Riesz transforms and the BAUPP and BWGL criteria for uniform rectifiability
Abstract
In this note it is shown that if μ is an n-Ahlfors regular measure in Rn+1 such that the n-dimensional Riesz transform is bounded in L2(μ) and the so-called BAUPP (bilateral approximation by unions of parallel planes) condition holds for μ, then μ satisfies the BWGL (bilateral weak geometric lemma), and so μ is uniformly n-rectifiable. In this way, one can solve the David-Semmes problem in codimension one without relying on the BAUP (bilateral approximation by unions of planes) criterion of David and Semmes.
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