A note on star-like configurations in finite settings

Abstract

Given E ⊂ Fqd, we show that certain configurations occur frequently when E is of sufficiently large cardinality. Specifically, we show that we achieve the statistically number of k-stars |\(x, x1, …, xk) ∈ Ek+1 : \| x - xi \| = ti \| when is |E| k qd+12. This result can be thought of as a natural generalization of the Erd os-Falconer distance problem. Our result improves on a pinned-version of our theorem which implied the above result, but only in the range |E| qd+k2. As an immediate corollary, this demonstrates that when |E| ck qd+12, then E determines a positive proportion of all k-stars. Our results also extend to the setting of integers mod q.