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Genus zero transverse foliations for weakly convex Reeb flows on the tight 3-sphere
[article]
2023
arXiv
pre-print
A contact form on the tight 3-sphere (S^3,ξ_0) is called weakly convex if the Conley-Zehnder index of every Reeb orbit is at least 2. In this article, we study Reeb flows of weakly convex contact forms on (S^3,ξ_0) admitting a prescribed finite set of index-2 Reeb orbits, which are all hyperbolic and mutually unlinked. We present conditions so that these index-2 orbits are binding orbits of a genus zero transverse foliation whose additional binding orbits have index 3. In addition, we show in
arXiv:2206.12856v4
fatcat:rxyikigou5fjhazeakiytpysnq