Open AccessBook
An introduction to contact topology
Hansjörg Geiges
- 01 Jan 2008
TL;DR: A comprehensive introduction to contact topology is given in this article, including recent striking applications in geometric and differential topology: Eliashberg's proof of Cerf's theorem via the classification of tight contact structures on the 3-sphere, and the Kronheimer-Mrowka proof of property P for knots via symplectic fillings of contact 3-manifolds.
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Abstract: This text on contact topology is a comprehensive introduction to the subject, including recent striking applications in geometric and differential topology: Eliashberg's proof of Cerf's theorem via the classification of tight contact structures on the 3-sphere, and the Kronheimer-Mrowka proof of property P for knots via symplectic fillings of contact 3-manifolds. Starting with the basic differential topology of contact manifolds, all aspects of 3-dimensional contact manifolds are treated in this book. One notable feature is a detailed exposition of Eliashberg's classification of overtwisted contact structures. Later chapters also deal with higher-dimensional contact topology. Here the focus is on contact surgery, but other constructions of contact manifolds are described, such as open books or fibre connected sums. This book serves both as a self-contained introduction to the subject for advanced graduate students and as a reference for researchers.
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Citations
Uniqueness of the contact structure approximating a foliation
TL;DR: In this paper, the uniqueness up to isotopy of the contact structure in a small neighbourhood of the foliation was shown for 3-manifolds with no torus leaf and not a foliation without holonomy on parabolic torus bundles over the circle.
19
On Stein fillings of contact torus bundles
Marco Golla,Paolo Lisca +1 more
TL;DR: In this paper, the authors consider a large family of torus bundles over the circle, and use recent work of Li-Mak to construct, on each Y in F, a Stein fillable contact structure C. They prove that each Stein filling of C has vanishing first Chern class and first Betti number.
19
The Engel-Lutz twist and overtwisted Engel structures
Álvaro del Pino,Thomas Vogel +1 more
TL;DR: In this paper, a modification procedure for Engel structures that is reminiscent of the Lutz twist in 3D Contact Topology is introduced, which allows us to define what an Engel overtwisted disc is, and to prove a complete h-principle for over-twisted Engel structures.
18
Universality of Euler flows and flexibility of Reeb embeddings
01 Sep 2023
TL;DR: In this article , it was shown that the stationary Euler equations exhibit several universality features, such as the ability to encode a universal Turing machine and to have undecidable trajectories.
18
Orderability and the Weinstein Conjecture
TL;DR: In this paper, it was shown that the Weinstein conjecture holds for contact manifolds for which σ 0 (Sigma, ε) is non-orderable in the sense of Eliashberg-Polterovich [EP00].