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37 results on '"Niederkrüger, Klaus"'

1. Vanishing cycles of symplectic foliations

Author

Gironella, Fabio, Niederkrüger, Klaus, and Toussaint, Lauran

Subjects
Mathematics - Symplectic Geometry, Mathematics - Geometric Topology, 57R17, 53D35, 57R30, 53C12
Abstract

Several results in recent years have shown that the usual generalizations of taut foliations to higher dimensions, based only on topological concepts, lead to a theory that lacks the complexity of its 3-dimensional counterpart. Instead, we propose strong symplectic foliations as natural candidates for such a generalization and we prove in this article that they do yield some interesting rigidity results, such as potentially topological obstructions on the underlying ambient manifold. We introduce a high-dimensional generalization of 3-dimensional vanishing cycles for symplectic foliations, which we call Lagrangian vanishing cycles, and prove that they prevent a symplectic foliation from being strong, just as vanishing cycles prevent tautness in dimension 3 due to the classical result of Novikov from 1964. We then describe, in every codimension, examples of symplectically foliated manifolds which admit Lagrangian vanishing cycles, but for which more classical arguments fail to obstruct strongness. In codimension 1, this is achieved by a rather explicit modification of the symplectic foliation, which allows us to open up closed leaves having non-trivial holonomy on both sides, and is thus of independent interest. Since there is no comprehensive source on holomorphic curves with boundary in symplectic foliations, we also give a detailed introduction to much of the analytic theory, in the hope that it might serve as a reference for future work in this direction., Comment: v2: 62 pages; restructured introduction and expanded some explanations throughout the manuscript

Published
2024

2. On properties of Bourgeois contact structures

Author

Lisi, Samuel, Marinković, Aleksandra, and Niederkrüger, Klaus

Subjects
Mathematics - Symplectic Geometry, 53D10
Abstract

The Bourgeois construction associates to every contact open book on a manifold $V$ a contact structure on $V\times T^2$. We study in this article some of the properties of $V$ that are inherited by $V\times T^2$ and some that are not. Giroux has provided recently a suitable framework to work with contact open books. In the appendix of this article, we quickly review this formalism, and we work out a few classical examples of contact open books to illustrate how to use this new language., Comment: 25 pages; reorganized structure of paper, addressed Gironella's work on Bourgeois structures, improved exposition and added examples

Published
2018
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3. Examples of non-trivial contact mapping classes in all dimensions

Author

Massot, Patrick and Niederkrüger, Klaus

Subjects
Mathematics - Symplectic Geometry, Mathematics - Geometric Topology, 57R17 (Primary) 53D10, 32Q65, 57R52, 53D12 (Secondary)
Abstract

We give examples of contactomorphisms in every dimension that are smoothly isotopic to the identity but that are not contact isotopic to the identity. In fact, we prove the stronger statement that they are not even symplectically pseudo-isotopic to the identity. We also give examples of pairs of contactomorphisms which are smoothly conjugate to each other but not by contactomorphisms., Comment: 14 pages, 1 figure v2: Made some exposition improvements, corrected a mistake pointed out by Sylvain Courte in the proof of Observation 2.1. To appear in IMRN

Published
2015
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4. Subcritical contact surgeries and the topology of symplectic fillings

Author

Ghiggini, Paolo, Niederkrüger, Klaus, and Wendl, Chris

Subjects
Mathematics - Symplectic Geometry, 57R17 (Primary), 53D10, 32Q65, 57R65 (Secondary)
Abstract

By a result of Eliashberg, every symplectic filling of a three-dimensional contact connected sum is obtained by performing a boundary connected sum on another symplectic filling. We prove a partial generalization of this result for subcritical contact surgeries in higher dimensions: given any contact manifold that arises from another contact manifold by subcritical surgery, its belt sphere is null-bordant in the oriented bordism group $\Omega SO^*(W)$ of any symplectically aspherical filling $W$, and in dimension five, it will even be nullhomotopic. More generally, if the filling is not aspherical but is semipositive, then the belt sphere will be trivial in $H^*(W)$. Using the same methods, we show that the contact connected sum decomposition for tight contact structures in dimension three does not extend to higher dimensions: in particular, we exhibit connected sums of manifolds of dimension at least five with Stein fillable contact structures that do not arise as contact connected sums. The proofs are based on holomorphic disk-filling techniques, with families of Legendrian open books (so-called "Lobs") as boundary conditions., Comment: 42 pages, 6 figures. (accepted by Journal de l'\'Ecole polytechnique)

