The space of light rays: Causality and L-boundary

Abstract

The space of light rays N of a conformal Lorentz manifold (M,C) is, under some topological conditions, a manifold whose basic elements are unparametrized null geodesics. This manifold N, strongly inspired on R. Penrose's twistor theory, keeps all information of M and it could be used as a space complementing the spacetime model. In the present review, the geometry and related structures of N, such as the space of skies and the contact structure H, are introduced. The causal structure of M is characterized as part of the geometry of N. A new causal boundary for spacetimes M prompted by R. Low, the L-boundary, is constructed in the case of 3-dimensional manifolds M and proposed as a model of its construction for general dimension. Its definition only depends on the geometry of N and not on the geometry of the spacetime M. The properties satisfied by the L-boundary ∂ M permit to characterize the obtained extension M=M ∂ M and this characterization is also proposed for general dimension.