Outer actions of Out(Fn) on small right-angled Artin groups

Abstract

We determine the precise conditions under which SOut(Fn), the unique index two subgroup of Out(Fn), can act non-trivially via outer automorphisms on a RAAG whose defining graph has fewer than 1 2 n 2 vertices. We also show that the outer automorphism group of a RAAG cannot act faithfully via outer automorphisms on a RAAG with a strictly smaller (in number of vertices) defining graph. Along the way we determine the minimal dimensions of non-trivial linear representations of congruence quotients of the integral special linear groups over algebraically closed fields of characteristic zero, and provide a new lower bound on the cardinality of a set on which SOut(Fn) can act non-trivially.