English

Flat $(2,3,5)$-Distributions and Chazy's Equations

Differential Geometry 2016-03-21 v2 Classical Analysis and ODEs

Abstract

In the geometry of generic 2-plane fields on 5-manifolds, the local equivalence problem was solved by Cartan who also constructed the fundamental curvature invariant. For generic 2-plane fields or (2,3,5)(2,3,5)-distributions determined by a single function of the form F(q)F(q), the vanishing condition for the curvature invariant is given by a 6th^{\rm th} order nonlinear ODE. Furthermore, An and Nurowski showed that this ODE is the Legendre transform of the 7th^{\rm th} order nonlinear ODE described in Dunajski and Sokolov. We show that the 6th^{\rm th} order ODE can be reduced to a 3rd^{\rm rd} order nonlinear ODE that is a generalised Chazy equation. The 7th^{\rm th} order ODE can similarly be reduced to another generalised Chazy equation, which has its Chazy parameter given by the reciprocal of the former. As a consequence of solving the related generalised Chazy equations, we obtain additional examples of flat (2,3,5)(2,3,5)-distributions not of the form F(q)=qmF(q)=q^m. We also give 4-dimensional split signature metrics where their twistor distributions via the An-Nurowski construction have split G2G_2 as their group of symmetries.

Cite

@article{arxiv.1506.02473,
  title  = {Flat $(2,3,5)$-Distributions and Chazy's Equations},
  author = {Matthew Randall},
  journal= {arXiv preprint arXiv:1506.02473},
  year   = {2016}
}
R2 v1 2026-06-22T09:49:11.850Z