Your search keyword '"ETNYRE, JOHN B."' showing total 176 results

1. On contact cosmetic surgery

Author

Etnyre, John B. and Shah, Tanushree

Subjects

Mathematics - Geometric Topology, Mathematics - Symplectic Geometry, 57K33

Abstract

We demonstrate that the contact cosmetic surgery conjecture holds true for all non-trivial Legendrian knots, with the possible exception of Lagrangian slice knots. We also discuss the contact cosmetic surgeries on Legendrian unknots and make the surprising observation that there are some Legendrian unknots that have a contact surgery with no cosmetic pair, while all other contact surgeries are contactomorphic to infinitely many other contact surgeries on the knot., Comment: 26 pages, 7 figures

Published

2024

2. Lagrangian Realizations of Ribbon Cobordisms

Author

Etnyre, John B. and Leverson, Caitlin

Subjects

Mathematics - Symplectic Geometry, 53D12 (Primary) 57K33, 57K43 (Secondary)

Abstract

We show that up to stabilizations, smooth ribbon cobordisms can be realized by decomposable Lagrangian cobordisms. We also define the notion of stabilization for Lagrangian cobordisms and show that it can be used to find new Lagrangian cobordisms between Legendrian links., Comment: 15 pages, 11 figures

Published

2024

3. Symplectic rational homology ball fillings of Seifert fibered spaces

Author

Etnyre, John B., Ozbagci, Burak, and Tosun, Bülent

Subjects

Mathematics - Geometric Topology, Mathematics - Symplectic Geometry, 57K33

Abstract

We characterize when some small Seifert fibered spaces can be the convex boundary of a symplectic rational homology ball and give strong restrictions for others to bound such manifolds. As part of this, we show that the only spherical $3$-manifolds that are the boundary of a symplectic rational homology ball are the lens spaces $L(p^2,pq-1)$ found by Lisca and give evidence for the Gompf conjecture that Brieskorn spheres do not bound Stein domains in C^2. We also find restrictions on Lagrangian disk fillings of some Legendrian knots in small Seifert fibered spaces., Comment: 50 pages, 19 figures

Published

2024

4. Existence and construction of non-loose knots

Author

Chatterjee, Rima, Etnyre, John B., Min, Hyunki, and Mukherjee, Anubhav

Subjects

Mathematics - Geometric Topology, Mathematics - Symplectic Geometry

Abstract

In this paper we give necessary and sufficient conditions for a knot type to admit non-loose Legendrian and transverse representatives in some overtwisted contact structure, classify all non-loose rational unknots in lens spaces, and discuss conditions under which non-looseness is preserved under cabling., Comment: 38 pages, 6 figures

Published

2023

5. Small symplectic caps and embeddings of homology balls in the complex projective plane

Author

Etnyre, John B., Min, Hyunki, Piccirillo, Lisa, and Roy, Agniva

Subjects

Mathematics - Geometric Topology, Mathematics - Symplectic Geometry

Abstract

We present a handlebody construction of small symplectic caps, and hence of small closed symplectic 4-manifolds. We use this to construct handlebody descriptions of symplectic embeddings of rational homology balls in $\mathbb{C}\mathrm{P}^2$, and thereby provide the first examples of (infinitely many) symplectic handlebody decompositions of a closed symplectic 4-manifold. Our constructions provide a new topological interpretation of almost toric fibrations of $\mathbb{C}\mathrm{P}^2$ in terms of symplectic handlebody decompositions., Comment: 38 pages, 18 figures

Published

2023

6. Non-loose torus knots

Author

Etnyre, John B., Min, Hyunki, and Mukherjee, Anubhav

Subjects

Mathematics - Geometric Topology, Mathematics - Symplectic Geometry

Abstract

We give a complete coarse classification of Legendrian and transverse torus knots in any contact structure on $S^3$., Comment: 106 pages, 26 figures

Published

2022

7. Legendrian Torus and Cable Links

Author

Dalton, Jennifer, Etnyre, John B., and Traynor, Lisa

Subjects

Mathematics - Geometric Topology, Mathematics - Symplectic Geometry, 57R33, 53D35

