Reifenberg Theorem for Locally Finitely Almost Splitting Sets
Abstract
The well-known Reifenberg theorem states that if a subset of Rn can be well approximated by k-planes at every point and every scale, then it is biH\"older homeomorphic to a k-disk. This article concerns a subset S of Rn which can be approximated by at most N parallel k planes at each point and scale. As a subset of Rn such an S may be quite degenerate; S may clearly not be homeomorphic to a disk, and indeed we will see may not be homeomorphic to a union of disks. However, we prove that S is still the image of a multivalued map on Rk, which is itself a biH\"older homeomorphism of the disk into the set of subsets of Rn.
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