Limit theorems for counting large continued fraction digits

Abstract

We establish a central limit theorem for counting large continued fraction digits (an), i.e. we count occurrences \an>bn\, where (bn) is a sequence of positive integers. Our result improves a similar result by Philipp which additionally assumes that bn tends to infinity. Moreover, we give a refinement of the famous Borel-Bernstein Theorem for continued fractions regarding the event that the n-th continued fraction digit lies infinitely often between dn and dn(1+1/cn) for given sequences (cn) and (dn). Also for these sets we obtain a central limit theorem. As an interesting side result we determine the first φ-mixing coefficient for the Gauss system explicitly.