Train tracks and measured laminations on infinite surfaces

Abstract

Let X be an infinite Riemann surface equipped with its conformal hyperbolic metric such that the action of the covering group π1(X) on X is of the first kind-i.e., the surface X is equal to its convex core. We first prove that any geodesic lamination on X is nowhere dense. Given a fixed geodesic pants decomposition of X we define a family of train tracks on X such that any geodesic lamination of X is weakly carried by at least one train track. Then we parametrize all measured laminations on X carried by a train track by the corresponding edge weight systems on the train track. Furthermore, we show that the weak* topology on the measured laminations weakly carried by a train track corresponds to a pointwise (weak) convergence of the edge weight systems. When one considers the Teichm\"uller space T(X) of the Riemann surface X, it is natural to restrict the attention to the space MLb(X) of bounded measured laminations. When X has a bounded geometry, we prove that a measured lamination weakly carried by a train track is bounded if and only if the corresponding edge weight system has a finite supremum norm. The Teichm\"uller space considerations lead to a natural uniform weak* topology on the space of bounded measured laminations on X. We prove that the correspondence between bounded measured laminations weakly carried by a train track and their edge weight systems is a homeomorphism when MLb(X) is equipped with the uniform weak* topology and the edge weight system is equipped with the topology induced by the supremum norm.