Irreducible laminations for IWIP Automorphisms of free products and Centralisers

Abstract

For every free product decomposition G = G1 ... Gq Fr, where Fr is a finitely generated free group, of a group G of finite Kurosh rank, we can associate some (relative) outer space O. In this paper, we develop the theory of (stable) laminations for (relative) irreducible with irreducible powers (IWIP) automorphisms. In particular, we examine the action of Out(G, O) ≤ Out(G) (i.e. the automorphisms which preserve the set of conjugacy classes of Gi's) on the set of laminations. We generalise the theory of the attractive laminations associated to automorphisms of finitely generated free groups. The strategy is the same as in the classical case (see BFM), but some statements are slightly different because of the existence of the Gi's. More precisely, we prove that the stabiliser of the lamination of a relative IWIP is a Z-extension of a subgroup that is consisted of virtually elliptic automorphisms. Note that in the free case, virtually elliptic automorphisms are exactly the finite order automorphisms of Out(Fn). As a corollary of the previous theorem, we generalise the fact that the centraliser of an IWIP automorphism of a free group, is virtually cyclic. As a direct corollary, if Out(G) is virtually torsion free and every Aut(Gi) is finite, we prove that the centraliser of an IWIP is virtually cyclic. Finally, we give an example which shows that we cannot expect that in general the centraliser of a relative IWIP (and as a consequence the stabiliser of its stable lamination) is virtually cyclic.