On the divisor problem with congruence conditions

Abstract

Let d(n; r1, q1, r2, q2) be the number of factorization n=n1n2 satisfying ni riqi (i=1,2) and (x; r1, q1, r2, q2) be the error term of the summatory function of d(n; r1, q1, r2, q2) with x≥ (q1q2)1+, 1≤ ri≤ qi, and (ri, qi)=1 (i=1, 2). We study the power moments and sign changes of (x; r1, q1, r2, q2), and prove that for a sufficiently large constant C, (q1q2x; r1, q1, r2, q2) changes sign in the interval [T,T+CT] for any large T. Meanwhile, we show that for a small constant c', there exist infinitely many subintervals of length c'T-7T in [T,2T] where (q1q2x; r1, q1, r2, q2)> c5x14 always holds.