A Furstenberg-Katznelson-Weiss type theorem on (d + 1)-point configurations in sets of positive density in finite field geometries

TL;DR

This paper proves that large subsets of finite field vector spaces contain many specific (d+1)-point configurations, extending geometric combinatorics results to finite fields with quantitative bounds.

Contribution

It establishes a finite field analogue of a Furstenberg-Katznelson-Weiss type theorem for (d+1)-point configurations with explicit density and quantity bounds.

Findings

Large sets in finite fields contain many (d+1)-point configurations.

Quantitative bounds depend on the density parameter .

The result generalizes classical geometric theorems to finite field settings.

Abstract

We show that if $E \subset \mathbb{F}_q^d$, the $d$-dimensional vector space over the finite field with $q$ elements, and $|E| \geq \rho q^d$, where $ q^{-\frac{1}{2}}\ll \rho \leq 1$, then $E$ contains an isometric copy of at least $c \rho^{d-1} q^{d+1 \choose 2}$ distinct $(d+1)$-point configurations.