Charges and Fluxes on (Perturbed) Non-expanding Horizons

TL;DR

This paper defines charges and fluxes on non-expanding horizons using covariant phase space methods, showing they behave physically well and relate to asymptotic structures, with implications for gravitational wave analysis.

Contribution

It introduces a covariant phase space framework for charges and fluxes on (perturbed) NEHs, extending the symmetry group and ensuring physically consistent flux behavior.

Findings

Fluxes vanish on NEHs, aligning with physical expectations.

Fluxes for time-translation symmetries are positive on perturbed NEHs.

Results hold for zero and non-zero cosmological constant.

Abstract

In a companion paper we showed that the symmetry group $\mathfrak{G}$ of non-expanding horizons (NEHs) is a 1-dimensional extension of the Bondi-Metzner-Sachs group $\mathfrak{G}$ at $\mathcal{I}^{+}$. For each infinitesimal generator of $\mathfrak{G}$, we now define a charge and a flux on NEHs as well as perturbed NEHs. The procedure uses the covariant phase space framework in presence of internal null boundaries $\mathcal{N}$. However, $\mathcal{N}$ is required to be an NEH or a perturbed NEH. Consequently, charges and fluxes associated with generators of $\mathfrak{G}$ are free of physically unsatisfactory features that can arise if $\mathcal{N}$ is allowed to be a general null boundary. In particular, all fluxes vanish if $\mathcal{N}$ is an NEH, just as one would hope; and fluxes associated with symmetries representing `time-translations' are positive definite on perturbed NEHs. These results hold for zero as well as non-zero cosmological constant. In the asymptotically flat case, as noted in \cite{akkl1}, $\mathcal{I}^\pm$ are NEHs in the conformally completed space-time but with an extra structure that reduces $\mathfrak{G}$ to $\mathfrak{B}$. The flux expressions at $\mathcal{N}$ reflect this synergy between NEHs and $\mathcal{I}^{+}$. In a forthcoming paper, this close relation between NEHs and $\mathcal{I}^{+}$ will be used to develop gravitational wave tomography, enabling one to deduce horizon dynamics directly from the waveforms at $\mathcal{I}^{+}$.