Flat deformation theorem and symmetries in spacetime

Abstract

The flat deformation theorem states that given a semi-Riemannian analytic metric g on a manifold, locally there always exists a two-form F, a scalar function c, and an arbitrarily prescribed scalar constraint depending on the point x of the manifold and on F and c, say (c, F, x)=0, such that the deformed metric η = cg -ε F2 is semi-Riemannian and flat. In this paper we first show that the above result implies that every (Lorentzian analytic) metric g may be written in the extended Kerr-Schild form, namely ηab := a gab - 2 b k(a lb) where η is flat and ka, la are two null covectors such that ka la= -1; next we show how the symmetries of g are connected to those of η, more precisely; we show that if the original metric g admits a Conformal Killing vector (including Killing vectors and homotheties), then the deformation may be carried out in a way such that the flat deformed metric η `inherits' that symmetry.