Abstract

We give a classification of Legendrian torus links. Along the way, we give the first classification of infinite families of Legendrian links where some smooth symmetries of the link cannot be realized by Legendrian isotopies. We also give the first family of links that are non-destabilizable but do not have maximal Thurston-Bennequin invariant and observe a curious distribution of Legendrian torus knots that can be realized as the components of a Legendrian torus link. This classification of Legendrian torus links leads to a classification of transversal torus links. We also give a classification of Legendrian and transversal cable links of knot types that are uniformly thick and Legendrian simple. Here we see some similarities with the classification of Legendrian torus links but also some differences. In particular, we show that there are Legendrian representatives of cable links of any uniformly thick knot type for which no symmetries of the components can be realized by a Legendrian isotopy, others where only cyclic permutations of the components can be realized, and yet others where all smooth symmetries are realizable., Comment: 67 pages, 19 figures

Published

2021

8. Cabling Legendrian and transverse knots

Author

Chakraborty, Apratim, Etnyre, John B., and Min, Hyunki

Subjects

Mathematics - Geometric Topology, Mathematics - Symplectic Geometry, 57K33, 53D10

Abstract

In this paper we will show how to classify Legendrian and transverse knots in the knot type of "sufficiently positive" cables of a knot in terms of the classification of the underlying knot. We will also completely explain the phenomena of "Legendrian large" cables. These are Legendrian representatives of cables that have Thurston-Bennequin invariant larger that the framing coming from the cabling torus. Such examples have only recently, and unexpectedly, been found. We will also give criteria that determines the classification of Legendrian and transverse knots the the knot type of negative cables., Comment: 38 pages, 9 figures, improved exposition

Published

2020

9. Symplectic fillings and cobordisms of lens spaces

Author

Etnyre, John B. and Roy, Agniva

Subjects

Mathematics - Geometric Topology, Mathematics - Symplectic Geometry, 57K33, 53D35

Abstract

We complete the classification of symplectic fillings of tight contact structures on lens spaces. In particular, we show that any symplectic filling $X$ of a virtually overtwisted contact structure on $L(p,q)$ has another symplectic structure that fills the universally tight contact structure on $L(p,q)$. Moreover, we show that the Stein filling of $L(p,q)$ with maximal second homology is given by the plumbing of disk bundles. We also consider the question of constructing symplectic cobordisms between lens spaces and report some partial results., Comment: 51 pages, 25 figures, extended discussion of cobordisms

Published

2020

10. Generalizations of planar contact manifolds to higher dimensions

Author

Acu, Bahar, Etnyre, John B., and Ozbagci, Burak

Subjects

Mathematics - Symplectic Geometry, Mathematics - Geometric Topology, 57R17 (Primary), 53D35 (Secondary)

Abstract

Iterated planar contact manifolds are a generalization of three dimensional planar contact manifolds to higher dimensions. We study some basic topological properties of iterated planar contact manifolds and discuss several examples and constructions showing that many contact manifolds are iterated planar. We also observe that for any odd integer m > 3, any finitely presented group can be realized as the fundamental group of some iterated planar contact manifold of dimension m. Moreover, we introduce another generalization of three dimensional planar contact manifolds that we call projective. Finally, building symplectic cobordisms via open books, we show that some projective contact manifolds admit explicit symplectic caps., Comment: 34 pages, 4 figures; v2 implements changes suggested by the referees; to appear in the Journal of Symplectic Geometry

Published

2020

11. Homology spheres bounding acyclic smooth manifolds and symplectic fillings

Author

Etnyre, John B. and Tosun, Bülent

Subjects

Mathematics - Geometric Topology, Mathematics - Symplectic Geometry

Abstract

In this paper, we collect various structural results to determine when an integral homology $3$--sphere bounds an acyclic smooth $4$--manifold, and when this can be upgraded to a Stein manifold. In a different direction we study whether smooth embedding of connected sums of lens spaces in $\mathbb{C}^2$ can be upgraded to a Stein embedding, and determined that this never happens., Comment: 14 pages. V2: minor referee's corrections, suggestions and bibliographic updates. This version to appear in Michigan Mathematical Journal

Published

2020

12. Symplectic hats

Author

Etnyre, John B. and Golla, Marco

Subjects

Mathematics - Geometric Topology, Mathematics - Symplectic Geometry

Abstract

We study relative symplectic cobordisms between contact submanifolds, and in particular relative symplectic cobordisms to the empty set, that we call hats. While we make some observations in higher dimensions, we focus on the case of transverse knots in the standard 3-sphere, and hats in blow-ups of the (punctured) complex projective planes. We apply the construction to give constraints on the algebraic topology of fillings of double covers of the 3-sphere branched over certain transverse quasipositive knots., Comment: 46 pages, 5 figures; accepted for publication by the Journal of Topology

