# Great Circle Fibrations and Contact Structures on Odd-Dimensional   Spheres

**Authors:** Herman Gluck, Jingye Yang

arXiv: 1901.06370 · 2024-07-26

## TL;DR

This paper investigates great circle fibrations on odd-dimensional spheres, revealing that while 3-spheres have tight contact structures orthogonal to the fibres, higher spheres can have fibrations where this orthogonal distribution is not a contact structure.

## Contribution

The paper demonstrates that starting from the 5-sphere, there exist smooth great circle fibrations with orthogonal distributions that are not contact structures, extending understanding beyond the 3-sphere case.

## Key findings

- 3-sphere fibrations produce tight contact structures
- Higher odd-dimensional spheres can have fibrations with non-contact orthogonal distributions
- Existence of non-contact fibrations in dimensions ≥5

## Abstract

It is known that for every smooth great circle fibration of the 3-sphere, the distribution of tangent 2-planes orthogonal to the fibres is a contact structure, in fact a tight one, but we show here that, beginning with the 5-sphere, there exist smooth great circle fibrations of all odd-dimensional spheres for which the hyperplane distribution orthogonal to the fibres is not a contact structure.

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Source: https://tomesphere.com/paper/1901.06370