Published
2014
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5. Higher dimensional contact topology via holomorphic disks

Author

Niederkrüger, Klaus

Subjects
Mathematics - Symplectic Geometry, 53D35
Abstract

These notes are based on a course that took place at the Universit\'e de Nantes in June 2011 during the "Trimester on Contact and Symplectic Topology". We will explain how holomorphic curves can be used to study symplectic fillings of a given contact manifold. Our main goal consists in showing that certain contact manifolds do not admit any symplectic filling at all., Comment: 58 pages, 5 figures

Published
2013
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6. Loose Legendrians and the plastikstufe

Author

Murphy, Emmy, Niederkrüger, Klaus, Plamenevskaya, Olga, and Stipsicz, András I.

Subjects
Mathematics - Symplectic Geometry, Mathematics - Geometric Topology
Abstract

We show that the presence of a plastikstufe induces a certain degree of flexibility in contact manifolds of dimension 2n+1>3. More precisely, we prove that every Legendrian knot whose complement contains a "nice" plastikstufe can be destabilized (and, as a consequence, is loose). As an application, it follows in certain situations that two non-isomorphic contact structures become isomorphic after connect-summing with a manifold containing a plastikstufe.

Published
2012
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7. Weak and strong fillability of higher dimensional contact manifolds

Author

Massot, Patrick, Niederkrüger, Klaus, and Wendl, Chris

Subjects
Mathematics - Symplectic Geometry, Mathematics - Geometric Topology, 57R17 (Primary) 53D10, 32Q65, 53D42 (Secondary)
Abstract

For contact manifolds in dimension three, the notions of weak and strong symplectic fillability and tightness are all known to be inequivalent. We extend these facts to higher dimensions: in particular, we define a natural generalization of weak fillings and prove that it is indeed weaker (at least in dimension five),while also being obstructed by all known manifestations of "overtwistedness". We also find the first examples of contact manifolds in all dimensions that are not symplectically fillable but also cannot be called overtwisted in any reasonable sense. These depend on a higher-dimensional analogue of Giroux torsion, which we define via the existence in all dimensions of exact symplectic manifolds with disconnected contact boundary., Comment: 68 pages, 5 figures. v2: Some attributions clarified, and other minor edits. v3: exposition improved using referee's comments. Published by Invent. Math

Published
2011
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8. The Weinstein conjecture in the presence of submanifolds having a Legendrian foliation

Author

Niederkrüger, Klaus and Rechtman, Ana

Subjects
Mathematics - Dynamical Systems, Mathematics - Symplectic Geometry, 34J45, 53D10, 53D35
Abstract

Helmut Hofer introduced in '93 a novel technique based on holomorphic curves to prove the Weinstein conjecture. Among the cases where these methods apply are all contact 3--manifolds $(M,\xi)$ with $\pi_2(M) \ne 0$. We modify Hofer's argument to prove the Weinstein conjecture for some examples of higher dimensional contact manifolds. In particular, we are able to show that the connected sum with a real projective space always has a closed contractible Reeb orbit., Comment: 11 pages, 2 figures

Published
2011
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9. Weak Symplectic Fillings and Holomorphic Curves

Author

Niederkrüger, Klaus and Wendl, Chris

Subjects
Mathematics - Symplectic Geometry, 32Q65, 57R17
Abstract

We prove several results on weak symplectic fillings of contact 3-manifolds, including: (1) Every weak filling of any planar contact manifold can be deformed to a blow up of a Stein filling. (2) Contact manifolds that have fully separating planar torsion are not weakly fillable - this gives many new examples of contact manifolds without Giroux torsion that have no weak fillings. (3) Weak fillability is preserved under splicing of contact manifolds along symplectic pre-Lagrangian tori - this gives many new examples of contact manifolds without Giroux torsion that are weakly but not strongly fillable. We establish the obstructions to weak fillings via two parallel approaches using holomorphic curves. In the first approach, we generalize the original Gromov-Eliashberg "Bishop disk" argument to study the special case of Giroux torsion via a Bishop family of holomorphic annuli with boundary on an "anchored overtwisted annulus". The second approach uses punctured holomorphic curves, and is based on the observation that every weak filling can be deformed in a collar neighborhood so as to induce a stable Hamiltonian structure on the boundary. This also makes it possible to apply the techniques of Symplectic Field Theory, which we demonstrate in a test case by showing that the distinction between weakly and strongly fillable translates into contact homology as the distinction between twisted and untwisted coefficients., Comment: 42 pages, several figures; minor corrections; accepted by Annales Scientifiques de l'Ecole Normale Sup\'erieure

