Floer Simple Manifolds and L-Space Intervals
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Peer-reviewed
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Abstract
An oriented three-manifold with torus boundary admits either no L-space Dehn filling, a unique L-space filling, or an interval of L-space fillings. In the latter case, which we call “Floer simple,” we construct an invariant which computes the interval of L-space filling slopes from the Turaev torsion and a given slope from the interval's interior. As applications, we give a new proof of the classification of Seifert fibered L-spaces over , and prove a special case of a conjecture of Boyer and Clay [6] about L-spaces formed by gluing three-manifolds along a torus.
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Advances in Mathematics
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Journal ISSN
0001-8708
1090-2082
1090-2082
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322
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Elsevier
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Except where otherwised noted, this item's license is described as Attribution 4.0 International
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Engineering and Physical Sciences Research Council (EP/M000648/1)
Engineering and Physical Sciences Research Council (EP/L026481/1)
Engineering and Physical Sciences Research Council (EP/L026481/1)