Virtually Haken surgeries on once-punctured torus bundles

Abstract

We describe a class C of punctured torus bundles such that, for each M ∈ C, all but finitely many Dehn fillings on M are virtually Haken. We show that C contains infinitely many commensurability classes, and we give evidence that C includes representatives of ``most'' commensurability classes of punctured torus bundles. In particular, we define an integer-valued complexity function on monodromies f (essentially the length of the LR-factorization of f* in PSL2(Z)), and use a computer to show that if the monodromy of M has complexity at most 5, then M is finitely covered by an element of C. If the monodromy has complexity at most 12, then, with at most 36 exceptions, M is finitely covered by an element of C. We also give a method for computing ``algebraic boundary slopes'' in certain finite covers of punctured torus bundles.

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