Proof of the Kakeya set conjecture over rings of integers modulo square-free N

Abstract

A Kakeya set S ⊂ (Z/NZ)n is a set containing a line in each direction. We show that, when N is any square-free integer, the size of the smallest Kakeya set in (Z/NZ)n is at least Cn,ε Nn - ε for any ε -- resolving a special case of a conjecture of Hickman and Wright. Previously, such bounds were only known for the case of prime N. We also show that the case of general N can be reduced to lower bounding the Fp rank of the incidence matrix of points and hyperplanes over (Z/pkZ)n.