A useful lemma for calculating the Hausdorff dimension of certain sets   in Engel expansions

Lei Shang

arXiv:2110.15861·math.NT·November 1, 2021

A useful lemma for calculating the Hausdorff dimension of certain sets in Engel expansions

Lei Shang

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TL;DR

This paper provides a precise formula for the Hausdorff dimension of sets defined by digit constraints in Engel expansions, improving a previous lemma and aiding in the analysis of such fractal sets.

Contribution

It introduces a new lemma that refines the calculation of Hausdorff dimensions for sets in Engel expansions under mild conditions.

Findings

01

Derived a formula for Hausdorff dimension of digit-restricted Engel sets

02

Improved upon previous lemma by Shang and Wu (2021)

03

Facilitates analysis of fractal structures in Engel expansions

Abstract

Let ${s_{n}}$ and ${t_{n}}$ be two sequences of positive real numbers. Under some mild conditions on ${s_{n}}$ and ${t_{n}}$ , we give the precise formula of the Hausdorff dimension of the set \[ \mathbb{E}(\{s_n\},\{t_n\}):=\Big\{x\in(0,1): s_{n}<d_{n}(x)\leq s_n+t_n, \forall n\geq1\Big\}, \] where $d_{n} (x)$ denotes the digit of the Engel expansion of $x$ . This result improves the Lemma 2.6 of Shang and Wu (2021JNT), and is very useful for calculating the Hausdorff dimension of certain sets in Engel expansions.

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Taxonomy

TopicsMathematical Dynamics and Fractals · Advanced Topology and Set Theory