Sets of Beta Expansions and the Hausdorff Dimension of Slices through Fractals

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    Abstract

    We study natural measures on sets of $\beta$-expansions and on slices through self similar sets. In the setting of $\beta$-expansions, these allow us to better understand the measure of maximal entropy for the random $\beta$-transformation and to reinterpret a result of Lindenstrauss, Peres and Schlag in terms of equidistribution. Each of these applications is relevant to the study of Bernoulli convolutions. In the fractal setting this allows us to understand how to disintegrate Hausdorff measure by slicing, leading to conditions under which almost every slice through a self similar set has positive Hausdorff measure, generalising long known results about almost everywhere values of the Hausdorff dimension.
    Original languageEnglish
    JournalJournal of the European Mathematical Society
    Volume18
    Issue number2
    DOIs
    Publication statusPublished - 8 Feb 2016

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