Small Solutions of generic ternary quadratic congruences

Abstract

We consider small solutions of quadratic congruences of the form x12+α2x22+α3x32 0 q, where q=pm is an odd prime power. Here, α2 is arbitrary but fixed and α3 is variable, and we assume that (α2α3,q)=1. We show that for all α3 modulo q which are coprime to q except for a small number of α3's, an asymptotic formula for the number of solutions (x1,x2,x3) to the congruence x12+α2x22+α3x32 0 q with \|x1|,|x2|,|x3|\ N holds if N q11/24+ as q tends to infinity over the set of all odd prime powers. It is of significance that we break the barrier 1/2 in the above exponent. If q is restricted to powers pm of a fixed prime p and m tends to infinity, we obtain a slight improvement of this result using the theory of p-adic exponent pairs, as developed by Mili\'cevi\'c, replacing the exponent 11/24 above by 11/25. Under the Lindel\"of hypothesis for Dirichlet L-functions, we are able to replace the exponent 11/24 above by 1/3.