English

Piecewise contractions and b-adic expansions

Dynamical Systems 2019-06-11 v1

Abstract

Let I=[0,1)I=[0,1), b{2,3,}b\in \{2,3,\ldots\} and f:IIf:I\to I be an injective piecewise 1b\frac{1}{b}-affine map, that is, assume that there exists a partition of II into intervals I1,,InI_1,\ldots,I_n such that f(x)f(y)1bxy\vert f(x)-f(y)\vert\le\frac1b \vert x-y\vert for all x,yIix,y\in I_i and 1in1\le i\le n. In this note, we study the δ\delta-parameter family of maps fδ=Rδff_{\delta}=R_{\delta}\circ f, where Rδ:x{x+δ}R_\delta:x\mapsto \{x+\delta\}. More precisely, we show that the set N\mathcal{N} of parameters δ\delta for which fδf_{\delta} has only natural codings with maximal complexity is a non-empty set with Hausdorff \mbox{dimension 00}. We also show that for all δN\delta\in\mathcal{N}, the map fδf_{\delta} is topologically semiconjugate to a minimal nn-interval exchange transformation satisfying Keane's i.d.o.c. condition. The main result turns out to be a concrete application of the result by Mauduit and Moreira that the set of numbers having bb-adic expansion with entropy 00 has Hausdorff dimension 00.

Keywords

Cite

@article{arxiv.1906.03382,
  title  = {Piecewise contractions and b-adic expansions},
  author = {Benito Pires},
  journal= {arXiv preprint arXiv:1906.03382},
  year   = {2019}
}
R2 v1 2026-06-23T09:47:36.748Z