Extending powers of pseudo-Anosovs
Abstract
Biringer, Johnson, and Minsky showed that a pseudo-Anosov map on a boundary component of an irreducible 3-manifold has a power that partially extends to the interior if and only if the (un)stable laminations of f is an R-projective limit of meridians. We prove that the power required for a pseudo-Anosov map to partially extend is not universally bounded. We construct a family of pseudo-Anosov maps fi for all i=1,2... on a boundary component of a family of irreducible 3-manifolds Mi such that fii partially extends to the interior of Mi but fij does not for j<i.
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