abstract
Let C be an m-dimensional cone immersed in Rn+m. In this paper, we show that if F:Mm → Rn+m is a properly immersed mean curvature flow self-shrinker which is smoothly asymptotic to C, then it is unique and converges to C with unit multiplicity. Furthermore, if F1 and F2 are self-expanders that both converge to C smoothly asymptotically and their separation decreases faster than -m-1e-2/4 in the Hausdorff metric, then the images of F1 and F2 coincide.
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