Generators for automorphisms of special groups

Abstract

Let G be a (compact) special group in the sense of Haglund and Wise. We show that Out(G) is finitely generated, and provide a virtual generating set consisting of Dehn twists and ``pseudo-twists''. We exhibit instances where Dehn twists alone do not suffice and completely characterise this phenomenon: it is caused by certain abelian subgroups of G, called ``poison subgroups'', which can be removed by replacing G with a finite-index subgroup. Similar results hold for coarse-median preserving automorphisms, without the pathologies: For every special group G, the coarse-median preserving subgroups Out(G,[μ])≤ Out(G) are virtually generated by finitely many Dehn twists with respect to splittings of G over centralisers. Proofs are based on a novel, hierarchical version of Rips and Sela's shortening argument.