On the number of directions formed by Cartesian products in Fp22

Abstract

We prove a lower bound on the number of directions determined by Cartesian products A× A in the affine plane over the finite field Fp2. Our lower bound holds for sets of size p2/3<|A|<p, which are not contained in any affine copy of Fp. The proof combines a structural result of Li and Roche-Newton on the set of directions formed by Cartesian products with a lower bound of Fancsali, Sziklai and Takáts. A key step shows that, unless the set of directions exhibits closure properties forcing subfield structure, one obtains a direction for which an algebraic multiplicity parameter in the latter theorem can be made explicit.