Exact orbifold fillings of contact manifolds

Gironella, Fabio; Zhou, Zhengyi

doi:10.48550/arxiv.2108.12247

Cited by 3 publications

(13 citation statements)

References 55 publications

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“…As a consequence, the claim follows. That W being a manifold follows from the same argument as in [11,Theorem C].…”

Section: Removing the Topologically Simple Assumptionmentioning

confidence: 95%

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On the intersection form of fillings

Zhou¹

2022

Preprint

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We prove, by an ad hoc method, that topologically simple exact fillings of flexibly fillable contact manifolds with vanishing first Chern class have unique integral intersection forms and discuss cases where the topologically simple assumption can be removed. We appeal to the special Reeb dynamics (stronger than ADC in [13]) on the contact boundary, while a more systematic approach working for general ADC manifolds is developed independently by Eliashberg, Ganatra and Lazarev [9].

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“…As a consequence, the claim follows. That W being a manifold follows from the same argument as in [11,Theorem C].…”

Section: Removing the Topologically Simple Assumptionmentioning

confidence: 95%

“…Then after choosing a trivialization of det C ⊕ N ξ for some N ∈ N + , we can assign a rational Conley-Zehnder index to each non-degenerate Reeb orbit [11,15]. For those orbits with torsion homology classes, the Conley-Zehnder index is independent of N and the trivialization.…”

Section: Proof Of Theorem 11mentioning

confidence: 99%

On the intersection form of fillings

Zhou¹

2022

Preprint

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“…Hence, to prove Theorem B, we need to enhance both the pseudoholomorphic curve argument and the topological argument. On the pseudo-holomorphic curve side, we use symplectic cohomology for exact orbifolds developed by Gironella and the author [38] and study the secondary coproduct on positive symplectic cohomology, which was proposed by Seidel [63], defined by Ekholm and Oancea [27], and recently studied extensively by Cieliebak, Hingston and Oancea [20,21,23]. Then, by a result of Eliashberg, Ganatra and Lazarev [31], we can get information on the intersection form of the filling.…”

Section: Introductionmentioning

confidence: 99%

On fillings of contact links of quotient singularities

Zhou

2024

Journal of Topology

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We study several aspects of fillings for links of general isolated quotient singularities using Floer theory, including co‐fillings, Weinstein fillings, strong fillings, exact fillings and exact orbifold fillings, focusing on the non‐existence of exact fillings of contact links of isolated terminal quotient singularities. We provide an extensive list of isolated terminal quotient singularities whose contact links are not exactly fillable, including for , which settles a conjecture of Eliashberg, quotient singularities from general cyclic group actions and finite subgroups of , and all terminal quotient singularities in complex dimension 3. We also obtain uniqueness of the orbifold diffeomorphism type of exact orbifold fillings of contact links of some isolated terminal quotient singularities.

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“…This idea was further explored in [PS21, CGHM + 21] which brought breakthroughs on dynamics on surfaces and C 0 symplectic geometry. Symplectic orbifolds were also used in [GZ21] to study the symplectic cobordism category of contact manifolds. From yet another point of view, they also appear in constructions of symplectic manifolds via the desingularisation process.…”

Section: Introductionmentioning

confidence: 99%

“…It is hence a natural direction of research that of extending well known and powerful techniques in smooth symplectic geometry to the orbifold setting. The first set of tools are pseudoholomorphic and Floer theories, which have been the object of study for instance in [CR02,CP14,GZ21]. This paper is devoted to extend the techniques in [Don96] to the orbifold setting.…”

Section: Introductionmentioning

confidence: 99%

Asymptotically holomorphic theory for symplectic orbifolds

Gironella¹,

Muñoz²,

Zhou³

2022

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We extend Donaldson's asymptotically holomorphic techniques to symplectic orbifolds. More precisely, given a symplectic orbifold such that the symplectic form defines an integer cohomology class, we prove that there exist sections of large tensor powers of the prequantizable line bundle such that their zero sets are symplectic suborbifolds. We then derive a Lefschetz hyperplane theorem for these suborbifolds, that computes their real cohomology up to middle dimension. We also get the hard Lefschetz and formality properties for them, when the ambient manifold satisfies those properties.

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Exact orbifold fillings of contact manifolds

Cited by 3 publications

References 55 publications

On the intersection form of fillings

On the intersection form of fillings

On fillings of contact links of quotient singularities

Asymptotically holomorphic theory for symplectic orbifolds

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