Published
2010
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10. Some remarks on the size of tubular neighborhoods in contact topology and fillability

Author

Niederkrüger, Klaus and Presas, Francisco

Subjects
Mathematics - Symplectic Geometry, 57R17, 53D35
Abstract

The well-known tubular neighborhood theorem for contact submanifolds states that a small enough neighborhood of such a submanifold N is uniquely determined by the contact structure on N, and the conformal symplectic structure of the normal bundle. In particular, if the submanifold N has trivial normal bundle then its tubular neighborhood will be contactomorphic to a neighborhood of Nx{0} in the model space NxR^{2k}. In this article we make the observation that if (N,\xi_N) is a 3-dimensional overtwisted submanifold with trivial normal bundle in (M,\xi), and if its model neighborhood is sufficiently large, then (M,\xi) does not admit an exact symplectic filling., Comment: 19 pages, 2 figures; added example of manifold that is not fillable by neighborhood criterium; typos

Published
2008
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11. Towards a good definition of algebraically overtwisted

Author

Bourgeois, Frédéric and Niederkrüger, Klaus

Subjects
Mathematics - Symplectic Geometry, 53D10
Abstract

Symplectic field theory (SFT) is a collection of homology theories that provide invariants for contact manifolds. We give a proof that vanishing of any one of either contact homology, rational SFT or (full) SFT are equivalent. We call a manifold for which these theories vanish "algebraically overtwisted"., Comment: 9 pages; improved description of SFT, simplified proof, added marked points in main theorem

Published
2007
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12. Resolution of symplectic cyclic orbifold singularities

Author

Niederkrüger, Klaus and Pasquotto, Federica

Subjects
Mathematics - Symplectic Geometry, 53D20, 37J15
Abstract

In this paper we present a method to obtain resolutions of symplectic orbifolds arising from symplectic reduction of a Hamiltonian S^1-manifold at a regular value. As an application, we show that all isolated cyclic singularities of a symplectic orbifold admit a resolution and that pre-quantisations of symplectic orbifolds are symplectically fillable by a smooth manifold., Comment: 12 pages, 2 figures: proof by performing a symplectic cut of the Hamiltonian S^1-manifold, 1 figure added

Published
2007
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13. Every contact manifold can be given a non-fillable contact structure

Author

Niederkrüger, Klaus and van Koert, Otto

Subjects
Mathematics - Symplectic Geometry, Mathematics - Geometric Topology, 53D35, 57R17
Abstract

Recently Francisco Presas Mata constructed the first examples of closed contact manifolds of dimension larger than 3 that contain a plastikstufe, and hence are non-fillable. Using contact surgery on his examples we create on every sphere S^{2n-1}, n>1, an exotic contact structure \xi_- that also contains a plastikstufe. As a consequence, every closed contact manifold M (except S^1) can be converted into a contact manifold that is not (semi-positively) fillable by taking the connected sum of M with (S^{2n-1},\xi_-)., Comment: 15 pages, 4 figures

Published
2007
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14. Brieskorn manifolds as contact branched covers of spheres

Author

Ozturk, Ferit and Niederkrüger, Klaus

Subjects
Mathematics - Geometric Topology, Mathematics - Symplectic Geometry
Abstract

We show that Brieskorn manifolds with their standard contact structures are contact branched coverings of spheres. This covering maps a contact open book decomposition of the Brieskorn manifold onto a Milnor open book of the sphere., Comment: 8 pages, 1 figure

Published
2005
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15. 5-dimensional contact SO(3)-manifolds and Dehn twists

