Asymptotic Structure with a positive cosmological constant

Abstract

This is the second of two papers that study the asymptotic structure of space-times with a non-negative cosmological constant . This paper deals with the case >0. Our approach is founded on the `tidal energies' built with the Weyl curvature and, specifically, we use the asymptotic super-Poynting vector computed from the rescaled Bel-Robinson tensor at infinity to provide a covariant, gauge-invariant, criterion for the existence, or absence, of gravitational radiation at infinity. The fundamental idea we put forward is that the physical asymptotic properties are encoded in (,hab,Dab), where the first element of the triplet is a 3-dimensional manifold, the second is a representative of a conformal class of Riemannian metrics on , and the third element is a traceless symmetric tensor field on . We similarly propose a no-incoming radiation criterion based also on the triplet (,hab,Dab) and on radiant supermomenta deduced from the rescaled Bel-Robinson tensor too. We search for news tensors and argue that any news-like object must be associated to, and depends on, 2-dimensional cross-sections of . We identify one component of news for every such cross-section and present a general strategy to find the second component. We also introduce the concept of equipped , consider the limit → 0 and apply all our results to selected exact solutions of Einstein Field Equations. The full-length abstract is available in the paper.