Zero-dimensional extensions of amenable group actions
Abstract
We prove that every dynamical system X with free action of a countable amenable group G by homeomorphisms has a zero-dimensional extension Y which is faithful and principal, i.e. every G-invariant measure μ on X has exactly one preimage on Y and the conditional entropy of with respect to X is zero. This is a version of an earlier result by T. Downarowicz and D. Huczek, which establishes the existence of zero-dimensional principal and faithful extensions for general actions of the group of integers.
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