Published

2020

13. On 3-manifolds that are boundaries of exotic 4-manifolds

Author

Etnyre, John B., Min, Hyunki, and Mukherjee, Anubhav

Subjects

Mathematics - Geometric Topology, Mathematics - Symplectic Geometry

Abstract

We give several criteria on a closed, oriented 3-manifold that will imply that it is the boundary of a (simply connected) 4-manifold that admits infinitely many distinct smooth structures. We also show that any weakly fillable contact 3-manifold, or contact 3-manifolds with non-vanishing Heegaard Floer invariant, is the boundary of a simply connected 4-manifolds that admits infinitely many distinct smooth structures each of which supports a symplectic structure with concave boundary, that is there are infinitely many exotic caps for any such contact manifold., Comment: 26 pages, 2 figures. Minor updates to the text

Published

2019

14. Legendrian contact homology in $\mathbb{R}^3$

Author

Etnyre, John B. and Ng, Lenhard L.

Subjects

Mathematics - Symplectic Geometry, Mathematics - Geometric Topology, 53D42, 53D10, 57K10

Abstract

This is an introduction to Legendrian contact homology and the Chekanov-Eliashberg differential graded algebra, with a focus on the setting of Legendrian knots in $\mathbb{R}^3$. This is the published version of the paper, but with a section of errata added at the end., Comment: v5: 60 pages. This is the published version but we have added a page of errata that were discovered after publication

Published

2018

15. Non-simplicity of isocontact embeddings in all higher dimensions

Author

Casals, Roger and Etnyre, John B.

Subjects

Mathematics - Symplectic Geometry

Abstract

In this article we show that in any dimension there exist infinitely many pairs of formally contact isotopic isocontact embeddings into the standard contact sphere which are not contact isotopic. This is the first example of rigidity for contact submanifolds in higher dimensions. The contact embeddings are constructed via contact push-offs of higher-dimensional Legendrian submanifolds., Comment: 24 Pages, 3 Figures. Simplification of Lemma 3.4 and inserted Minor Corrections. Final manuscript accepted in Geometric and Functional Analysis (GAFA)

Published

2018

16. Contact surgery and symplectic caps

Author

Conway, James and Etnyre, John B.

Subjects

Mathematics - Symplectic Geometry, Mathematics - Geometric Topology

Abstract

In this note we show that a closed oriented contact manifold is obtained from the standard contact sphere of the same dimension by contact surgeries on isotropic and coisotropic spheres. In addition, we observe that all closed oriented contact manifolds admit symplectic caps., Comment: 16 pages, minor edits

Published

2018

17. Transverse universal links

Author

Casals, Roger and Etnyre, John B.

Subjects

Mathematics - Geometric Topology, Mathematics - Symplectic Geometry

Abstract

We show that there exists a transverse link in the standard contact structures on the 3-sphere such that all contact 3-manifolds are contact branched covers over this transverse link., Comment: 11 pages, 8 figures, corrects Figure 1

Published

2017

18. Embedding all contact 3-manifolds in a fixed contact 5-manifold

Author

Etnyre, John B. and Lekili, Yanki

Subjects

Mathematics - Geometric Topology, Mathematics - Symplectic Geometry

Abstract

In this note we observe that one can contact embed all contact 3-manifolds into a Stein fillable contact structure on the twisted $S^3$-bundle over $S^2$ and also into a unique overtwisted contact structure on $S^3\times S^2$. These results are proven using "spun embeddings" and Lefschetz fibrations., Comment: 19 pages, 4 figures. Fixed typos, and added references and two figures

Published

2017

19. Symplectic fillings, contact surgeries, and Lagrangian disks

Author

Conway, James, Etnyre, John B., and Tosun, Bülent

Subjects

Mathematics - Geometric Topology, Mathematics - Symplectic Geometry

Abstract

This paper completely answers the question of when contact (r)-surgery on a Legendrian knot in the standard contact structure on the 3-sphere yields a symplectically fillable contact manifold for r in (0,1]. We also give obstructions for other positive r and investigate Lagrangian fillings of Legendrian knots., Comment: 23 pages, 8 figures. Improved exposition and changed claim relating decomposable and regular Lagrangians. This version to appear in IMRN

Published

2017

20. Braided embeddings of contact 3-manifolds in the standard contact 5-sphere

Author

Etnyre, John B. and Furukawa, Ryo

Subjects

Mathematics - Geometric Topology, Mathematics - Symplectic Geometry, 57R17, 53D10

