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Splicing integer framed knot complements and bordered Heegaard Floer homology

Author(s): Hanselman, Jonathan

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Abstract: We consider the following question: when is the manifold obtained by gluing together two knot complements an L-space? Hedden and Levine proved that splicing 0-framed complements of nontrivial knots never produces an L-space. We extend this result to allow for arbitrary integer framings. We find that splicing two integer framed nontrivial knot complements only produces an L-space if both knots are L-space knots and the framings lie in an appropriate range. The proof involves a careful analysis of the bordered Heegaard Floer invariants of each knot complement.
Publication Date: 2017
Electronic Publication Date: 6-Dec-2017
Citation: Hanselman, Jonathan. (2017). Splicing integer framed knot complements and bordered Heegaard Floer homology. QUANTUM TOPOLOGY, 8 (715 - 748. doi:10.4171/QT/100
DOI: doi:10.4171/QT/100
ISSN: 1663-487X
EISSN: 1664-073X
Pages: 715 - 748
Type of Material: Journal Article
Journal/Proceeding Title: QUANTUM TOPOLOGY
Version: Author's manuscript



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