Topological dynamics of kaleidoscopic groups

Abstract

Kaleidoscopic groups are a class of permutation groups recently introduced by Duchesne, Monod, and Wesolek. Starting with a permutation group , the kaleidoscopic construction produces another permutation group K() which acts on a Wa\.zewski dendrite (a densely branching tree-like compact space). In this paper, we study how the topological dynamics of K() can be expressed in terms of the one of , when the group is transitive. By proving a Ramsey theorem for decorated rooted trees, we show that the universal minimal flow (UMF) of K() is metrizable iff is oligomorphic and the UMF of is metrizable. More generally, we give concrete calculations, in an appropriate model-theoretic framework, of the UMF of K() when the UMF of a point stabilizer c has a comeager orbit. Our results also give a large class of examples of non-metrizable UMFs with a comeager orbit. These results extend previous work of Kwiatkowska and Duchesne about the full homeomorphism groups.