{"title":"Bifurcation sets arising from non-integer base expansions","authors":"P. Allaart, S. Baker, D. Kong","doi":"10.4171/jfg/79","DOIUrl":null,"url":null,"abstract":"Given a positive integer $M$ and $q\\in(1,M+1]$, let $\\mathcal U_q$ be the set of $x\\in[0, M/(q-1)]$ having a unique $q$-expansion: there exists a unique sequence $(x_i)=x_1x_2\\ldots$ with each $x_i\\in\\{0,1,\\ldots, M\\}$ such that \n\\[ \nx=\\frac{x_1}{q}+\\frac{x_2}{q^2}+\\frac{x_3}{q^3}+\\cdots. \n\\] \nDenote by $\\mathbf U_q$ the set of corresponding sequences of all points in $\\mathcal U_q$. \nIt is well-known that the function $H: q\\mapsto h(\\mathbf U_q)$ is a Devil's staircase, where $h(\\mathbf U_q)$ denotes the topological entropy of $\\mathbf U_q$. In this paper we {give several characterizations of} the bifurcation set \n\\[ \n\\mathcal B:=\\{q\\in(1,M+1]: H(p)\\ne H(q)\\textrm{ for any }p\\ne q\\}. \n\\] Note that $\\mathcal B$ is contained in the set $\\mathcal{U}^R$ of bases $q\\in(1,M+1]$ such that $1\\in\\mathcal U_q$. By using a transversality technique we also calculate the Hausdorff dimension of the difference $\\mathcal B\\backslash\\mathcal{U}^R$. Interestingly this quantity is always strictly between $0$ and $1$. When $M=1$ the Hausdorff dimension of $\\mathcal B\\backslash\\mathcal{U}^R$ is $\\frac{\\log 2}{3\\log \\lambda^*}\\approx 0.368699$, where $\\lambda^*$ is the unique root in $(1, 2)$ of the equation $x^5-x^4-x^3-2x^2+x+1=0$.","PeriodicalId":1,"journal":{"name":"Accounts of Chemical Research","volume":null,"pages":null},"PeriodicalIF":16.4000,"publicationDate":"2017-06-16","publicationTypes":"Journal Article","fieldsOfStudy":null,"isOpenAccess":false,"openAccessPdf":"https://sci-hub-pdf.com/10.4171/jfg/79","citationCount":"12","resultStr":null,"platform":"Semanticscholar","paperid":null,"PeriodicalName":"Accounts of Chemical Research","FirstCategoryId":"100","ListUrlMain":"https://doi.org/10.4171/jfg/79","RegionNum":1,"RegionCategory":"化学","ArticlePicture":[],"TitleCN":null,"AbstractTextCN":null,"PMCID":null,"EPubDate":"","PubModel":"","JCR":"Q1","JCRName":"CHEMISTRY, MULTIDISCIPLINARY","Score":null,"Total":0}
引用次数: 12
Abstract
Given a positive integer $M$ and $q\in(1,M+1]$, let $\mathcal U_q$ be the set of $x\in[0, M/(q-1)]$ having a unique $q$-expansion: there exists a unique sequence $(x_i)=x_1x_2\ldots$ with each $x_i\in\{0,1,\ldots, M\}$ such that
\[
x=\frac{x_1}{q}+\frac{x_2}{q^2}+\frac{x_3}{q^3}+\cdots.
\]
Denote by $\mathbf U_q$ the set of corresponding sequences of all points in $\mathcal U_q$.
It is well-known that the function $H: q\mapsto h(\mathbf U_q)$ is a Devil's staircase, where $h(\mathbf U_q)$ denotes the topological entropy of $\mathbf U_q$. In this paper we {give several characterizations of} the bifurcation set
\[
\mathcal B:=\{q\in(1,M+1]: H(p)\ne H(q)\textrm{ for any }p\ne q\}.
\] Note that $\mathcal B$ is contained in the set $\mathcal{U}^R$ of bases $q\in(1,M+1]$ such that $1\in\mathcal U_q$. By using a transversality technique we also calculate the Hausdorff dimension of the difference $\mathcal B\backslash\mathcal{U}^R$. Interestingly this quantity is always strictly between $0$ and $1$. When $M=1$ the Hausdorff dimension of $\mathcal B\backslash\mathcal{U}^R$ is $\frac{\log 2}{3\log \lambda^*}\approx 0.368699$, where $\lambda^*$ is the unique root in $(1, 2)$ of the equation $x^5-x^4-x^3-2x^2+x+1=0$.
期刊介绍:
Accounts of Chemical Research presents short, concise and critical articles offering easy-to-read overviews of basic research and applications in all areas of chemistry and biochemistry. These short reviews focus on research from the author’s own laboratory and are designed to teach the reader about a research project. In addition, Accounts of Chemical Research publishes commentaries that give an informed opinion on a current research problem. Special Issues online are devoted to a single topic of unusual activity and significance.
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