A remark on the extreme value theory for continued fractions

Abstract

Let x be a irrational number in the unit interval and denote by its continued fraction expansion [a1(x), a2(x), ·s, an(x), ·s]. For any n ≥ 1, write Tn(x) = 1 ≤ k ≤ n\ak(x)\. We are interested in the Hausdorff dimension of the fractal set \[ Eφ = \x ∈ (0,1): n ∞ Tn(x)φ(n) =1\, \] where φ is a positive function defined on N with φ(n) ∞ as n ∞. Some partial results have been obtained by Wu and Xu, Liao and Rams, and Ma. In the present paper, we further study this topic when φ(n) tends to infinity with a doubly exponential rate as n goes to infinity.