English

The semiclassical gravitational path integral and random matrices

High Energy Physics - Theory 2021-12-30 v3 General Relativity and Quantum Cosmology

Abstract

We study the genus expansion on compact Riemann surfaces of the gravitational path integral Zgrav(m)\mathcal{Z}^{(m)}_{\text{grav}} in two spacetime dimensions with cosmological constant Λ>0\Lambda>0 coupled to one of the non-unitary minimal models M2m1,2\mathcal{M}_{2m-1,2}. In the semiclassical limit, corresponding to large mm, Zgrav(m)\mathcal{Z}^{(m)}_{\text{grav}} admits a Euclidean saddle for genus h2h\geq 2. Upon fixing the area of the metric, the path integral admits a round two-sphere saddle for h=0h=0. We show that the OPE coefficients for the minimal weight operators of M2m1,2\mathcal{M}_{2m-1,2} grow exponentially in mm at large mm. Employing the sewing formula, we use these OPE coefficients to obtain the large mm limit of the partition function of M2m1,2\mathcal{M}_{2m-1,2} for genus h2h\ge 2. Combining these results we arrive at a semiclassical expression for Zgrav(m)\mathcal{Z}^{(m)}_{\text{grav}}. Conjecturally, Zgrav(m)\mathcal{Z}^{(m)}_{\text{grav}} admits a completion in terms of an integral over large random Hermitian matrices, known as a multicritical matrix integral. This matrix integral is built from an even polynomial potential of order 2m2m. We obtain explicit expressions for the large mm genus expansion of multicritical matrix integrals in the double scaling limit. We compute invariant quantities involving contributions at different genera, both from a matrix as well as a gravity perspective, and establish a link between the two pictures. Inspired by the proposal of Gibbons and Hawking relating the de Sitter entropy to a gravitational path integral, our setup paves a possible path toward a microscopic picture of a two-dimensional de Sitter universe.

Keywords

Cite

@article{arxiv.2111.05344,
  title  = {The semiclassical gravitational path integral and random matrices},
  author = {Dionysios Anninos and Beatrix Mühlmann},
  journal= {arXiv preprint arXiv:2111.05344},
  year   = {2021}
}

Comments

21 pages + appendices, v2 typos corrected + references added, v3 typos corrected

R2 v1 2026-06-24T07:32:48.970Z