Mass transport and uniform rectifiability
Abstract
In this paper we characterize the so called uniformly rectifiable sets of David and Semmes in terms of the Wasserstein distance W2 from optimal mass transport. To obtain this result, we first prove a localization theorem for the distance W2 which asserts that if μ and are probability measures in Rn, φ is a radial bump function smooth enough so that ∫φ dμ1, and μ has a density bounded from above and from below on the support of φ, then W2(φμ,aφ)≤ c W2(μ,), where a=∫φ dμ/ ∫φ\,d.
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