On regulated partitions
Abstract
This paper considers the combinatorics of continuous and Borel rectangular partitions of free actions of Zn on 0-dimensional Polish spaces, specifically the free part F(2Zn) of the shift action of Zn on the space 2Zn. This is done through the study of a corresponding notion of regulated partitions of Rn. The main concepts studied are the continuous and Borel 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 γc, γB are the minimum possible values of these numbers as we range over continuous (respectively Borel) rectangular partitions of F(2Zn). It is shown that for n=2 that γc=γB=3, and for n ≥ 3 that n+2≤ γB ≤ γc ≤ 3· 2n-2. For n=3 we improve this to γc=γB=5. This shows a striking difference between the Borel combinatorics of dimension n=2 and dimensions n>2.
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