Improved bounds for embedding certain configurations in subsets of vector spaces over finite fields

Abstract

The fourth listed author and Hans Parshall (IosevichParshall) proved that if E ⊂ Fqd, d 2, and G is a connected graph on k+1 vertices such that the largest degree of any vertex is m, then if |E| C qm+d-12, for any t>0, there exist k+1 points x1, …, xk+1 in E such that ||xi-xj||=t if the i'th vertex is connected to the j'th vertex by an edge in G. In this paper, we give several indications that the maximum degree is not always the right notion of complexity and prove several concrete results to obtain better exponents than the Iosevich-Parshall result affords. This can be viewed as a step towards understanding the right notion of complexity for graph embeddings in subsets of vector spaces over finite fields.