Joint distribution in residue classes of the base-q and Ostrowski digital sums

Abstract

Let q be an integer ≥ 2 and let Sq(n) denote the sum of digits of n in base q. For \[ α=[0;1,m],\ m≥ 2, \] let Sα(n) denote the sum of digits in the Ostrowski α-representation of n. Let m1,m2≥ 2 be integers with (q-1,m1)=(m,m2)=1. We prove that there exists δ>0 such that for all integers a1,a2, eqnarray* &&|\0≤ n<N: Sq(n) a1m1,\ Sα(n) a2m2\| &=&Nm1m2+O(N1-δ). eqnarray* The asymptotic relation implied by this equality was proved by Coquet, Rhin & Toffin and the equality was proved for the case α=[\ 1\ ] by Spiegelhofer.