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Weil-Petersson translation length and manifolds with many fibered fillings

We prove that any mapping torus of a pseudo-Anosov mapping class with bounded normalized Weil-Petersson translation length contains a finite set of transverse and level closed curves, and drilling out this set of curves results in one of a finite number of cusped hyperbolic 3-manifolds. The number of manifolds in the finite list depends only on the bound for normalized translation length. We also prove a complementary result that explains the necessity of removing level curves by producing new estimates for the Weil-Petersson translation length of compositions of pseudo-Anosov mapping classes and arbitrary powers of a Dehn twist.

preprint2020arXivOpen access
Christopher J. LeiningerYair N. MinskyJuan SoutoSamuel J. Taylor
math.CVmath.GTmath.DG
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Christopher J. LeiningerYair N. MinskyJuan SoutoSamuel J. Taylor

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