L-space intervals for Graph Manifolds and Cables
Abstract
We present a graph manifold analog of the Jankins-Neumann classification of Seifert fibered spaces over S2 admitting taut foliations, providing a finite recursive formula to compute the L-space Dehn-filling interval for any graph manifold with torus boundary. As an application of a generalization of this result to Floer simple manifolds, we compute the L-space interval for any cable of a Floer simple knot complement in a closed three-manifold in terms of the original L-space interval, recovering a result of Hedden and Hom as a special case.
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