English

The weak lower density condition and uniform rectifiability

Classical Analysis and ODEs 2021-05-06 v2 Metric Geometry

Abstract

We show that an Ahlfors dd-regular set EE in Rn\mathbb{R}^{n} is uniformly rectifiable if the set of pairs (x,r)E×(0,)(x,r)\in E\times (0,\infty) for which there exists yB(x,r)y \in B(x,r) and 0<t<r0<t<r satisfying Hd(EB(y,t))<(2t)dε(2r)d\mathscr{H}^{d}_{\infty}(E\cap B(y,t))<(2t)^{d}-\varepsilon(2r)^d is a Carleson set for every ε>0\varepsilon>0. To prove this, we generalize a result of Schul by proving, if XX is a CC-doubling metric space, ε,ρ(0,1)\varepsilon,\rho\in (0,1), A>1A>1, and XnX_{n} is a sequence of maximal 2n2^{-n}-separated sets in XX, and B={B(x,2n):xXn,nN}\mathscr{B}=\{B(x,2^{-n}):x\in X_{n},n\in \mathbb{N}\}, then {rBs:BB,HρrBs(XAB)(2rB)s>1+ε}C,A,ε,ρ,sHs(X). \sum \left\{r_{B}^{s}: B\in \mathscr{B}, \frac{\mathscr{H}^{s}_{\rho r_{B}}(X\cap AB)}{(2r_{B})^{s}}>1+\varepsilon\right\} \lesssim_{C,A,\varepsilon,\rho,s} \mathscr{H}^{s}(X). This is a quantitative version of the classical result that for a metric space XX of finite ss-dimensional Hausdorff measure, the upper ss-dimensional densities are at most 11 Hs\mathscr{H}^{s}-almost everywhere.

Keywords

Cite

@article{arxiv.2005.02030,
  title  = {The weak lower density condition and uniform rectifiability},
  author = {Jonas Azzam and Matthew Hyde},
  journal= {arXiv preprint arXiv:2005.02030},
  year   = {2021}
}

Comments

Fixed typos and minor errors, expanded the introduction, and corrected the counterexample on page 5

R2 v1 2026-06-23T15:18:59.197Z