Curvature profiles for quantum gravity
Abstract
Building on the recently introduced notion of quantum Ricci curvature and motivated by considerations in nonperturbative quantum gravity, we advocate a new, global observable for curved metric spaces, the curvature profile. It is obtained by integrating the scale-dependent, quasi-local quantum Ricci curvature, and therefore also depends on a coarse-graining scale. To understand how the distribution of local, Gaussian curvature is reflected in the curvature profile, we compute it on a class of regular polygons with isolated conical singularities. We focus on the case of the tetrahedron, for which we have a good computational control of its geodesics, and compare its curvature profile to that of a smooth sphere. The two are distinct, but qualitatively similar, which confirms that the curvature profile has averaging properties which are interesting from a quantum point of view.
Cite
@article{arxiv.2011.10168,
title = {Curvature profiles for quantum gravity},
author = {J. Brunekreef and R. Loll},
journal= {arXiv preprint arXiv:2011.10168},
year = {2021}
}
Comments
30 pages, 14 figures