In this paper we prove the tauberian type theorem containing the asymptotic series for the Dirichlet series. We use this result to study distribution of sum of unitary divisors in residue classes coprime with a module. The divisor d of the integer n is an unitary divisor if (d, n/d) = 1. The sum of unitary divisors of a number n is denoted by σ∗(n). For a fixed function f(n) let us denote by S(x,r) the numbers of positive integers n ≤ x such that f(n) ≡ r(mod N) for x > 0 and r coprime with module N . According to W. Narkiewicz [5], a function f(n) is called weakly uniformly distributed modulo N if and only if for every pair of coprime integer a, b lim S(x,a)/ S(x,b)=1, (x→∞) provided that the set {r | (r,N) = 1} is infinite. We use t...