Abstract

In this paper we study embeddings of contact manifolds using braidings of one manifold about another. In particular we show how to embed many contact 3-manifolds into the standard contact 5-sphere. We also show how to obstruct braidings of one manifold about another using contact geometry., Comment: 35 pages, 10 figures, accepted for publication by the Journal of Topology

Published

2015

21. Monoids in the mapping class group

Author

Etnyre, John B. and Van Horn-Morris, Jeremy

Subjects

Mathematics - Geometric Topology, Mathematics - Symplectic Geometry, 57R17, 57R50

Abstract

In this article we survey, and make a few new observations about, the surprising connection between sub-monoids of mapping class groups and interesting geometry and topology in low-dimensions., Comment: 36 pages, 18 figures

Published

2015

22. Sutured Floer homology and invariants of Legendrian and transverse knots

Author

Etnyre, John B., Vela-Vick, David Shea, and Zarev, Rumen

Subjects

Mathematics - Geometric Topology, Mathematics - Symplectic Geometry, 57M27, 57R58

Abstract

Using contact-geometric techniques and sutured Floer homology, we present an alternate formulation of the minus and plus version of knot Floer homology. We further show how natural constructions in the realm of contact geometry give rise to much of the formal structure relating the various versions of Heegaard Floer homology. In addition, to a Legendrian or transverse knot K in a contact manifold (Y,\xi), we associate distinguished classes EHL(K) in the minus-version of knot floer homology and EHIL(K) in the plus version, which are each invariant under Legendrian or transverse isotopies of K. The distinguished class EHL is shown to agree with the Legendrian/transverse invariant defined by Lisca, Ozsvath, Stipsicz, and Szabo despite a strikingly dissimilar definition. While our definitions and constructions only involve sutured Floer homology and contact geometry, the identification of our invariants with known invariants uses bordered sutured Floer homology to make explicit computations of maps between sutured Floer homology groups., Comment: 100 pages, 50 figures

Published

2014

23. Contact structures on 5-manifolds

Author

Etnyre, John B.

Subjects

Mathematics - Symplectic Geometry, Mathematics - Geometric Topology

Abstract

Using recent work on high dimensional Lutz twists and families of Weinstein structures we show that any almost contact structure on a 5-manifold is homotopic to a contact structure., Comment: 18 pages, 1 figure, fixed a potential gap in the proof of the main theorem and added details to clarify certain parts of the argument

Published

2012

24. Quantitative Darboux theorems in contact geometry

Author

Etnyre, John B., Komendarczyk, Rafal, and Massot, Patrick

Subjects

Mathematics - Symplectic Geometry, Mathematics - Differential Geometry, Mathematics - Geometric Topology

Abstract

This paper begins the study of relations between Riemannian geometry and contact topology in any dimension and continues this study in dimension 3. Specifically we provide a lower bound for the radius of a geodesic ball in a contact manifold that can be embedded in the standard contact structure on Euclidean space, that is on the size of a Darboux ball. The bound is established with respect to a Riemannian metric compatible with an associated contact form. In dimension three, it further leads us to an estimate of the size for a standard neighborhood of a closed Reeb orbit. The main tools are classical comparison theorems in Riemannian geometry. In the same context, we also use holomorphic curves techniques to provide a lower bound for the radius of a PS-tight ball., Comment: 33 pages, corrects several inaccuracies in earlier version

Published

2012

25. Admissible transverse surgery does not preserve tightness

Author

Baldwin, John A. and Etnyre, John B.

Subjects

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

Abstract

We produce the first examples of closed, tight contact 3-manifolds which become overtwisted after performing admissible transverse surgeries. Along the way, we clarify the relationship between admissible transverse surgery and Legendrian surgery. We use this clarification to study a new invariant of transverse knots - namely, the range of slopes on which admissible transverse surgery preserves tightness - and to provide some new examples of knot types which are not uniformly thick. Our examples also illuminate several interesting new phenomena, including the existence of hyperbolic, universally tight contact 3-manifolds whose Heegaard Floer contact invariants vanish (and which are not weakly fillable); and the existence of open books with arbitrarily high fractional Dehn twist coefficients whose compatible contact structures are not deformations of co-orientable taut foliations., Comment: 26 pages, 2 figures, references and discussion in the introduction and abstract corrected

Published

2012

26. Legendrian and transverse cables of positive torus knots

Author

Etnyre, John B., LaFountain, Douglas J., and Tosun, Bulent

Subjects

Mathematics - Geometric Topology, Mathematics - Symplectic Geometry

Abstract

In this paper we classify Legendrian and transverse knots in the knot types obtained from positive torus knots by cabling. This classification allows us to demonstrate several new phenomena. Specifically, we show there are knot types that have non-destabilizable Legendrian representatives whose Thurston-Bennequin invariant is arbitrarily far from maximal. We also exhibit Legendrian knots requiring arbitrarily many stabilizations before they become Legendrian isotopic. Similar new phenomena are observed for transverse knots. To achieve these results we define and study "partially thickenable" tori, which allow us to completely classify solid tori representing positive torus knots., Comment: 34 pages, 6 figures

Published

2011

27. On knots in overtwisted contact structures

Author

Etnyre, John B.

