Maximising the number of solutions to a linear equation in a set of integers

Abstract

Given a linear equation of the form a1x1 + a2x2 + a3x3 = 0 with integer coefficients ai, we are interested in maximising the number of solutions to this equation in a set S ⊂eq Z, for sets S of a given size. We prove that, for any choice of constants a1, a2 and a3, the maximum number of solutions is at least (112 + o(1))|S|2. Furthermore, we show that this is optimal, in the following sense. For any > 0, there are choices of a1, a2 and a3, for which any large set S of integers has at most (112 + )|S|2 solutions. For equations in k ≥ 3 variables, we also show an analogous result. Set σk = ∫-∞∞ ( π xπ x)k dx. Then, for any choice of constants a1, …, ak, there are sets S with at least (σkkk-1 + o(1))|S|k-1 solutions to a1x1 + … + akxk = 0. Moreover, there are choices of coefficients a1, …, ak for which any large set S must have no more than (σkkk-1 + )|S|k-1 solutions, for any > 0.