The Elekes-Szab\'o Problem and the Uniformity Conjecture

Abstract

In this paper we give a conditional improvement to the Elekes-Szab\'o problem over the rationals, assuming the Uniformity Conjecture. Our main result states that for F∈ Q[x,y,z] belonging to a particular family of polynomials, and any finite sets A, B, C ⊂ Q with |A|=|B|=|C|=n, we have \[ |Z(F) (A× B × C)| n2-1s. \] The value of the integer s is dependent on the polynomial F, but is always bounded by s ≤ 5, and so even in the worst applicable case this gives a quantitative improvement on a bound of Raz, Sharir and de Zeeuw (arXiv:1504.05012). We give several applications to problems in discrete geometry and arithmetic combinatorics. For instance, for any set P ⊂ Q2 and any two points p1,p2 ∈ Q2, we prove that at least one of the pi satisfies the bound \[ | \ \| pi - p \| : p ∈ P \| |P|3/5, \] where \| · \| denotes Euclidean distance. This gives a conditional improvement to a result of Sharir and Solymosi (arXiv:1308.0814).