Author

Niederkrüger, Klaus

Subjects
Mathematics - Symplectic Geometry, 53D10, 53D20
Abstract

In this paper the 5-dimensional contact SO(3)-manifolds are classified up to equivariant contactomorphisms. The construction of such manifolds with singular orbits requires the use of generalized Dehn twists. We show as an application that all simply connected 5-manifoldswith singular orbits are realized by a Brieskorn manifold with exponents (k,2,2,2). The standard contact structure on such a manifold gives right-handed Dehn twists, and a second contact structure defined in the article gives left-handed twists., Comment: 16 pages, 1 figure; simplification of arguments by restricting classification to coorientation preserving contactomorphisms

Published
2004
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16. Open book decompositions for contact structures on Brieskorn manifolds

Author

van Koert, Otto and Niederkrüger, Klaus

Subjects
Mathematics - Symplectic Geometry, 53D10
Abstract

In this paper, we give an open book decomposition for the contact structures on some Brieskorn manifolds, in particular for the contact structures of Ustilovsky. The decomposition uses right-handed Dehn twists as conjectured by Giroux., Comment: 6 pages, no figures

Published
2004
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17. An overtwisted convex hypersurface in higher dimensions

Author

Niederkrüger, Klaus, Chiang, River, Niederkrüger, Klaus, Institut Camille Jordan [Villeurbanne] (ICJ), École Centrale de Lyon (ECL), Université de Lyon-Université de Lyon-Université Claude Bernard Lyon 1 (UCBL), Université de Lyon-Université Jean Monnet [Saint-Étienne] (UJM)-Institut National des Sciences Appliquées de Lyon (INSA Lyon), Université de Lyon-Institut National des Sciences Appliquées (INSA)-Institut National des Sciences Appliquées (INSA)-Centre National de la Recherche Scientifique (CNRS), and National Cheng Kung University (NCKU)

Subjects
[MATH.MATH-SG] Mathematics [math]/Symplectic Geometry [math.SG], Mathematics::Algebraic Geometry, Mathematics - Symplectic Geometry, Mathematics::Complex Variables, FOS: Mathematics, Symplectic Geometry (math.SG), Mathematics::Differential Geometry, 53D10, Mathematics::Geometric Topology, Mathematics::Symplectic Geometry, [MATH.MATH-SG]Mathematics [math]/Symplectic Geometry [math.SG]
Abstract

We show that the germ of the contact structure surrounding a certain kind of convex hypersurfaces is overtwisted. We then find such hypersurfaces close to any plastikstufe with toric core so that these imply overtwistedness. All proofs in this article are explicit, and we hope that the methods used here might hint at a deeper understanding of the size of neighborhoods in contact manifolds. In the appendix we reprove in a concise way that the Legendrian unknot is loose if the ambient manifold contains a large enough neighborhood of a 2-dimensional overtwisted disk. Additionally we prove the folklore result that the singular distribution induced on a hypersurface $\Sigma$ of a contact manifold $(M, \xi)$ determines the germ of the contact structure around $\Sigma$., Comment: 13 pages, 2 figure

Published
2021

19. Some properties of the Bourgeois contact structures

Author

Lisi, Samuel, Marinković, Aleksandra, Niederkrüger, Klaus, Algèbre, géométrie, logique (AGL), Institut Camille Jordan [Villeurbanne] (ICJ), École Centrale de Lyon (ECL), Université de Lyon-Université de Lyon-Université Claude Bernard Lyon 1 (UCBL), Université de Lyon-Université Jean Monnet [Saint-Étienne] (UJM)-Institut National des Sciences Appliquées de Lyon (INSA Lyon), Université de Lyon-Institut National des Sciences Appliquées (INSA)-Institut National des Sciences Appliquées (INSA)-Centre National de la Recherche Scientifique (CNRS)-École Centrale de Lyon (ECL), and Université de Lyon-Institut National des Sciences Appliquées (INSA)-Institut National des Sciences Appliquées (INSA)-Centre National de la Recherche Scientifique (CNRS)

Subjects
[MATH.MATH-SG]Mathematics [math]/Symplectic Geometry [math.SG]
Abstract

International audience; The Bourgeois construction associates to every contact open book on a manifold V a contact structure on V×T². We study in this article some of the properties of V that are inherited by V×T² and some that are not.Giroux has provided recently a suitable framework to work with contact open books. In the appendix of this article, we quickly review this formalism, and we work out a few classical examples of contact open books to illustrate how to use this language.

