Unknotted Reeb orbits and nicely embedded holomorphic curves
Abstract
We exhibit a distinctly low-dimensional dynamical obstruction to the existence of Liouville cobordisms: for any contact 3-manifold admitting an exact symplectic cobordism to the tight 3-sphere, every nondegenerate contact form admits an embedded Reeb orbit that is unknotted and has self-linking number -1. The same is true moreover for any contact structure on a closed 3-manifold that is reducible. Our results generalize an earlier theorem of Hofer-Wysocki-Zehnder for the 3-sphere, but use somewhat newer techniques: the main idea is to exploit the intersection theory of punctured holomorphic curves in order to understand the compactification of the space of so-called "nicely embedded" curves in symplectic cobordisms. In the process, we prove a local adjunction formula for holomorphic annuli breaking along a Reeb orbit, which may be of independent interest.
Cite
@article{arxiv.1609.01660,
title = {Unknotted Reeb orbits and nicely embedded holomorphic curves},
author = {Alexandru Cioba and Chris Wendl},
journal= {arXiv preprint arXiv:1609.01660},
year = {2019}
}
Comments
50 pages, 5 figures; v3 implements minor changes suggested by the referees; to appear in J. Symplectic Geom