From zero surgeries to candidates for exotic definite four-manifolds

Manolescu, Ciprian; Piccirillo, Lisa

doi:10.48550/arxiv.2102.04391

Cited by 11 publications

(22 citation statements)

References 40 publications

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“…As she notes, the s-invariant plays a special role here: other known smooth concordance invariants, like the Heegaard Floer analogue τ , would not work for this strategy. This proof, and the s-invariant, gives a possible attack on the smooth 4-dimensional Poincaré conjecture [119] (see also [49,118]). Functoriality of Khovanov homology means that it also gives an invariant of surfaces in R 4 .…”

Section: Applicationsmentioning

confidence: 99%

Categorical lifting of the Jones polynomial: a survey

Khovanov¹,

Lipshitz²

2022

Preprint

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Section: Applicationsmentioning

confidence: 99%

Categorical lifting of the Jones polynomial: a survey

Khovanov¹,

Lipshitz²

2022

Preprint

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“…We now illustrate the use of the proposition above to find new examples of knots with finite u CP 2 and u CP 2 . Knots which are both positively slice and negatively slice were called biprojectively H-slice in [MP21].…”

Section: A Positive Crossingsmentioning

confidence: 99%

“…Since then, numerous connections have been established between sliceness and fundamental open problems in 4-manifold topology, including the smooth Poincaré conjecture [FGMW10] and the exactness of the surgery sequence for topological 4-manifolds [CF84] (see also [KOPR21]). Recent work [MMP20, MMSW19,MP21] indicates that slicing knots not only in B 4 but in more general definite 4-manifolds may answer long-standing questions about the existence of exotic smooth structures in dimension four. As an example, [MP21, Theorem 1.4] provides a list of 23 knots, such that if any of them bounds a smooth, properly embedded, null-homologous disk in (# m CP 2 ) B4 , for some m, then there exists an exotic smooth structure on # m CP 2 .…”

Section: Introductionmentioning

confidence: 99%

Slicing knots in definite 4-manifolds

Kjuchukova¹,

Miller²,

Ray³

et al. 2021

Preprint

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We study the CP 2 -slicing number of knots, i.e. the smallest m ≥ 0 such that a knot K ⊆ S 3 bounds a properly embedded, null-homologous disk in a punctured connected sum (# m CP 2 ) × . We give a lower bound on the smooth CP 2 -slicing number of a knot in terms of its double branched cover, and we find knots with arbitrarily large but finite smooth CP 2slicing number. We also give an upper bound on the topological CP 2 -slicing number in terms of the Seifert form and find knots for which the smooth and topological CP 2 -slicing numbers are both finite, nonzero, and distinct.

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“…If we could obstruct K from bounding a smoothly embedded disk in B 4 , then it follows that X cannot be diffeomorphic to S 4 . This approach was attempted in [FGMW10,MP21], but has yet to lead to a disproof of the conjecture.…”

Section: Fundamental Questions About the Structure Of θmentioning

confidence: 99%

“…1 The 3-dimensional homology cobordism group and the knot concordance group are fundamental structures in low-dimensional topology. The former played a key role in Manolescu's disproof of the high dimensional triangulation conjecture [Man16c], while the latter has the potential to shed light on the smooth 4-dimensional Poincaré conjecture (see, for example, [FGMW10,MP21]).…”

Section: Introductionmentioning

confidence: 99%