Hausdorff dimension of sets with restricted, slowly growing partial quotients

Abstract

I. J. Good (1941) showed that the set of irrational numbers in (0,1) whose partial quotients an tend to infinity is of Hausdorff dimension 1/2. A number of related results impose restrictions of the type an∈ B or an≥ f(n), where B is an infinite subset of N and f is a rapidly growing function with n. We show that, for an arbitrary B and an arbitrary f with values in [ B,∞) and tending to infinity, the set of irrational numbers in (0,1) such that \[ an∈ B,\ an≤ f(n) for all n∈ N, and an∞ as n∞\] is of Hausdorff dimension τ(B)/2, where τ(B) is the exponent of convergence of B.