Gravitation and spatial conformal invariance

Abstract

It is well-known that General Relativity with positive cosmological constant can be formulated as a gauge theory with a broken SO(1,4) symmetry. This symmetry is broken by the presence of an internal space-like vector VA, A=0,...,4, with SO(1,3) as a residual invariance group. Attempts to ascribe dynamics to the field VA have been made in the literature but so far with limited success. Regardless of this issue we can take the view that VA might actually vary across spacetime and in particular become null or time-like. In this paper we will study the case where VA is null. This is shown to correspond to a Lorentz violating modified theory of gravity. Using the isomorphism between the de Sitter group and the spatial conformal group, SO(1,4) C(3), we show that the resulting gravitational field equations are invariant under all the symmetries, but spatial translations, of the conformal group C(3).