Subjects

Mathematics - Symplectic Geometry, Mathematics - Geometric Topology

Abstract

We prove that each overtwisted contact structure has knot types that are represented by infinitely many distinct transverse knots all with the same self-linking number. In some cases, we can even classify all such knots. We also show similar results for Legendrian knots and prove a "folk" result concerning loose transverse and Legendrian knots (that is knots with overtwisted complements) which says that such knots are determined by their classical invariants (up to contactomorphism). Finally we discuss how these results partially fill in our understanding of the "geography" and "botany"' problems for Legendrian knots in overtwisted contact structures, as well as many open questions regarding these problems., Comment: 23 pages, 3 figures, exposition clarified at several points and more background provided

Published

2010

28. Cabling, contact structures and mapping class monoids

Author

Baker, Kenneth L., Etnyre, John B., and Van Horn-Morris, Jeremy

Subjects

Mathematics - Symplectic Geometry, Mathematics - Geometric Topology, 57R17, 53D10

Abstract

In this paper we discuss the change in contact structures as their supporting open book decompositions have their binding components cabled. To facilitate this and applications we define the notion of a rational open book decomposition that generalizes the standard notion of open book decomposition and allows one to more easily study surgeries on transverse knots. As a corollary to our investigation we are able to show there are Stein fillable contact structures supported by open books whose monodromies cannot be written as a product of positive Dehn twists. We also exhibit several monoids in the mapping class group of a surface that have contact geometric significance., Comment: 62 pages, 32 figures. Significant expansion of exposition and more details on some arguments

Published

2010

29. Legendrian and transverse twist knots

Author

Etnyre, John B., Ng, Lenhard L., and Vertesi, Vera

Subjects

Mathematics - Symplectic Geometry, Mathematics - Geometric Topology, 57R17 (Primary), 53D10, 57M27 (Secondary)

Abstract

In 1997, Chekanov gave the first example of a Legendrian nonsimple knot type: the $m(5_2)$ knot. Epstein, Fuchs, and Meyer extended his result by showing that there are at least $n$ different Legendrian representatives with maximal Thurston--Bennequin number of the twist knot $K_{-2n}$ with crossing number $2n+1$. In this paper we give a complete classification of Legendrian and transverse representatives of twist knots. In particular, we show that $K_{-2n}$ has exactly $\lceil\frac{n^2}2\rceil$ Legendrian representatives with maximal Thurston--Bennequin number, and $\lceil\frac{n}{2}\rceil$ transverse representatives with maximal self-linking number. Our techniques include convex surface theory, Legendrian ruling invariants, and Heegaard Floer homology., Comment: 27 pages, v3: added figure, other minor changes, to appear in JEMS

Published

2010

30. A note on the support norm of a contact structure

Author

Baldwin, John A. and Etnyre, John B.

Subjects

Mathematics - Geometric Topology, Mathematics - Symplectic Geometry, 57R17, 53D10

Abstract

In this note we observe that the no two of the three invariants defined for contact structures by Etnyre and Ozbagci -- that is, the support genus, binding number and support norm -- determine the third., Comment: 10 pages, 5 figures

Published

2009

31. Torsion and Open Book Decompositions

Author

Etnyre, John B. and Vela-Vick, David Shea

Subjects

Mathematics - Symplectic Geometry, Mathematics - Geometric Topology, 57M27, 57R58

Abstract

We show that if (B,\pi) is an open book decomposition of a contact 3-manifold (Y,\xi), then the complement of the binding B has no Giroux torsion. We also prove the sutured Heegaard-Floer c-bar invariant of the binding of an open book is non-zero., Comment: 10 pages, 5 figures

Published

2009

32. Tightness in contact metric 3-manifolds

Author

Etnyre, John B., Komendarczyk, Rafal, and Massot, Patrick

Subjects

Mathematics - Symplectic Geometry, Mathematics - Differential Geometry, Mathematics - Geometric Topology

