On the smallest non-abelian quotient of Aut(Fn)

Abstract

We show that the smallest non-abelian quotient of Aut(Fn) is PSLn(Z/2Z) = Ln(2), thus confirming a conjecture of Mecchia--Zimmermann. In the course of the proof we give an exponential (in n) lower bound for the cardinality of a set on which SAut(Fn), the unique index 2 subgroup of Aut(Fn), can act non-trivially. We also offer new results on the representation theory of SAut(Fn) in small dimensions over small, positive characteristics, and on rigidity of maps from SAut(Fn) to finite groups of Lie type and algebraic groups in characteristic 2.