The Kerr-Schild ansatz revised
Abstract
Kerr-Schild metrics have been introduced as a linear superposition of the flat spacetime metric and a squared null vector field, say , multiplied by some scalar function, say . The basic assumption which led to Kerr solution was that be both geodesic and shearfree. This condition is relaxed here and Kerr-Schild ansatz is revised by treating Kerr-Schild metrics as {\it exact linear perturbations} of Minkowski spacetime. The scalar function is taken as the perturbing function, so that Einstein's field equations are solved order by order in powers of . It turns out that the congruence must be geodesic and shearfree as a consequence of third and second order equations, leading to an alternative derivation of Kerr solution.
Keywords
Cite
@article{arxiv.1408.4601,
title = {The Kerr-Schild ansatz revised},
author = {Donato Bini and Andrea Geralico and Roy P. Kerr},
journal= {arXiv preprint arXiv:1408.4601},
year = {2014}
}
Comments
11 pages, no figures; published version