# Left-invariant Grauert tubes on SU(2)

**Authors:** Vaqaas Aslam, Daniel M Burns, Jr, Daniel Irvine

arXiv: 1705.03359 · 2017-11-21

## TL;DR

This paper investigates the conditions under which Grauert tubes on SU(2) with left-invariant metrics are entire, revealing new obstructions linked to the integrability of the geodesic flow.

## Contribution

It provides a complete analysis of Grauert tubes on SU(2) with left-invariant metrics and introduces a novel obstruction criterion for their entireness.

## Key findings

- Grauert tube of bi-invariant metric on Lie groups is entire
- Complete integrability of geodesic flow on SU(2) is crucial
- New obstruction to entireness of Grauert tubes identified

## Abstract

Let M be a real analytic Riemannian manifold. An adapted complex structure on TM is a complex structure on a neighborhood of the zero section such that the leaves of the Riemann foliation are complex submanifolds. This structure is called entire if it may be extended to the whole of TM. We call such manifolds Grauert tubes, or simply tubes. We consider here the case of M = G a compact connected Lie group with a left-invariant metric, and try to determine for which such metrics the associated tube is entire. It is well-known that the Grauert tube of a bi-invariant metric on a Lie group is entire. The case of the smallest group SU(2) is treated completely, thanks to the complete integrability of the geodesic flow for such a metric, a standard result in classical mechanics. Along the way we find a new obstruction to tubes being entire which is made visible by the complete integrability. (New reference and exposition shortened, 11/17/2017.)

## Full text

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## References

11 references — full list in the complete paper: https://tomesphere.com/paper/1705.03359/full.md

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Source: https://tomesphere.com/paper/1705.03359