Published
2019
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22. Loose Legendrians and the plastikstufe

Author

Massachusetts Institute of Technology. Department of Mathematics, Murphy, Emmy, Niederkrüger, Klaus, Plamenevskaya, Olga, Stipsicz, András I, Massachusetts Institute of Technology. Department of Mathematics, Murphy, Emmy, Niederkrüger, Klaus, Plamenevskaya, Olga, and Stipsicz, András I

Abstract

We show that the presence of a plastikstufe induces a certain degree of flexibility in contact manifolds of dimension 2n+1>3. More precisely, we prove that every Legendrian knot whose complement contains a “nice” plastikstufe can be destabilized (and, as a consequence, is loose). As an application, it follows in certain situations that two nonisomorphic contact structures become isomorphic after connect-summing with a manifold containing a plastikstufe., National Science Foundation (U.S.) (Grant DMS-0943787), European Science Foundation

Published
2015

23. Compact Lie group actions on contact manifolds

Author

Niederkrüger, Klaus

Subjects
ddc:510, Mathematics::Geometric Topology, Mathematics::Symplectic Geometry
Abstract

The main result in this thesis is the classification of SO(3)-actions on contact 5-manifolds. Using properties of the moment map, one can reduce the manifold to a 3-dimensional contact manifold with an S^1-action. This works everywhere outside of the singular orbits. For the singular orbits three models can be given that describe all possible cases. The 5-manifold is then obtained by gluing the singular set onto the 3-dimensional S^1-manifold in a compatible way. As it is well-known, S^1-bundles over a closed surface are classified by an integer called the Euler number. A similar invariant can be recovered in our 3-dimensional setting. We call it the Dehn-Euler number.

Published
2005

35. Weak and strong fillability of higher dimensional contact manifolds.

Author

Massot, Patrick, Niederkrüger, Klaus, and Wendl, Chris

Subjects
CONTACT manifolds, SYMPLECTIC manifolds, MATHEMATICAL invariants, INTEGERS, MATHEMATICAL constants
Abstract

For contact manifolds in dimension three, the notions of weak and strong symplectic fillability and tightness are all known to be inequivalent. We extend these facts to higher dimensions: in particular, we define a natural generalization of weak fillings and prove that it is indeed weaker (at least in dimension five), while also being obstructed by all known manifestations of 'overtwistedness'. We also find the first examples of contact manifolds in all dimensions that are not symplectically fillable but also cannot be called overtwisted in any reasonable sense. These depend on a higher dimensional analogue of Giroux torsion, which we define via the existence in all dimensions of exact symplectic manifolds with disconnected contact boundary. [ABSTRACT FROM AUTHOR]

Published
2013
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36. Desingularization of Orbifolds Obtained from Symplectic Reduction at Generic Coadjoint Orbits.

Author

Niederkrüger, Klaus and Pasquotto, Federica

Subjects
*HAMILTONIAN systems, *MANIFOLDS (Mathematics), *ORBIFOLDS, *MATHEMATICS, *LIE groups
Abstract

Symplectic reduction is a technique that can be used to decrease the dimension of Hamiltonian manifolds. Unfortunately, this only works under strong assumptions on the group action, and in general, even for a compact Lie group, the reduction at a coadjoint orbit that is transverse to the moment map will only yield a symplectic orbifold. [ABSTRACT FROM PUBLISHER]

Published
2009
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37. Every Contact Manifolds can be given a Nonfillable Contact Structure.

Author

Niederkrüger, Klaus and van Koert, Otto

Subjects
MANIFOLDS (Mathematics), SUBMANIFOLDS, EMBEDDING theorems, DIFFERENTIAL geometry, TOPOLOGY
Abstract

Recently Francisco Presas Mata constructed the first examples of closed contact manifolds of dimension larger than 3 that contain a plastikstufe, and are hence nonfillable. Using contact surgery on his examples, we create on every sphere ??2n−1, n ≥ 2, an exotic contact structure ξ− that allows us to embed a plastikstufe. As a consequence, every closed contact manifold (M, ξ) (with exception of ??1) can be converted by taking the connected sum (M, ξ)#(??2n−1, ξ−) into a contact manifold that is not (semi-positively) fillable. [ABSTRACT FROM PUBLISHER]

Published
2007
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