On the questions of asymptotic recoverability of information and subsystems in quantum gravity

A longstanding question in quantum gravity regards the localization of quantum information; one way to formulate this question is to ask how subsystems can be defined in quantum-gravitational systems. The gauge symmetry and necessity of solving the gravitational constraints appear to imply that the answers to this question here are different than in finite quantum systems, or in local quantum field theory. Specifically, the constraints can be solved by providing a gravitational dressing for the underlying field-theory operators, but this modifies their locality properties. It has been argued that holography itself may be explained through this role of the gauge symmetry and constraints, at the nonperturbative level, but there are also subtleties in constructing a holographic map in this approach. There are also claims that holography is implied even by perturbative solution of the constraints. This short note provides further examination of these questions, and in particular investigates to what extent perturbative or nonperturbative solution of the constraints implies that information naively thought to be localized can be recovered by asymptotic measurements, and the relevance of this in defining subsystems. In the leading perturbative case, the relevant effects are seen to be exponentially suppressed and asymptotically vanishing, for massive fields. These questions are, for example, important in sharply characterizing the unitarity problem for black holes.

Automated summary

The question of localizing quantum information in quantum gravity has been a longstanding issue, with the presence of gauge symmetry and gravitational constraints leading to different answers compared to finite quantum systems and local quantum field theory. It has been proposed that solving the constraints by providing a gravitational dressing for field-theory operators modifies their locality properties, potentially explaining holography at a nonperturbative level. Perturbative solutions of the constraints also suggest implications for holography, with the relevance of asymptotic measurements in defining subsystems being a key aspect of the investigation.