English

Analytic capacity and projections

Classical Analysis and ODEs 2019-01-23 v2 Analysis of PDEs

Abstract

In this paper we study the connection between the analytic capacity of a set and the size of its orthogonal projections. More precisely, we prove that if ECE\subset \mathbb C is compact and μ\mu is a Borel measure supported on EE, then the analytic capacity of EE satisfies γ(E)cμ(E)2IPθμ22dθ, \gamma(E) \geq c\,\frac{\mu(E)^2}{\int_I \|P_\theta\mu\|_2^2\,d\theta}, where cc is some positive constant, I[0,π)I\subset [0,\pi) is an arbitrary interval, and PθμP_\theta\mu is the image measure of μ\mu by PθP_\theta, the orthogonal projection onto the line {reiθ:rR}\{re^{i\theta}:r\in\mathbb R\}. This result is related to an old conjecture of Vitushkin about the relationship between the Favard length and analytic capacity. We also prove a generalization of the above inequality to higher dimensions which involves related capacities associated with signed Riesz kernels.

Keywords

Cite

@article{arxiv.1712.00594,
  title  = {Analytic capacity and projections},
  author = {Alan Chang and Xavier Tolsa},
  journal= {arXiv preprint arXiv:1712.00594},
  year   = {2019}
}

Comments

Minor corrections and adjustments. An additional appendix where we estimate $L^2$ densities of projections in terms of a conical Riesz energy plus an 'error term'

R2 v1 2026-06-22T23:04:27.167Z