A two-parameter finite field Erdos-Falconer distance problem

Abstract

We study the following two-parameter variant of the Erd os-Falconer distance problem. Given E,F ⊂ Fqk+l, l ≥ k 2, the k+l-dimensional vector space over the finite field with q elements, let Bk,l(E,F) be given by \( x'-y', x"-y" ): x=(x',x") ∈ E, y=(y',y") ∈ F; x',y' ∈ Fqk, x",y" ∈ Fql \. We prove that if |E||F| ≥ C qk+2l+1, then Bk,l(E,F)= Fq × Fq. Furthermore this result is sharp if k is odd. For the case of l=k=2 and q a prime with q 3 4 we get that for every positive C there is c such that if |E||F|>C q6+23, then |B2,2(E,F)|> c q2.