Non-locally discrete actions on the circle with at most N fixed points

Abstract

A subgroup of Homeo+(S1) is M\"obius-like if every element is conjugate to an element of PSL(2,R). In general, a M\"obius-like subgroup of Homeo+(S1) is not necessarily (semi-)conjugate to a subgroup of PSL(2,R), as discovered by N. Kovacevi\'c [Trans. Amer. Math. Soc. 351 (1999), 4823-4835]. Here we determine simple dynamical criteria for the existence of such a (semi-)conjugacy. We show that M\"obius-like subgroups of Homeo+(S1) which are elementary (namely, preserving a Borel probability measure), are semi-conjugate to subgroups of PSL(2,R). On the other hand, we provide an example of elementary subgroup of Diff∞+(S1) satisfying that every non-trivial element fixes at most 2 points, which is not isomorphic to any subgroup of PSL(2,R). Finally, we show that non-elementary, non-locally discrete subgroups acting with at most N fixed points are conjugate to a dense subgroup of some finite central extension of PSL(2,R).