Yair N. Minsky
Published 2001-05-10Version 1
We show that a Kleinian surface group, or hyperbolic 3-manifold with a cusp-preserving homotopy-equivalence to a surface, has bounded geometry if and only if there is an upper bound on an associated collection of coefficients that depend only on its end invariants. Bounded geometry is a positive lower bound on the lengths of closed geodesics. When the surface is a once-punctured torus, the coefficients coincide with the continued fraction coefficients associated to the ending laminations. Applications include an improvement to the bounded geometry versions of Thurston's ending lamination conjecture, and of Bers' density conjecture.
Comments: 49 pages, 13 figures. Revised from IMS preprint version, with additional introductory material. To appear in Invent. Math
The classification of Kleinian surface groups, I: Models and bounds
The classification of Kleinian surface groups, II: The Ending Lamination Conjecture
Cone-manifolds and the density conjecture
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