Group actions and geometric combinatorics in Fqd

Abstract

In this paper we apply a group action approach to the study of Erd os-Falconer type problems in vector spaces over finite fields and use it to obtain non-trivial exponents for the distribution of simplices. We prove that there exists s0(d)<d such that if E ⊂ Fqd, d 2, with |E| Cqs0, then |Tdd(E)| C'qd+1 2, where Tdk(E) denotes the set of congruence classes of k-dimensional simplices determined by k+1-tuples of points from E. Non-trivial exponents were previously obtained by Chapman, Erdogan, Hart, Iosevich and Koh (CEHIK12) for Tdk(E) with 2 ≤ k ≤ d-1. A non-trivial result for T22(E) in the plane was obtained by Bennett, Iosevich and Pakianathan (BIP12). These results are significantly generalized and improved in this paper. In particular, we establish the Wolff exponent 43, previously established in CEHIK12 for the q3 mod 4 case to the case q1 mod 4, and this results in a new sum-product type inequality. We also obtain non-trivial results for subsets of the sphere in Fqd, where previous methods have yielded nothing. The key to our approach is a group action perspective which quickly leads to natural and effective formulae in the style of the classical Mattila integral from geometric measure theory.