The key purpose of this work is to describe various properties of flow by mean curvature of embedded sub-manifolds. More precisely we will address questions relating to short time smoothing of the initial data via the flow, long time regularity properties of the flow and isoperimetric properties of the flow. The smoothing results apply to a class of objects called epsilon R Reifenberg sets, for which we show short time existence and uniqueness of smooth flow. This class is general enough to allow fractional Hausdorff dimension, and is, at least qualitatively, the roughest class for which a smooth flow is known to exist in arbitrary dimension an codimension. The regularity results, which are joint with Robert Haslhofer, extend Brian White's structure theory of mean convex flows to the setting of arbitrary ambient manifolds, removing a stumbling block that was left after White's work. The last results describe how singular, arbitrary codimensional mean curvature flow can be used to provide good fillings to cycles in Euclidean space. This leads to a very short proof for an isoperimetric inequality with a very good (although not optimal) constant. Through an investigation of the geometric measure theory of parabolic space time, culminating with a co-area formula in that context, a bound on the space-time measure of the flow is also obtained.
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机译:这项工作的主要目的是通过嵌入的子流形的平均曲率描述流的各种特性。更准确地说,我们将解决与通过流进行的初始数据的短时间平滑,流的长时间规律性和流的等渗特性有关的问题。平滑结果适用于称为epsilon R Reifenberg集的一类对象,对于这些对象,我们展示了存在时间短和平滑流的唯一性。此类足够通用以允许分数为Hausdorff维数,并且至少在质上是已知的任意维度(维数)中存在平稳流动的最粗糙的类。与罗伯特·哈斯霍夫(Robert Haslhofer)共同提出的规则性结果将布莱恩·怀特(Brian White)的平均凸流结构理论扩展到任意环境歧管的设置,从而消除了怀特(White)工作后留下的绊脚石。最后的结果描述了如何使用奇异的任意多维平均曲率流为欧几里得空间中的循环提供良好的填充。这导致了一个关于等距不等式的非常短的证明,该等式不等式具有很好的(尽管不是最优的)常数。通过研究抛物线时空的几何度量理论,并在此背景下以共同区域公式结束,还获得了流动的时空度量的界限。
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