Congruence classes of large configurations in vector spaces over finite fields

Abstract

Bennett, Hart, Iosevich, Pakianathan, and Rudnev found an exponent s<d such that any set E⊂ Fqd with |E| qs determines qk+12 congruence classes of (k+1)-point configurations for k≤ d. Because congruence classes can be identified with tuples of distances between distinct points when k≤ d, and because there are k+12 such pairs, this means any such E determines a positive proportion of all congruence classes. In the k>d case, fixing all pairs of distnaces leads to an overdetermined system, so qk+12 is no longer the correct number of congruence classes. We determine the correct number, and prove that |E| qs still determines a positive proportion of all congruence classes, for the same s as in the k≤ d case.