Dynamics on free-by-cyclic groups

Abstract

Given a free-by-cyclic group G = FN Z determined by any outer automorphism ∈ Out(FN) which is represented by an expanding irreducible train-track map f, we construct a K(G,1) 2-complex X called the folded mapping torus of f, and equip it with a semiflow. We show that X enjoys many similar properties to those proven by Thurston and Fried for the mapping torus of a pseudo-Anosov homeomorphism. In particular, we construct an open, convex cone A ⊂ H1(X;R) = Hom(G;R) containing the homomorphism u0 G Z having ker(u0) = FN, a homology class ε ∈ H1(X;R), and a continuous, convex, homogeneous of degree -1 function H R with the following properties. Given any primitive integral class u ∈ A there is a graph u ⊂ X such that: (1) the inclusion u X is π1-injective and π1(u) = ker(u), (2) u(ε) = (u), (3) u ⊂ X is a section of the semiflow and the first return map to u is an expanding irreducible train track map representing u ∈ Out(ker(u)) such that G = ker(u) _u Z, (4) the logarithm of the stretch factor of u is precisely H(u), (5) if was further assumed to be hyperbolic and fully irreducible then for every primitive integral u∈ A the automorphism u of ker(u) is also hyperbolic and fully irreducible.