# Asymptotics with a positive cosmological constant: IV. The `no-incoming   radiation' condition

**Authors:** Abhay Ashtekar, Sina Bahrami

arXiv: 1904.02822 · 2019-07-31

## TL;DR

This paper extends the framework for describing gravitational radiation to include a positive cosmological constant, addressing gauge-invariant conditions, boundary definitions, symmetry groups, and conserved charges, revealing both similarities and differences from the flat case.

## Contribution

It develops a gauge-invariant approach to impose no-incoming radiation conditions and characterizes the boundary structure in asymptotically de Sitter spacetimes, extending the classical Bondi framework.

## Key findings

- Identifies the relevant boundary for no-incoming radiation in de Sitter space
- Analyzes the symmetry group and conserved charges at this boundary
- Explores the limit as the cosmological constant approaches zero

## Abstract

Consider compact objects --such as neutron star or black hole binaries-- in \emph{full, non-linear} general relativity. In the case with zero cosmological constant $\Lambda$, the gravitational radiation emitted by such systems is described by the well established, 50+ year old framework due to Bondi, Sachs, Penrose and others. However, so far we do not have a satisfactory extension of this framework to include a \emph{positive} cosmological constant --or, more generally, the dark energy responsible for the accelerated expansion of the universe. In particular, we do not yet have an adequate gauge invariant characterization of gravitational waves in this context. As the next step in extending the Bondi et al framework to the $\Lambda >0$ case, in this paper we address the following questions: How do we impose the `no incoming radiation' condition for such isolated systems in a gauge invariant manner? What is the relevant past boundary where these conditions should be imposed, i.e., what is the \emph{physically relevant} analog of past null infinity $\mathcal{I}^{-}_{0}$ used in the $\Lambda=0$ case? What is the symmetry group at this boundary? How is it related to the Bondi-Metzner-Sachs (BMS) group? What are the associated conserved charges? What happens in the $\Lambda \to 0$ limit? Do we systematically recover the Bondi-Sachs-Penrose structure at $\mathcal{I}^{-}_{0}$ of the $\Lambda=0$ theory, or do some differences persist even in the limit? We will find that while there are many close similarities, there are also some subtle but important differences from the asymptotically flat case. Interestingly, to analyze these issues one has to combine conceptual structures and mathematical techniques introduced by Bondi et al with those associated with \emph{quasi-local horizons}.

## Full text

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## Figures

7 figures with captions in the complete paper: https://tomesphere.com/paper/1904.02822/full.md

## References

54 references — full list in the complete paper: https://tomesphere.com/paper/1904.02822/full.md

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Source: https://tomesphere.com/paper/1904.02822