Envelopes in Outer Space

Abstract

We study the geometry of Outer Space CVn in regard of the asymmetric Lipschitz metric via envelopes, that is the set of all geodesics between two points. In the simplicial structure of CVn the envelopes are polytopes. We construct a piecewise unique geodesic between any two points in CVn by concatenating edges of these polytopes. In fact rigid geodesics can be identified with edges of out- and in-envelopes, that is the set of all geodesics from or to a base point with a given maximally stretched path. We introduce a notion of general position for pairs of points which is a dense and open condition. Using this we will show, that for almost all pairs of points in CVn their envelopes have dimension 3n-4. Whenever an envelope passes a face, it might change its dimension. This determines the simplicial structure of reduced Outer Space via the Lipschitz metric which implies Isom(CVnred)=Isom(CVn). As another implication we get that a geodesic ray in CV2 becomes after a given length rigid.