Piecewise contractions and b-adic expansions
Dynamical Systems
2019-06-11 v1
Abstract
Let , and be an injective piecewise -affine map, that is, assume that there exists a partition of into intervals such that for all and . In this note, we study the -parameter family of maps , where . More precisely, we show that the set of parameters for which has only natural codings with maximal complexity is a non-empty set with Hausdorff \mbox{dimension }. We also show that for all , the map is topologically semiconjugate to a minimal -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 -adic expansion with entropy has Hausdorff dimension .
Cite
@article{arxiv.1906.03382,
title = {Piecewise contractions and b-adic expansions},
author = {Benito Pires},
journal= {arXiv preprint arXiv:1906.03382},
year = {2019}
}