The range of dimensions of microsets

Abstract

We say that E is a microset of the compact set K⊂ Rd if there exist sequences λn≥ 1 and un∈ Rd such that (λn K + un ) [0,1]d converges to E in the Hausdorff metric, and moreover, E (0, 1)d ≠ . The main result of the paper is that for a non-empty set A⊂ [0,d] there is a compact set K⊂ Rd such that the set of Hausdorff dimensions attained by the microsets of K equals A if and only if A is analytic and contains its infimum and supremum. This answers a question of Fraser, Howroyd, K\"aenm\"aki, and Yu. We show that for every compact set K⊂ Rd and non-empty analytic set A⊂ [0,H K] there is a set C of compact subsets of K which is compact in the Hausdorff metric and \H C: C∈ C \=A. The proof relies on the technique of stochastic co-dimension applied for a suitable coupling of fractal percolations with generation dependent retention probabilities. We also examine the analogous problems for packing and box dimensions.