Abstract

This paper begins the study of relations between Riemannian geometry and global properties of contact structures on 3-manifolds. In particular we prove an analog of the sphere theorem from Riemannian geometry in the setting of contact geometry. Specifically, if a given three dimensional contact manifold (M,\xi) admits a complete compatible Riemannian metric of positive 4/9-pinched curvature then the underlying contact structure \xi is tight; in particular, the contact structure pulled back to the universal cover is the standard contact structure on S^3. We also describe geometric conditions in dimension three for \xi to be universally tight in the nonpositive curvature setting., Comment: 29 pages. Added the sphere theorem, removed high dimensional material and an alternate approach to the three dimensional tightness radius estimates

Published

2009

33. On generalizing Lutz twists

Author

Etnyre, John B. and Pancholi, Dishant M.

Subjects

Mathematics - Symplectic Geometry, Mathematics - Geometric Topology, 57R17, 53D10

Abstract

We give a possible generalization of Lutz twist to all dimensions. This reproves the fact that every contact manifold can be given a non-fillable contact structure and also shows great flexibility in the manifolds that can be realized as cores of overtwisted families. We moreover show that $R^{2n+1}$ has at least three distinct contact structures. This version of the paper contains both the texts of the published version of the paper together with an Erratum to the published version appended to the end., Comment: 19 pages, 2 figures, and erratum to the published version of the paper

Published

2009

34. Product Structures for Legendrian Contact Homology

Author

Civan, Gokhan, Etnyre, John B., Koprowski, Paul, Sabloff, Joshua M., and Walker, Alden

Subjects

Mathematics - Symplectic Geometry, Mathematics - Geometric Topology, 57R17, 53D10

Abstract

Legendrian contact homology (LCH) and its associated differential graded algebra are powerful non-classical invariants of Legendrian knots. Linearization makes the LCH computationally tractable at the expense of discarding nonlinear (and noncommutative) information. To recover some of the nonlinear information while preserving computability, we introduce invariant cup and Massey products - and, more generally, an A_\infty structure - on the linearized LCH. We apply the products and A_\infty structure in three ways: to find infinite families of Legendrian knots that are not isotopic to their Legendrian mirrors, to reinterpret the duality theorem of the fourth author in terms of the cup product, and to recover higher-order linearizations of the LCH., Comment: 21 pages, 6 figures

Published

2009

35. Rational linking and contact geometry

Author

Baker, Kenneth L. and Etnyre, John B.

Subjects

Mathematics - Symplectic Geometry, Mathematics - Geometric Topology, 57R17, 53D10

Abstract

In the note we study Legendrian and transverse knots in rationally null-homologous knot types. In particular we generalize the standard definitions of self-linking number, Thurston-Bennequin invariant and rotation number. We then prove a version of Bennequin's inequality for these knots and classify precisely when the Bennequin bound is sharp for fibered knot types. Finally we study rational unknots and show they are weakly Legendrian and transversely simple. This version of the paper corrects the definition of rational self-linking number in the previous and published version of the paper. With this correction all the main results of the paper remain true as originally stated., Comment: 16 pages

Published

2009

36. A Duality Exact Sequence for Legendrian Contact Homology

Author

Ekholm, Tobias, Etnyre, John B., and Sabloff, Joshua M.

Subjects

Mathematics - Symplectic Geometry, Mathematics - Geometric Topology

Abstract

We establish a long exact sequence for Legendrian submanifolds L in P x R, where P is an exact symplectic manifold, which admit a Hamiltonian isotopy that displaces the projection of L off of itself. In this sequence, the singular homology H_* maps to linearized contact cohomology CH^* which maps to linearized contact homology CH_* which maps to singular homology. In particular, the sequence implies a duality between the kernel of the map (CH_*\to H_*) and the cokernel of the map (H_* \to CH^*). Furthermore, this duality is compatible with Poincare duality in L in the following sense: the Poincare dual of a singular class which is the image of a in CH_* maps to a class \alpha in CH^* such that \alpha(a)=1. The exact sequence generalizes the duality for Legendrian knots in Euclidean 3-space [24] and leads to a refinement of the Arnold Conjecture for double points of an exact Lagrangian admitting a Legendrian lift with linearizable contact homology, first proved in [6]., Comment: 57 pages, 10 figures. Improved exposition and expanded analytic detail

