The Assouad dimension of Kakeya sets in R3

Abstract

This paper studies the structure of Kakeya sets in R3. We show that for every Kakeya set K⊂R3, there exist well-separated scales 0<δ<≤ 1 so that the δ neighborhood of K is almost as large as the neighborhood of K. As a consequence, every Kakeya set in R3 has Assouad dimension 3 and every Ahlfors-David regular Kakeya set in R3 has Hausdorff dimension 3. We also show that every Kakeya set in R3 that has "stably equal" Hausdorff and packing dimension (this is a new notion, which is introduced to avoid certain obvious obstructions) must have Hausdorff dimension 3. The above results follow from certain multi-scale structure theorems for arrangements of tubes and rectangular prisms in three dimensions, and a mild generalization of the sticky Kakeya theorem previously proved by the authors.