Induced quantum metric fluctuations and the validity of semiclassical gravity

TL;DR

This paper introduces a stability-based criterion for the validity of semiclassical gravity, analyzing quantum metric fluctuations via the Einstein-Langevin equation, and demonstrates flat space stability as a key example.

Contribution

It develops a new criterion for semiclassical gravity's validity based on stability against quantum fluctuations, using stochastic gravity tools.

Findings

Flat space is stable under quantum metric fluctuations.

The Einstein-Langevin equation captures both intrinsic and induced fluctuations.

Runaway solutions with instabilities are discussed and addressed.

Abstract

We propose a criterion for the validity of semiclassical gravity (SCG) which is based on the stability of the solutions of SCG with respect to quantum metric fluctuations. We pay special attention to the two-point quantum correlation functions for the metric perturbations, which contain both intrinsic and induced fluctuations. These fluctuations can be described by the Einstein-Langevin equation obtained in the framework of stochastic gravity. Specifically, the Einstein-Langevin equation yields stochastic correlation functions for the metric perturbations which agree, to leading order in the large $N$ limit, with the quantum correlation functions of the theory of gravity interacting with $N$ matter fields. The homogeneous solutions of the Einstein-Langevin equation are equivalent to the solutions of the perturbed semiclassical equation, which describe the evolution of the expectation value of the quantum metric perturbations. The information on the intrinsic fluctuations, which are connected to the initial fluctuations of the metric perturbations, can also be retrieved entirely from the homogeneous solutions. However, the induced metric fluctuations proportional to the noise kernel can only be obtained from the Einstein-Langevin equation (the inhomogeneous term). These equations exhibit runaway solutions with exponential instabilities. A detailed discussion about different methods to deal with these instabilities is given. We illustrate our criterion by showing explicitly that flat space is stable and a description based on SCG is a valid approximation in that case.