Handlebodies, Outer space, and tropical geometry

Abstract

The moduli space of graphs Mg,ntrop is a polyhedral object that mimics the behavior of the moduli spaces Mg,n, Mg,n of (stable) Riemann surfaces; this relationship has been made precise in several different ways, which collectively identify Mg,ntrop as the "tropicalization" of Mg,n. We describe how this relationship lifts to some objects that live over Mg,n (like Teichm\"uller space) and that live over Mg,ntrop (like the Culler-Vogtmann space CVg,n*). We introduce the notion of a stable complex handlebody, and show that CVg,n* can be viewed as the tropicalization of a certain complex manifold hT(Vg,n) that parametrizes complex handlebodies. An important ingredient is our construction of a partial compactification hT(Vg,n)⊃ hT(Vg,n), which we prove is a simply connected complex manifold with simple normal crossings boundary. When n=0, hT(Vg,n) coincides with the moduli space of Schottky groups, hT(Vg,n) coincides with Gerritzen-Herrlich's extended Schottky space, and CVg,0* is the simplicial completion of the original Outer space. The resulting picture fits together many familiar objects from geometric group theory and surface topology, including Harvey's curve complex, mapping class groups of surfaces and handlebodies, and augmented Teichm\"uller space. Many of the relationships between the objects that we see in this picture already exist in the literature, but we add some new ones, and generalize several existing relationships to include a number n>0 of punctures/leaves.