Gravitation on a Homogeneous Domain

Abstract

Among all plastic deformations of the gravitational Lorentz vacuum wr1 a particular role is being played by conformal deformations. These are conveniently described by using the homogeneous space for the conformal group SU(2,2)/S(U(2)x U(2)) and its Shilov boundary - the compactified Minkowski space M [1]. In this paper we review the geometrical structure involved in such a description. In particular we demonstrate that coherent states on the homogeneous Kaehler domain give rise to Einstein-like plastic conformal deformations when extended to M [2].