Spheres and Projections for Out(Fn)

Abstract

The outer automorphism group Out(F2g) of a free group on 2g generators naturally contains the mapping class group of a punctured surface as a subgroup. We define a subsurface projection of the sphere complex of the connected sum of n copies of S1 x S2 into the arc complex of the surface and use this to show that this subgroup is a Lipschitz retract of Out(F2g). We also use subsurface projections to give a simple proof of a result of Handel and Mosher [HM10] stating that stabilizers of conjugacy classes of free splittings and corank 1 free factors in a free group Fn are Lipschitz retracts of Out(Fn).