Groups with classifiable actions on the line

Abstract

We motivate and study the class C of countable groups G such that the conjugacy relation between minimal actions of G on R by orientation-preserving homeomorphisms is smooth -- that is, admits a Borel transversal. No example of amenable group outside of C is known. We show a number of stability properties of C under group-theoretic operations and that C contains all finitely generated groups of piecewise affine homeomorphisms of the interval. We exhibit a finitely generated group G that is not in C, such that G is amenable if and only if Thompson's group F is amenable. We also prove that the semiconjugacy relation among cocompact actions of a countable group G is smooth if and only if G ∈ C, and that it is essentially countable even when G is not finitely generated. In the Appendix, we show that there is no good analogue of the space of harmonic actions for a countable non-finitely generated group.