Published

2008

37. Fibered Transverse Knots and the Bennequin Bound

Author

Etnyre, John B. and Van Horn-Morris, Jeremy

Subjects

Mathematics - Symplectic Geometry, Mathematics - Geometric Topology

Abstract

We prove that a nicely fibered link (by which we mean the binding of an open book) in a tight contact manifold $(M,\xi)$ with zero Giroux torsion has a transverse representative realizing the Bennequin bound if and only if the contact structure it supports (since it is also the binding of an open book) is $\xi.$ This gives a geometric reason for the non-sharpness of the Bennequin bound for fibered links. We also note that this allows the classification, up to contactomorphism, of maximal self-linking number links in these knot types. Moreover, in the standard tight contact structure on $S^3$ we classify, up to transverse isotopy, transverse knots with maximal self-linking number in the knots types given as closures of positive braids and given as fibered strongly quasi-positive knots. We derive several braid theoretic corollaries from this. In particular. we give conditions under which quasi-postitive braids are related by positive Markov stabilizations and when a minimal braid index representative of a knot is quasi-positive. In the new version we also prove that our main result can be used to show, and make rigorous the statement, that contact structures on a given manifold are in a strong sense classified by the transverse knot theory they support., Comment: 18 pages, 1 figure

Published

2008

38. A note on Stein fillings of contact manifolds

Author

Akhmedov, Anar, Etnyre, John B., Mark, Thomas E., and Smith, Ivan

Subjects

Mathematics - Symplectic Geometry, Mathematics - Geometric Topology

Abstract

In this note we construct infinitely many distinct simply connected Stein fillings of a certain infinite family of contact 3--manifolds., Comment: 5 pages

Published

2007

39. On contact surgery

Author

Etnyre, John B.

Subjects

Mathematics - Symplectic Geometry, Mathematics - Geometric Topology

Abstract

In this note we show that $+1$-contact surgery on distinct Legendrian knots frequently produces contactomorphic manifolds. We also give examples where this happens for $-1$-contact surgery. As an amusing corollary we find overtwisted contact structures that contain a large number of distinct Legendrian knots with the same classical invariants and tight complements., Comment: 8 pages, 2 figures

Published

2006

40. Lectures on Contact Geometry in Low-Dimensional Topology

Author

Etnyre, John B.

Subjects

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

Abstract

This article sketches various ideas in contact geometry that have become useful in low-dimensional topology. Specifically we (1) outline the proof of Eliashberg and Thurston's results concerning perturbations of foliatoins into contact structures, (2) discuss Eliashberg and Weinstein's symplectic handle attachments, and (3) briefly discuss Giroux's insights into open book decompositions and contact geometry. Bringing these pieces together we discuss the construction of ``symplectic caps'' which are a key tool in the application of contact/symplectic geometry to low-dimensional topology., Comment: 33 pages, 15 figures

Published

2006

41. Contact structures on 3-manifolds are deformations of foliations

Author

Etnyre, John B.

Subjects

Mathematics - Symplectic Geometry, Mathematics - Geometric Topology, 57R17

Abstract

In this note we observe, answering a question of Eliashberg and Thurston, that all contact structures on a closed oriented 3-manifold are $C^\infty$-deformations of foliations., Comment: 4 pages. Typos and misstatements corrected

Published

2006

42. Open books and plumbings

Author

Etnyre, John B. and Ozbagci, Burak

Subjects

Mathematics - Geometric Topology, Mathematics - Symplectic Geometry, 57R17

Abstract

We construct, somewhat non-standard, Legendrian surgery diagrams for some Stein fillable contact structures on some plumbing trees of circle bundles over spheres. We then show how to put such a surgery diagram on the pages of an open book for $S^3,$ with relatively low genus. Thus we produce open books with low genus pages supporting these Stein fillable contact structures, and in many cases it can be shown that these open books have minimal genus pages., Comment: 15 pages, 11 figures

Published

2006

43. Invariants of contact structures from open books

Author

Etnyre, John B. and Ozbagci, Burak

Subjects

Mathematics - Geometric Topology, Mathematics - Symplectic Geometry, 57R17

Abstract

In this note we define three invariants of contact structures in terms of open books supporting the contact structures. These invariants are the support genus (which is the minimal genus of a page of a supporting open book for the contact structure), the binding number (which is the minimal number of binding components of a supporting open book for the contact structure with minimal genus pages) and the norm (which is minus the maximal Euler characteristic of a page of a supporting open book)., Comment: 18 pages, 11 figures

Published

2006

44. Realizing 4-manifolds as achiral Lefschetz fibrations

Author

Etnyre, John B. and Fuller, Terry

Subjects

Mathematics - Geometric Topology, Mathematics - Symplectic Geometry, 57N13, 57R17

