Twistor Bundles, Einstein Equations and Real Structures
Abstract
We consider sphere bundles P and P' of totally null planes of maximal dimension and opposite self-duality over a 4-dimensional manifold equipped with a Weyl or Riemannian geometry. The fibre product PP' of P and P' is found to be appropriate for the encoding of both the selfdual and the Einstein-Weyl equations for the 4-metric. This encoding is realized in terms of the properties of certain well defined geometrical objects on PP'. The formulation is suitable for both complex- and real-valued metrics. It unifies results for all three possible real signatures. In the purely Riemannian positive definite case it implies the existence of a natural almost hermitian structure on PP' whose integrability conditions correspond to the self-dual Einstein equations of the 4-metric. All Einstein equations for the 4-metric are also encoded in the properties of this almost hermitian structure on PP'.
Cite
@article{arxiv.dg-ga/9610017,
title = {Twistor Bundles, Einstein Equations and Real Structures},
author = {P. Nurowski},
journal= {arXiv preprint arXiv:dg-ga/9610017},
year = {2009}
}
Comments
Paper accepted in Classical and Quantum Gravity, Special issue in honour of Professor Andrzej Trautman