Towards Hartle-Hawking states for connection variables

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Details zur Publikation

Autorinnen und Autoren: Dhandhukiya S, Sahlmann H
Zeitschrift: Physical Review D
Jahr der Veröffentlichung: 2017
Band: 95
Heftnummer: 8
ISSN: 2470-0010


The Hartle-Hawking state is a proposal for a preferred initial state for quantum gravity, based on a path integral over all compact Euclidean four-geometries which have a given three-geometry as a boundary. The wave function constructed this way satisfies the (Lorentzian) Hamiltonian constraint of general relativity in ADM variables in a formal sense. In this article, we address the question of whether this construction is dependent on the canonical variables used. We give a precise derivation of the properties of the Hartle-Hawking state in terms of formal manipulations of the path integral expressions. Then we mimic the construction in terms of Ashtekar-Barbero variables, and observe that the resulting wave function does not satisfy the Lorentzian Hamiltonian constraint even in a formal sense. We also investigate this issue for the relativistic particle, with a similar conclusion. We finally suggest a modification of the proposal that does satisfy the constraint at least in a formal sense and start to consider its implications in quantum cosmology. We find that for certain variables, and in the saddle point approximation, the state is very similar to the Ashtekar-Lewandowski state of loop quantum gravity. In the process, we have calculated the on-shell action for several cosmological models in connection variables.

FAU-Autorinnen und Autoren / FAU-Herausgeberinnen und Herausgeber

Dhandhukiya, Satya
Lehrstuhl für Theoretische Physik
Sahlmann, Hanno Prof. Dr.
Professur für Theoretische Physik


Dhandhukiya, S., & Sahlmann, H. (2017). Towards Hartle-Hawking states for connection variables. Physical Review D, 95(8).

Dhandhukiya, Satya, and Hanno Sahlmann. "Towards Hartle-Hawking states for connection variables." Physical Review D 95.8 (2017).


Zuletzt aktualisiert 2019-20-03 um 15:38