On volumes and filling collections of multicurves

Abstract

Let S be a surface of negative Euler characteristic and consider a finite filling collection of closed curves on S in minimal position. An observation of Foulon and Hasselblatt shows that PT(S) is a finite-volume hyperbolic 3-manifold, where PT(S) is the projectivized tangent bundle and is the set of tangent lines to . In particular, vol(PT(S) ) is a mapping class group invariant of the collection . When is a filling pair of simple closed curves, we show that this volume is coarsely comparable to Weil-Petersson distance between strata in Teichm\"uller space. Our main tool is the study of stratified hyperbolic links in a Seifert-fibered space N over S. For such links, the volume of N is coarsely comparable to expressions involving distances in the pants graph.