Hausdorff Dimension Regularity Properties and Games
Abstract
The Hausdorff -dimension game was introduced by Das, Fishman, Simmons and {Urba{\'n}ski} and shown to characterize sets in having Hausdorff dimension . We introduce a variation of this game which also characterizes Hausdorff dimension and for which we are able to prove an unfolding result similar to the basic unfolding property for the Banach-Mazur game for category. We use this to derive a number of consequences for Hausdorff dimension. We show that under any wellordered union of sets each of which has Hausdorff dimension has dimension . We establish a continuous uniformization result for Hausdorff dimension. The unfolded game also provides a new proof that every set of Hausdorff dimension contains a compact subset of dimension for any , and this result generalizes to arbitrary sets under .
Cite
@article{arxiv.2003.11578,
title = {Hausdorff Dimension Regularity Properties and Games},
author = {Logan Crone and Lior Fishman and Stephen Jackson},
journal= {arXiv preprint arXiv:2003.11578},
year = {2020}
}