Small solutions of ternary quadratic congruences with averaging over the moduli

Abstract

In a recent paper, we proved that for any large enough odd modulus q∈ N and fixed α2∈ N coprime to q, the congruence \[ x12+α2x22+α3x32 0 q \] has a solution of (x1,x2,x3)∈ Z3 with x3 coprime to q of height \|x1|,|x2|,|x3|\ q11/24+ for, in a sense, almost all α3, where α3 runs over the reduced residue classes modulo q. Here it was of significance that 11/24<1/2, so we broke a natural barrier. In this paper, we average the moduli q in addition, establishing the existence of a solution of height Q3/8+α2 for almost all pairs (q,α3), with Q large enough, Q<q 2Q, q coprime to 2α2 and α3 running over the reduced residue classes modulo q.