Products of Differences over Arbitrary Finite Fields

Abstract

There exists an absolute constant δ > 0 such that for all q and all subsets A ⊂eq Fq of the finite field with q elements, if |A| > q2/3 - δ, then \[ |(A-A)(A-A)| = |\ (a -b) (c-d) : a,b,c,d ∈ A\| > q2. \] Any δ < 1/13,542 suffices for sufficiently large q. This improves the condition |A| > q2/3, due to Bennett, Hart, Iosevich, Pakianathan, and Rudnev, that is typical for such questions. Our proof is based on a qualitatively optimal characterisation of sets A,X ⊂eq Fq for which the number of solutions to the equation \[ (a1-a2) = x (a3-a4) \, , \; a1,a2, a3, a4 ∈ A, x ∈ X \] is nearly maximum. A key ingredient is determining exact algebraic structure of sets A, X for which |A + XA| is nearly minimum, which refines a result of Bourgain and Glibichuk using work of Gill, Helfgott, and Tao. We also prove a stronger statement for \[ (A-B)(C-D) = \ (a -b) (c-d) : a ∈ A, b ∈ B, c ∈ C, d ∈ D\ \] when A,B,C,D are sets in a prime field, generalising a result of Roche-Newton, Rudnev, Shkredov, and the authors.