Liftable automorphisms of right-angled Artin groups

Abstract

Given a regular covering map : of graphs, we investigate the subgroup LAut() of the automorphism group Aut(A) of the right-angled Artin group A. This subgroup comprises all automorphisms that can be lifted to automorphisms of A. We first show that LAut() is generated by a finite subset of Laurence's elementary automorphisms. For the subgroup FAut() of Aut(A), which consists of lifts of automorphisms in LAut(), there exists a natural homomorphism FAut()LAut() induced by . We then show that the kernel of this homomorphism is virtually a subgroup of the Torelli subgroup IA(A) and deduce a short exact sequence reminiscent of results from the Birman--Hilden theory for surfaces.