English

Twistor Theory of Dancing Paths

Differential Geometry 2022-04-01 v2 Mathematical Physics Algebraic Geometry math.MP

Abstract

Given a path geometry on a surface U\mathcal{U}, we construct a causal structure on a four-manifold which is the configuration space of non-incident pairs (point, path) on U\mathcal{U}. This causal structure corresponds to a conformal structure if and only if U\mathcal{U} is a real projective plane, and the paths are lines. We give the example of the causal structure given by a symmetric sextic, which corresponds on an SL(2,R){\rm SL}(2,{\mathbb R})-invariant projective structure where the paths are ellipses of area π\pi centred at the origin. We shall also discuss a causal structure on a seven-dimensional manifold corresponding to non-incident pairs (point, conic) on a projective plane.

Keywords

Cite

@article{arxiv.2201.04717,
  title  = {Twistor Theory of Dancing Paths},
  author = {Maciej Dunajski},
  journal= {arXiv preprint arXiv:2201.04717},
  year   = {2022}
}

Comments

Dedicated to Roger Penrose on the occasion of his 90th birthday

R2 v1 2026-06-24T08:48:18.992Z