English

Numeration systems as dynamical systems -- introduction

Dynamical Systems 2007-05-23 v1

Abstract

A numeration system originally implies a digitization of real numbers, but in this paper it rather implies a compactification of real numbers as a result of the digitization. By definition, a numeration system with GG, where GG is a nontrivial closed multiplicative subgroup of R+{\mathbb{R}}_+, is a nontrivial compact metrizable space Ω\Omega admitting a continuous (λω+t)(\lambda\omega+t)-action of (λ,t)G×R(\lambda,t)\in G\times{\mathbb{R}} to ωΩ\omega\in\Omega, such that the (ω+t)(\omega+t)-action is strictly ergodic with the unique invariant probability measure μΩ\mu_{\Omega}, which is the unique GG-invariant probability measure attaining the topological entropy logλ|\log\lambda| of the transformation ωλω\omega\mapsto\lambda\omega for any λ1\lambda\ne 1. We construct a class of numeration systems coming from weighted substitutions, which contains those coming from substitutions or β\beta-expansions with algebraic β\beta. It also contains those with G=R+G={\mathbb{R}}_+. We obtained an exact formula for the ζ\zeta-function of the numeration systems coming from weighted substitutions and studied the properties. We found a lot of applications of the numeration systems to the β\beta-expansions, Fractal geometry or the deterministic self-similar processes which are seen in \cite{K4}. This paper is based on \cite{K3} changing the way of presentation. The complete version of this paper is in \cite{K4}.

Keywords

Cite

@article{arxiv.math/0608246,
  title  = {Numeration systems as dynamical systems -- introduction},
  author = {Teturo Kamae},
  journal= {arXiv preprint arXiv:math/0608246},
  year   = {2007}
}

Comments

Published at http://dx.doi.org/10.1214/074921706000000220 in the IMS Lecture Notes--Monograph Series (http://www.imstat.org/publications/lecnotes.htm) by the Institute of Mathematical Statistics (http://www.imstat.org)