Interpolation of point configurations in the discrete plane

Abstract

Defining distances over finite fields formally by ||x-y||:=(x1-y1)2+·s + (xd-yd)2 for x,y∈ Fqd, distance problems naturally arise in analogy to those studied by Erdos and Falconer in Euclidean space. Given a graph G and a set E⊂eq Fq2, let G(E) be the generalized distance set corresponding to G. In the case when G is the complete graph on k+1 vertices, Bennett, Hart, Iosevich, Pakianathan, and Rudnev showed that when |E|≥ qd-d-1k+1, it follows that |G(E)|≥ cqk+12. In the case when k=d=2, the threshold can be improved to |E|≥ q85. Moreover, Jardine, Iosevich, and McDonald showed that in the case when G is a tree with k+1 vertices, then whenever E⊂eq Fqd, d≥ 2 satisfies |E|≥ Ckqd+12, it follows that G(E)=Fqk. In this paper, we present a technique which enables us to study certain graphs with both rigid and non-rigid components. In particular, we show that for E⊂eq Fq2, q=pn, n odd, p 3 \ mod \ 4, and G is the graph consisting of two triangles joined at a vertex, then whenever |E|≥ q127, it follows that |G(E)|≥ cq6.