Automorphisms of profinite mapping class groups

Abstract

For S=Sg,n a closed orientable differentiable surface of genus g from which n points have been removed, such that (S)=2-2g-n<0, let P(S) be the pure mapping class group of S and P(S) and P(S) be, respectively, its profinite and its congruence completions, the latter being identified with the image of the natural representation P(S)Out(π1(S)) (where π1(S) is the profinite completion of the fundamental group of S). We determine the automorphism groups of procongruence completions under a natural rigidity condition, and show that the profinite Grothendieck-Teichm\"uller group embeds into the outer automorphism group of the profinite completion. Let OutI0(P(S)) and OutI0(P(S)) be the groups of outer automorphisms which preserve the conjugacy class of a procyclic subgroup generated by a nonseparating Dehn twist (a condition trivially satisfied for g=0). Our main result gives that, for (S)<g-2 and (g,n)≠ (1,2), there is a natural isomorphism: \[OutI0(P(S))n×GT,\] where n is the symmetric group on n letters and GT denotes the profinite Grothendieck-Teichm\"uller group. We also prove that, for (S)<g-2, there is a natural faithful representation GTOutI0(P(S)).