Rigidity of mapping class group actions on S1
Abstract
The mapping class group Modg, 1 of a surface with one marked point can be identified with an index two subgroup of Aut(π1 g). For a surface of genus g ≥ 2, we show that any action of Modg, 1 on the circle is either semi-conjugate to its natural action on the Gromov boundary of π1 g, or factors through a finite cyclic group. For g ≥ 3, all finite actions are trivial. This answers a question of Farb.
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