Entiers friables dans des progressions arithm\'etiques de grand module

Abstract

We study the average error term in the usual approximation to the number of y-friable integers congruent to a modulo q, where a≠ 0 is a fixed integer. We show that in the range \( x)5/3+\ ≤ y ≤ x and on average over q≤ x/M with M→ ∞ of moderate size, this average error term is asymptotic to -|a|(x/|a|,y)/2x. Previous results of this sort were obtained by the second author for reasonably dense sequences, however the sequence of y-friable integers studied in the current paper is thin, and required the use of different techniques, which are specific to friable integers.