Dimensions of sets which uniformly avoid arithmetic progressions

Abstract

We provide estimates for the dimensions of sets in R which uniformly avoid finite arithmetic progressions. More precisely, we say F uniformly avoids arithmetic progressions of length k ≥ 3 if there is an ε>0 such that one cannot find an arithmetic progression of length k and gap length >0 inside the ε neighbourhood of F. Our main result is an explicit upper bound for the Assouad (and thus Hausdorff) dimension of such sets in terms of k and ε. In the other direction, we provide examples of sets which uniformly avoid arithmetic progressions of a given length but still have relatively large Hausdorff dimension. We also consider higher dimensional analogues of these problems, where arithmetic progressions are replaced with arithmetic patches lying in a hyperplane. As a consequence we obtain a discretised version of a `reverse Kakeya problem': we show that if the dimension of a set in Rd is sufficiently large, then it closely approximates arithmetic progressions in every direction.