On the Distribution of the Digits in Lüroth Expansions

Pub Date : 2022-02-03 DOI:10.1007/s10986-022-09553-0

Qing-Long Zhou

引用次数: 0

Abstract

For x ∈ [0, 1), let [d₁(x), d₂(x), . . .] be its Lüroth expansion, and let {p_n(x)/qn(x)}_n≥1 be the sequence of convergents of x. In this paper, we prove that the Hausdorff dimension of the exceptional set

$$ {F}_{\alpha}^{\beta }=\left\{x\in \left[\left.0,1\right)\right.:\underset{n\to \infty }{\lim}\operatorname{inf}\frac{\log\ {d}_{n+1}(x)}{-\log \left|x-\frac{p_n(x)}{q_n(x)}\right|}=\alpha, \underset{n\to \infty }{\lim}\sup \frac{\log\ {d}_{n+1}(x)}{-\log \left|x-\frac{p_n(x)}{q_n(x)}\right|}\ge \beta \right\} $$

is (1 − β)/2 or 1 − β according to α > 0 or α = 0. This extends an earlier result of Tan and Zhang.

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论罗斯展开中位数的分布

对于x∈[0,1)，设[d1(x)， d2(x)，…]是它的l罗斯展开式，设{pn(x)/qn(x)}n≥1是x的收敛序列。本文根据α ＆gt证明了例外集$$ {F}_{\alpha}^{\beta }=\left\{x\in \left[\left.0,1\right)\right.:\underset{n\to \infty }{\lim}\operatorname{inf}\frac{\log\ {d}_{n+1}(x)}{-\log \left|x-\frac{p_n(x)}{q_n(x)}\right|}=\alpha, \underset{n\to \infty }{\lim}\sup \frac{\log\ {d}_{n+1}(x)}{-\log \left|x-\frac{p_n(x)}{q_n(x)}\right|}\ge \beta \right\} $$的Hausdorff维数为(1−β)/2或1−β;或者α = 0。这延伸了谭和张的早期结果。

本文章由计算机程序翻译，如有差异，请以英文原文为准。

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