On universal continuous actions on the Cantor set
Abstract
Using the notion of proper Cantor colorings we prove the following theorem. For any countably infinite group , there exists a free continuous action ζ: C on the Cantor set, which is universal in the following sense: for any free Borel action α: X on the standard Borel space, there exists an injective Borel map α: X C such that α α=ζ α. We extend our theorem for (nonfree) Borel (,Z)-actions, where Z is a uniformly recurrent subgroup.
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