Representations of surface groups with finite mapping class group orbits

Abstract

Let (S,\, ) be a closed oriented surface with a marked point, let G be a fixed group, and let π1(S) G be a representation such that the orbit of under the action of the mapping class group Mod(S,\, ) is finite. We prove that the image of is finite. A similar result holds if π1(S) is replaced by the free group Fn on n≥ 2 generators and where Mod(S,\, ) is replaced by Aut(Fn). We thus resolve a well-known question of M. Kisin. We show that if G is a linear algebraic group and if the representation variety of π1(S) is replaced by the character variety, then there are infinite image representations which are fixed by the whole mapping class group.