Abstract

We show that any 4-manifold, after surgery on a curve, admits an achiral Lefschetz fibration. In particular, we show that the connected sum of any simply connected 4-manifold with a 2-sphere bundle over the 2-sphere will admit an achiral Lefschetz fibration. We also show these surgered manifolds admit near-symplectic structures and prove more generally that achiral Lefschetz fibrations with sections have near-symplectic structures. As a corollary to our proof we obtain an alternate proof of Gompf's result on the existence of symplectic structures on Lefschetz pencils., Comment: 15 pages, 2 figures

Published

2005

45. Invariants of Knots, Embeddings and Immersions via Contact Geometry

Author

Ekholm, Tobias and Etnyre, John B.

Subjects

Mathematics - Geometric Topology, Mathematics - Symplectic Geometry

Abstract

This paper is an overview of the idea of using contact geometry to construct invariants of immersions and embeddings. In particular, it discusses how to associate a contact manifold to any manifold and a Legendrian submanifold to an embedding or immersion. We then discuss recent work that creates invariants of immersions and embeddings using the Legendrian contact homology of the associated Legendrian submanifold., Comment: 20 pages; 14 figures

Published

2004

46. Lectures on open book decompositions and contact structures

Author

Etnyre, John B.

Subjects

Mathematics - Symplectic Geometry, Mathematics - Geometric Topology

Abstract

These are lecture notes from the Clay Mathematics Institute summer school ``Floer Homology, Gauge Theory, and Low Dimensional Topology'' Alfred Renyi Institute; www.claymath.org/programs/summer_school/2004/. The main goal of these notes is to sketch a proof of Giroux correspondence between open book decompositions of three manifolds and contact structures, and then discuss various applications of this correspondence., Comment: 38 pages, 19 figures, many typos corrected and an error in Lemma 3.5 corrected

Published

2004

47. Planar open book decompositions and contact structures

Author

Etnyre, John B.

Subjects

Mathematics - Symplectic Geometry, Mathematics - Geometric Topology, 53D05, 53D10, 57M50

Abstract

In this note we observe that while all overtwisted contact structures on compact 3--manifolds are supported by planar open book decompositions, not all contact structures are. This has relevance to invariants of contact structures and also to the Weinstein conjecture via work of Abbas Cieliebak and Hofer., Comment: 10 pages, 3 figures. Proof that overtwisted contact structures are supported by open books is corrected. Various improvements in the exposition

Published

2004

48. On symplectic fillings

Author

Etnyre, John B

Subjects

Mathematics - Symplectic Geometry, Mathematics - Geometric Topology, 53D05, 53D10, 57M50

Abstract

In this note we make several observations concerning symplectic fillings. In particular we show that a (strongly or weakly) semi-fillable contact structure is fillable and any filling embeds as a symplectic domain in a closed symplectic manifold. We also relate properties of the open book decomposition of a contact manifold to its possible fillings. These results are also useful in proving property P for knots [P Kronheimer and T Mrowka, Geometry and Topology, 8 (2004) 295-310, math.GT/0311489] and in showing the contact Heegaard Floer invariant of a fillable contact structure does not vanish [P Ozsvath and Z Szabo, Geometry and Topology, 8 (2004) 311-334, math.GT/0311496]., Comment: Published electronically at http://www.maths.warwick.ac.uk/agt/AGTVol4/agt-4-5.abs.html

Published

2003

49. Non-simplicity of Isocontact Embeddings in All Higher Dimensions

Author

Casals, Roger and Etnyre, John B.

Published

2020

50. Cabling and transverse simplicity

Author

Etnyre, John B. and Honda, Ko

Subjects

Mathematics - Symplectic Geometry, Mathematics - Geometric Topology, 53D10, 57M50, 57M25

Abstract

We study Legendrian knots in a cabled knot type. Specifically, given a topological knot type K, we analyze the Legendrian knots in knot types obtained from K by cabling, in terms of Legendrian knots in the knot type K. As a corollary of this analysis, we show that the (2,3)-cable of the (2,3)-torus knot is not transversely simple and moreover classify the transverse knots in this knot type. This is the first classification of transverse knots in a non-transversely-simple knot type. We also classify Legendrian knots in this knot type and exhibit the first example of a Legendrian knot that does not destabilize, yet its Thurston-Bennequin invariant is not maximal among Legendrian representatives in its knot type., Comment: 29 pages, published version

Published

2003