Action and Observer dependence in Euclidean quantum gravity
Abstract
Given a Lorentzian spacetime and a non-vanishing timelike vector field with level surfaces , one can construct on a Euclidean metric . Motivated by this, we consider a class of metrics with an arbitrary function that interpolates between the Euclidean () and Lorentzian () regimes. The Euclidean regime is in general different from that obtained from Wick rotation . For example, if is the Lorentzian de Sitter metric corresponding to , the Euclidean regime of is the Euclidean anti-de Sitter space with . We analyze the curvature tensors associated with for arbitrary Lorentzian metrics and timelike geodesic fields , and show that they have interesting and remarkable mathematical structures: (i) Additional terms arise in the Euclidean regime of . (ii) For the simplest choice of a step profile for , the Ricci scalar Ric of reduces, in the Lorentzian regime , to the complete Einstein-Hilbert lagrangian with the correct Gibbons-Hawking-York boundary term; the latter arises as a delta-function of strength supported on . (iii) In the Euclidean regime , Ric also has an extra term of the -foliation. We highlight similar foliation dependent terms in the full Riemann tensor. We present some explicit examples and briefly discuss implications of the results for Euclidean quantum gravity and quantum cosmology.
Cite
@article{arxiv.1705.02504,
title = {Action and Observer dependence in Euclidean quantum gravity},
author = {Dawood Kothawala},
journal= {arXiv preprint arXiv:1705.02504},
year = {2018}
}
Comments
v2: discussions and references added; to appear in CQG Letters