Dual metrics on the boundary of strictly polyhedral hyperbolic 3-manifolds
Abstract
Let M be a compact oriented 3-manifold with non-empty boundary consisting of surfaces of genii >1 such that the interior of M is hyperbolizable. We show that for each spherical cone-metric d on ∂ M such that all cone-angles are greater than 2π and the lengths of all closed geodesics that are contractible in M are greater than 2π there exists a unique strictly polyhedral hyperbolic metric on M such that d is the induced dual metric on ∂ M.
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