On regulated partitions
Abstract
This paper considers the combinatorics of continuous and Borel rectangular partitions of free actions of on -dimensional Polish spaces, specifically the free part of the shift action of on the space . This is done through the study of a corresponding notion of regulated partitions of . The main concepts studied are the continuous and Borel {\em regulation} numbers of the partition. This is defined as the maximum number of rectangles in the corresponding regulated partition that can intersect in a point. The continuous and Borel regulation numbers , are the minimum possible values of these numbers as we range over continuous (respectively Borel) rectangular partitions of . It is shown that for that , and for that . For we improve this to . This shows a striking difference between the Borel combinatorics of dimension and dimensions .
Cite
@article{arxiv.2603.04693,
title = {On regulated partitions},
author = {Su Gao and Steve Jackson},
journal= {arXiv preprint arXiv:2603.04693},
year = {2026}
}