Angled decompositions of arborescent link complements
arXiv:math/0610775 · doi:10.1112/plms/pdn033
Abstract
This paper describes a way to subdivide a 3-manifold into angled blocks, namely polyhedral pieces that need not be simply connected. When the individual blocks carry dihedral angles that fit together in a consistent fashion, we prove that a manifold constructed from these blocks must be hyperbolic. The main application is a new proof of a classical, unpublished theorem of Bonahon and Siebenmann: that all arborescent links, except for three simple families of exceptions, have hyperbolic complements.
42 pages, 23 figures. Slightly expanded exposition and references