Co-orientable taut foliations in Dehn fillings of pseudo-Anosov mapping tori with co-orientation-reversing monodromy
Abstract
Let be a compact orientable surface with nonempty boundary, let : be an orientation-preserving pseudo-Anosov homeomorphism, and let M = × I / be the mapping torus of over . Let Fs denote the stable foliation of in . Let T1, …, Tk denote the boundary components of M. With respect to a canonical choice of meridian and longitude on each Ti, the degeneracy locus of the suspension flow of on Ti can be identified with a pair of integers (pi; qi) such that pi > 0 and -12pi < qi ≤slant 12pi. Let ci denote the number of components of Ti ( × \0\). Assume that Fs is co-orientable and reverses the co-orientation on Fs. We show that the Dehn filling of M along ∂ M with any multislope in J1 × … × Jk admits a co-orientable taut foliation, where Ji is one of the two open intervals in R \∞\ RP1 between piqi + ci, piqi - ci which doesn't contain piqi. For some hyperbolic fibered knot manifolds, the slopes given above contain all slopes that yield non-L-space Dehn filllings. The examples include (1) the exterior of the (-2,3,2q+1)-pretzel knot in S3 for each q ∈ Z≥slant 3 (see [Kri][Kri] for a previous proof), (2) the exteriors of many L-space knots in lens spaces.
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