Dynamics of Irreducible Endomorphisms of Fn

Abstract

We consider the class non-surjective irreducible endomorphisms of the free group Fn. We show that such an endomorphism φ is topologically represented by a simplicial immersion f:G → G of a marked graph G; along the way we classify the dynamics of ∂ φ acting on ∂ Fn: there are at most 2n fixed points, all of which are attracting. After imposing a necessary additional hypothesis on φ, we consider the action of φ on the closure CVn of the Culler-Vogtmann Outer space. We show that φ acts on CVn with "sink" dynamics: there is a unique fixed point [Tφ], which is attracting; for any compact neighborhood N of [Tφ], there is K=K(N), such that CVnφK(N) ⊂eq N. The proof uses certian projections of trees coming from invariant length measures. These ideas are extended to show how to decompose a tree T in the boundary of Outer space by considering the space of invariant length measures on T; this gives a decomposition that generalizes the decomposition of geometric trees coming from Imanishi's theorem.