Sur la r\'epartition jointe de la repr\'esentation d'Ostrowski dans les classes de r\'esidue

Abstract

For two distinct integers m1,m22, we set α1=[0;1,m1] and α2=[0;1,m2] and we denote by Sα1(n) and Sα2(n) respectively the sum of digits functions in the Ostrowski α1 and α2-representations of n. Let b1,b2 be positive integers satisfying (b1,m1)=1 and (b2,m2)=1, we obtain an estimation with an error term O(N1-δ) for the cardinal of the following set \ 0≤ n<N;\ Sα1(n) a1b1,\ Sα2(n) a2b2\, for all integers a1 and a2. Our result should be compared to that of B\'esineau and Kim who treated the case of the q-representations in different bases (that are coprimes).