Borel Combinatorics of Abelian Group Actions

Abstract

We study the free part of the Bernoulli action of Zn for n≥ 2 and the Borel combinatorics of the associated Schreier graphs. We construct orthogonal decompositions of the spaces into marker sets with various additional properties. In general, for Borel graphs admitting weakly orthogonal decompositions, we show that B()≤ 2()-1 under some mild assumptions. As a consequence, we deduce that the Borel chromatic number for F(2Zn) is 3 for all n≥ 2. Weakly orthogonal decompositions also give rise to Borel unlayered toast structures. We also construct orthogonal decompositions of F(2Z2) with strong topological regularity, in particular with all atoms homeomorphic to a disk. This allows us to show that there is a Borel perfect matching for F(2Zn) for all n≥ 2 and that there is a Borel lining of F(2Z2).