C1 actions on the circle of finite index subgroups of Mod(g), Aut(Fn), and Out(Fn)

Abstract

Let g be a closed, connected, and oriented surface of genus g ≥ 24 and let be a finite index subgroup of the mapping class group Mod(g) that contains the Torelli group I(g). Then any orientation preserving C1 action of on the circle cannot be faithful. We also show that if is a finite index subgroup of Aut(Fn), when n ≥ 8, that contains the subgroup of IA-automorphisms, then any orientation preserving C1 action of on the circle cannot be faithful. Similarly, if is a finite index subgroup of Out(Fn), when n ≥ 8, that contains the Torelli group Tn, then any orientation preserving C1 action of on the circle cannot be faithful. In fact, when n ≥ 10, any orientation preserving C1 action of a finite index subgroup of Aut(Fn) or Out(Fn) on the circle cannot be faithful.