Metrical properties of exponentially growing partial quotients

TL;DR

This paper establishes an exact Hausdorff dimension for sets of real numbers with exponentially growing continued fraction partial quotients, unifying and improving lower bounds for various known metric results.

Contribution

It introduces a unified approach to derive optimal lower bounds for the Hausdorff dimension of sets with exponentially growing partial quotients, extending previous results and providing a new theorem.

Findings

Exact Hausdorff dimension for sets with exponential partial quotients

Unified method for lower bounds in metric continued fractions

New theorem on Hausdorff dimension of specific growth sets

Abstract

A fundamental challenge within the metric theory of continued fractions involves quantifying sets of real numbers, when represented using continued fractions, exhibit partial quotients that grow at specific rates. For any positive function $\Phi$, Wang-Wu theorem (2008) comprehensively describes the Hausdorff dimension of the set \begin{equation*} \EE_1(\Phi):=\left\{x\in [0, 1): a_n(x)\geq \Phi(n) \ {\rm for \ infinitely \ many} \ n\in \N\right\}. \end{equation*} Various generalisations of this set exist, such as substituting one partial quotient with the product of consecutive partial quotients in the aforementioned set which has connections with the improvements to Dirichlet's theorem, and many other sets of similar nature. Establishing the upper bound of the Hausdorff dimension of such sets is significantly easier than proving the lower bound. In this paper, we present a unified approach to get an optimal lower bound for many known setups, including results by Wang-Wu [Adv. Math., 2008], Huang-Wu-Xu [Israel J. Math. 2020], Bakhtawar-Bos-Hussain [Nonlinearity 2020], and several others, and also provide a new theorem derived as an application of our main result. We do this by finding an exact Hausdorff dimension of the set $$S_m(A_0,\ldots,A_{m-1}) \defeq \left\{ x\in[0,1): \, c_i A_i^n \le a_{n+i}(x) < 2c_i A_i^n,0 \le i \le m-1 \ \text{for infinitely many } n\in\N \right\},$$ where each partial quotient grows exponentially and the base is given by a parameter $A_i>1$. For proper choices of $A_i$'s, this set serves as a subset for sets under consideration, providing an optimal lower bound of Hausdorff dimension in all of them. The crux of the proof lies in introducing of multiple probability measures consistently distributed over the Cantor-type subset of $S_m(A_0,\ldots,A_{m-1})$.