Automorphism groups of measures on the Cantor space. Part I: Good measures and Rokhlin properties
Abstract
We study criteria for the existence of a dense or comeager conjugacy class in the automorphism group of a given measure on the Cantor space. We concentrate on good measures, defined by Akin [Trans.\ Amer.\ Math.\ Soc. 357 (2005), no. 7, 2681--2722], which we characterize as a particular subclass of ultrahomogeneous measures. We determine good measures with rational values on clopen sets whose automorphism group admits a comeager conjugacy class. Our approach uses the Fra\"iss\'e theory.
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