English

Geodesic vector fields, induced contact structures and tightness in dimension three

Symplectic Geometry 2024-03-20 v1 Differential Geometry

Abstract

In this paper, we provide new and simpler proofs of two theorems of Gluck and Harrison on contact structures induced by great circle or line fibrations. Furthermore, we prove that a geodesic vector field whose Jacobi tensor is parallel along flow lines (e.g. if the underlying manifold is locally symmetric) induces a contact structure if the 'mixed' sectional curvatures are nonnegative, and if a certain nondegeneracy condition holds. Additionally, we prove that in dimension three, contact structures admitting a Reeb flow which is either periodic, isometric, or free and proper, must be universally tight. In particular, we generalise an earlier result of Geiges and the author, by showing that every contact form on R3\mathbb{R}^3 whose Reeb vector field spans a line fibration is necessarily tight. Furthermore, we provide a characterisation of isometric Reeb vector fields. As an application, we recover a result of Kegel and Lange on Seifert fibrations spanned by Reeb vector fields, and we classify closed contact 33-manifolds with isometric Reeb flows (also known as RR-contact manifolds) up to diffeomorphism.

Keywords

Cite

@article{arxiv.2403.12903,
  title  = {Geodesic vector fields, induced contact structures and tightness in dimension three},
  author = {Tilman Becker},
  journal= {arXiv preprint arXiv:2403.12903},
  year   = {2024}
}

Comments

20 pages

R2 v1 2026-06-28T15:26:01.661Z