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Groups with infinitely many ends acting analytically on the circle

arXiv:1506.03839 · doi:10.1112/topo.12118

Abstract

This article takes the inspiration from two milestones in the study of non minimal actions of groups on the circle: Duminy's theorem about the number of ends of semi-exceptional leaves and Ghys' freeness result in analytic regularity. Our first result concerns groups of analytic diffeomorphisms with infinitely many ends: if the action is non expanding, then the group is virtually free. The second result is a Duminy's theorem for minimal codimension one foliations: either non expandable leaves have infinitely many ends, or the holonomy pseudogroup preserves a projective structure.

We can now make a precise reference to Deroin's work arXiv:1811.10298. 54 pages, 2 figures