Measurable domatic partitions

Abstract

Let be a compact Polish group of finite topological dimension. For a countably infinite subset S⊂eq , a domatic 0-partition (for its Schreier graph on ) is a partial function f: such that for every x∈ , one has f[S· x]=N. We show that a continuous domatic 0-partition exists, if and only if a Baire measurable domatic 0-partition exists, if and only if the topological closure of S is uncountable. A Haar measurable domatic 0-partition exists for all choices of S. We also investigate domatic partitions in the general descriptive graph combinatorial setting.

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