Topological groups with tractable minimal dynamics
Abstract
A Polish group G has the generic point property if any minimal G-flow admits a comeager orbit, or equivalently if the universal minimal flow (UMF) does. The class GPP of such Polish groups is a proper extension of the class PCMD of Polish groups with metrizable UMF. Motivated by analogous results for PCMD, we define and explore a robust generalization of GPP which makes sense for all topological groups, thus defining the class TMD of topological groups with tractable minimal dynamics. These characterizations yield novel results even for GPP; for instance, a Polish group is in GPP iff its UMF has no points of first countability. Motivated by work of Kechris, Pestov, and Todorcevi\'c that connects topological dynamics and structural Ramsey theory, we state and prove an abstract KPT correspondence which characterizes the class TMD and shows that TMD is 1 in the L\'evy hierarchy. We then develop set-theoretic methods which allow us to apply forcing and absoluteness arguments to generalize numerous results about GPP to all of TMD. We also apply these new set-theoretic methods to first generalize parts of Glasner's structure theorem for minimal, metrizable tame flows to the non-metrizable setting, and then to prove the revised Newelski conjecture regarding definable NIP groups. We conclude by discussing some tantalizing connections between definable NIP groups and TMD groups.
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