Quotient and blow-up of automorphisms of graphs of groups

Abstract

In this paper we study the quotient and "blow-up" of graph-of-groups G and of their automorphisms H: G → G. We show that the existence of such a "blow-up" of H: G → G relative to a given family of "local" graph-of-groups isomorphisms Hi: Gi → Gi depends crucially on the Hi-conjugacy class of the correction term δ(Ei) for any edge Ei of G, where H-congjugacy is a new but natural concept introduced here. As an application we obtain a criterion as to whether a partial Dehn twist can be blown up relative to local Dehn twists to give an actual Dehn twist.