Linear relations among asymptotic frequencies in continued fractions

Abstract

Let H(m,d) denote the asymptotic frequency of the natural numbers k d m in the continued fraction expansions of almost all numbers x∈[0,1). For a fixed number m 4, we study Q-linear relations among the numbers H(m,d), 1 d m-3, i.e., vectors (c1,…,cm-3)∈ Qm-3 such that Σd=1m-3 cdH(m,d)=0. We restrict ourselves to the symmetric case cd=cm-2-d. In the end, we obtain a basis of the Q-vector space of these relations for prime powers m and for m=pq, where p q are primes.