Asymptotics of D(q)-pairs and triples via L-functions of Dirichlet charaters

Abstract

Let q be an integer. A D(q)-m-tuple is a set of m distinct positive integers a1, a2, . . . , am such that aiaj + q is a perfect square for all 1 ≤ i < j ≤ m. By counting integer solutions x ∈ [1, b] of congruences x2 q ( b) with b ≤ N, we count D(q)-pairs with both elements up to N, and give estimates on asymptotic behaviour. We show that for prime q, the number of such D(q)-pairs and D(q)-triples grows linearly with N. Up to a factor of 2, the slope of this linear function is the quotient of the value of the L-function of an appropriate Dirichlet character (usually a Kronecker symbol) and of ζ(2).