The Riesz transform and quantitative rectifiability for general Radon measures

Abstract

In this paper we show that if μ is a Borel measure in Rn+1 with growth of order n, so that the n-dimensional Riesz transform Rμ is bounded in L2(μ), and B⊂ Rn+1 is a ball with μ(B)≈ r(B)n such that: (a) there is some n-plane L passing through the center of B such that for some δ>0 small enough, it holds ∫B dist(x,L)r(B)\,dμ(x)≤ δ\,μ(B), (b) for some constant ε>0 small enough, ∫B |Rμ1(x) - mμ,B(Rμ1)|2\,dμ(x) ≤ ε \,μ(B), where mμ,B(Rμ1) stands for the mean of Rμ1 on B with respect to μ; then there exists a uniformly n-rectifiable subset , with μ( B) μ(B), and so that μ| is absolutely continuous with respect to Hn|. This result is an essential tool to solve an old question on a two phase problem for harmonic measure in a subsequent paper by Azzam, Mourgoglou and Tolsa.