English

Resonance between planar self-affine measures

Classical Analysis and ODEs 2024-05-30 v4 Dynamical Systems

Abstract

We show that if {φi}iΓ\lbrace \varphi_i\rbrace_{i\in \Gamma} and {ψj}jΛ\lbrace \psi_j\rbrace_{j\in\Lambda} are self-affine iterated function systems on the plane that satisfy strong separation, domination and irreducibility, then for any associated self-affine measures μ\mu and ν\nu, the inequality dimH(μν)<min{2,dimHμ+dimHν}\dim_{\rm H}(\mu*\nu) < \min \lbrace 2, \dim_{\rm H} \mu + \dim_{\rm H} \nu \rbrace implies that there is algebraic resonance between the eigenvalues of the linear parts of φi\varphi_i and ψj\psi_j. This extends to planar non-conformal setting the existing analogous results for self-conformal measures on the line.

Keywords

Cite

@article{arxiv.2302.05240,
  title  = {Resonance between planar self-affine measures},
  author = {Aleksi Pyörälä},
  journal= {arXiv preprint arXiv:2302.05240},
  year   = {2024}
}

Comments

54 pages. Improved presentation. To appear in Adv. Math

R2 v1 2026-06-28T08:37:01.131Z