On indecomposable trees in the boundary of Outer space

Abstract

Let T be an R-tree, equipped with a very small action of the rank n free group Fn, and let H ≤ Fn be finitely generated. We consider the case where the action Fn T is indecomposable--this is a strong mixing property introduced by Guirardel. In this case, we show that the action of H on its minimal invarinat subtree TH has dense orbits if and only if H is finite index in Fn. There is an interesting application to dual algebraic laminations; we show that for T free and indecomposable and for H ≤ Fn finitely generated, H carries a leaf of the dual lamination of T if and only if H is finite index in Fn. This generalizes a result of Bestvina-Feighn-Handel regarding stable trees of fully irreducible automorphisms.