English

Denjoy Domains and BMOA

Complex Variables 2023-07-28 v1

Abstract

A Denjoy domain is a plane domain whose complement is a closed subset EE of the extended real line Rˉ\bar{R} containing \infty : such a domain is called Carleson-homogeneous if there exists C>0C>0 such that for all zEz\in E and r>0r>0, one has E[zr,z+r]Cr\vert E\cap [z-r,z+r]\vert\geq Cr, where \vert\cdot\vert is the Lebesgue measure on the line. We prove that if U=Cˉ\KU=\bar{ \mathbb C}\backslash K is a Carleson-homogeneous Denjoy domain then, if ff stands for one of its universal coverings, logfBMOA.\log {f'}\in BMOA. In order to prove this result, we develop ideas from [On Carleson measures induced by Beltrami coefficients being compatible with Fuchsian groups, Ann. Fenn. Math. 46(2021),67-77] leading to a general theorem about planar domains giving sufficient conditions ensuring that logfBMOA\log {f'}\in BMOA for any universal covering f.f.

Cite

@article{arxiv.2307.14631,
  title  = {Denjoy Domains and BMOA},
  author = {Shengjin Huo and Michel Zinsmeister},
  journal= {arXiv preprint arXiv:2307.14631},
  year   = {2023}
}

Comments

10 pages

R2 v1 2026-06-28T11:41:29.980Z