Multifractal analysis of maximal product of consecutive partial quotients in continued fractions

Abstract

Let [a1(x), a2(x), …, an(x), …] be the continued fraction expansion of an irrational number x∈ (0,1). We study the growth rate of the maximal product of consecutive partial quotients among the first n terms, defined by Ln(x)=1≤ i≤ n\ai(x)ai+1(x)\, from the viewpoint of multifractal analysis. More precisely, we determine the Hausdorff dimension of the level set \[L():=\x∈ (0,1):n ∞Ln(x)(n)=1\,\] where :R++ is an increasing function such that is a regularly increasing function with index . We show that there exists a jump of the Hausdorff dimension of L() when =1/2. We also construct uncountably many discontinuous functions that cause the Hausdorff dimension of L() to transition continuously from 1 to 1/2, filling the gap when =1/2.

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