On Floer homology and the Berge conjecture on knots admitting lens space surgeries

Hedden, Matthew

doi:10.1090/s0002-9947-2010-05117-7

Cited by 57 publications

(72 citation statements)

References 28 publications

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“…This is a rational analogue of the Heegaard diagram for fibered knots constructed in [OS6], and may be useful for understanding the interaction between properties of the monodromy of a rational open book and those of the contact invariant. By combining the theorem with results of [Ni2] and [He4] (see also [Ra]) we arrive at the following corollary.…”

Section: Introductionmentioning

confidence: 73%

Dehn surgery, rational open books and knot Floer homology

Hedden

Plamenevskaya

2013

Algebr. Geom. Topol.

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Abstract. By recent results of Baker-Etnyre-Van Horn-Morris, a rational open book decomposition defines a compatible contact structure. We show that the Heegaard Floer contact invariant of such a contact structure can be computed in terms of the knot Floer homology of its (rationally null-homologous) binding. We then use this description of contact invariants, together with a formula for the knot Floer homology of the core of a surgery solid torus, to show that certain manifolds obtained by surgeries on bindings of open books carry tight contact structures.

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Section: Introductionmentioning

confidence: 73%

Dehn surgery, rational open books and knot Floer homology

Hedden

Plamenevskaya

2013

Algebr. Geom. Topol.

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“…16 For generic associated quotient tangles, w min and w max provide lower and upper bounds respectively for w(τ ( p q )) for any reduced p q ∈ Q. Proof The upper bound as claimed is established in Sect.…”

Section: Generic Tanglesmentioning

confidence: 94%

Surgery obstructions from Khovanov homology

Watson¹

2012

Sel. Math. New Ser.

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For a 3-manifold with torus boundary admitting an appropriate involution, we show that Khovanov homology provides obstructions to certain exceptional Dehn fillings. For example, given a strongly invertible knot in S 3 , we give obstructions to lens space surgeries, as well as obstructions to surgeries with finite fundamental group. These obstructions are based on homological width in Khovanov homology, and in the case of finite fundamental group depend on a calculation of the homological width for a family of Montesinos links.

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“…We may now prove the following theorem, which should be compared with Theorem 1.2 of [12] and Theorem 2.4 from [7]. Theorem 4.1 Let K X be a knot in a homology sphere L-space X of Seifert genus g.K/, and fix the above notation.…”

Section: Large Surgery On a Knotmentioning

confidence: 99%

“…The importance of studying knots inside rational homology spheres which have simple knot Floer homology came up in the study of the Berge conjecture using techniques from Heegaard Floer homology by Hedden [7], Rasmussen [14] and Baker, Grigsby and Hedden [1]. By definition, a knot K inside a rational homology sphere X has simple knot Floer homology if the rank of b HFK.X; K/ is equal to the rank of b HF.X / (see Oszváth and Szabó [11; 10] and Rasmussen [15] for the background on Heegaard Floer homology and knot Floer homology).…”

Section: Introductionmentioning

confidence: 99%