Asymmetry of Outer Space of a free product

Abstract

For every free product decomposition G = G1 ... Gq Fr of a group of finite Kurosh rank G, where Fr is a finitely generated free group, we can associate some (relative) outer space O. We study the asymmetry of the Lipschitz metric dR on the (relative) Outer space O. More specifically, we generalise the construction of Algom-Kfir and Bestvina, introducing an (asymmetric) Finsler norm \|·\|L that induces dR. Let's denote by Out(G, O) the outer automorphisms of G that preserve the set of conjugacy classes of Gi's. Then there is an Out(G, O)-invariant function : O → R such that when \| · \|L is corrected by d , the resulting norm is quasisymmetric. As an application, we prove that if we restrict dR to the ε-thick part of the relative Outer space for some ε >0, is quasi-symmetric . Finally, we generalise for IWIP automorphisms of a free product a theorem of Handel and Mosher, which states that there is a uniform bound which depends only on the group, on the ratio of the relative expansion factors of any IWIP φ ∈ Out(Fn) and its inverse.