A universal sum over topologies in 3d gravity
Abstract
We explore the sum over topologies in AdS quantum gravity and its relationship with the statistical interpretation of the boundary theory. We formulate a statistical version of the conformal bootstrap that systematizes the universal statistical properties of high-energy CFT data. We identify a series of surgery moves on bulk manifolds that precisely reflect the requirements of typicality and crossing symmetry of the boundary ensemble. These surgery moves generate a large number of bulk manifolds that have to be included in any reasonable definition of the gravitational path integral. We show that this procedure generates only on-shell (hyperbolic) manifolds, although it does not produce all of them. These proofs rely on structure theorems of 3-manifolds, which non-trivially interact with the requirements of the statistical boundary ensemble. We illustrate the application of this procedure with many examples, such as Euclidean wormholes, twisted -bundles and handlebody-knots. Our findings reveal a large space of possible choices of which manifolds can be included in the gravitational path integral, reflecting a wide range of possible statistical ensembles consistent with crossing symmetry and typicality.
Cite
@article{arxiv.2601.07906,
title = {A universal sum over topologies in 3d gravity},
author = {Alexandre Belin and Scott Collier and Lorenz Eberhardt and Diego Liska and Boris Post},
journal= {arXiv preprint arXiv:2601.07906},
year = {2026}
}
Comments
78 pages plus appendices. v2: minor typos fixed, references added