Effective length-projection bounds for hyperbolic 3-manifolds diffeomorphic to S×R
Abstract
We give a formula with explicit constants relating the subsurface projection dY(-,+) of the end invariants -,+ of a hyperbolic 3-manifold Q diffeomorphic to S×R and the length of the geodesic representative in Q of the multicurve ∂ Y. This makes effective and computable the large projections versus short curves relation proved by Minsky. We give an application to closed hyperbolic 3-manifolds fibering over the circle providing a geometric analog of the uniform projection bound in fibered faces of Minsky and Taylor.
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