English

The Riesz transform and quantitative rectifiability for general Radon measures

Classical Analysis and ODEs 2017-09-18 v4

Abstract

In this paper we show that if μ\mu is a Borel measure in Rn+1\mathbb R^{n+1} with growth of order nn, so that the nn-dimensional Riesz transform RμR_\mu is bounded in L2(μ)L^2(\mu), and BRn+1B\subset\mathbb R^{n+1} is a ball with μ(B)r(B)n\mu(B)\approx r(B)^n such that: (a) there is some nn-plane LL passing through the center of BB such that for some δ>0\delta>0 small enough, it holds Bdist(x,L)r(B)dμ(x)δμ(B),\int_B \frac{dist(x,L)}{r(B)}\,d\mu(x)\leq \delta\,\mu(B), (b) for some constant ϵ>0\epsilon>0 small enough, BRμ1(x)mμ,B(Rμ1)2dμ(x)ϵμ(B)\int_B |R_\mu1(x) - m_{\mu,B}(R_\mu1)|^2\,d\mu(x) \leq \epsilon \,\mu(B), where mμ,B(Rμ1)m_{\mu,B}(R_\mu1) stands for the mean of Rμ1R_\mu1 on BB with respect to μ\mu; then there exists a uniformly nn-rectifiable subset Γ\Gamma, with μ(ΓB)μ(B)\mu(\Gamma\cap B)\gtrsim \mu(B), and so that μΓ\mu|_\Gamma is absolutely continuous with respect to HnΓH^n|_\Gamma. 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.

Keywords

Cite

@article{arxiv.1601.08079,
  title  = {The Riesz transform and quantitative rectifiability for general Radon measures},
  author = {Daniel Girela-Sarrión and Xavier Tolsa},
  journal= {arXiv preprint arXiv:1601.08079},
  year   = {2017}
}

Comments

The general exposition has been improved substantially. Minor adjustments and correction of typos, and new references

R2 v1 2026-06-22T12:39:16.073Z