English

On the points without universal expansions

Dynamical Systems 2017-03-08 v1 Metric Geometry Number Theory

Abstract

Let 1<β<21<\beta<2. Given any x[0,(β1)1]x\in[0, (\beta-1)^{-1}], a sequence (an){0,1}N(a_n)\in\{0,1\}^{\mathbb{N}} is called a β\beta-expansion of xx if x=n=1anβn.x=\sum_{n=1}^{\infty}a_n\beta^{-n}. For any k1k\geq 1 and any (b1b2bk){0,1}k(b_1b_2\cdots b_k)\in\{0,1\}^{k}, if there exists some k0k_0 such that ak0+1ak0+2ak0+k=b1b2bka_{k_0+1}a_{k_0+2}\cdots a_{k_0+k}=b_1b_2\cdots b_k, then we call (an)(a_n) a universal β\beta-expansion of xx. Sidorov \cite{Sidorov2003}, Dajani and de Vries \cite{DajaniDeVrie} proved that given any 1<β<21<\beta<2, then Lebesgue almost every point has uncountably many universal expansions. In this paper we consider the set VβV_{\beta} of points without universal expansions. For any n2n\geq 2, let βn\beta_n be the nn-bonacci number satisfying the following equation: βn=βn1+βn2++β+1.\beta^n=\beta^{n-1}+\beta^{n-2}+\cdots +\beta+1. Then we have dimH(Vβn)=1\dim_{H}(V_{\beta_n})=1, where dimH\dim_{H} denotes the Hausdorff dimension. Similar results are still available for some other algebraic numbers. As a corollary, we give some results of the Hausdorff dimension of the survivor set generated by some open dynamical systems. This note is another application of our paper \cite{KarmaKan}.

Keywords

Cite

@article{arxiv.1703.02172,
  title  = {On the points without universal expansions},
  author = {Karma Dajani and Kan Jiang},
  journal= {arXiv preprint arXiv:1703.02172},
  year   = {2017}
}

Comments

15pages

R2 v1 2026-06-22T18:37:52.384Z