Integration of Einstein's Equations Near Spatial Infinity
For metrics that are expandable near spatial infinity we study the integrability of the whole set of Einstein's (i.e. evolution plus constraint) equations in vacuo. They turn out to be soluble to all orders if and only if certain, hitherto unknown, conserved quantities, built from the first-order field, vanish.
Proceedings of the Royal Society of London Series A
- Pub Date:
- February 1984