English

Einstein-Hilbert Path Integrals in $\mathbb{R}^4$

Probability 2017-05-02 v1

Abstract

A hyperlink is a finite set of non-intersecting simple closed curves in R×R3\mathbb{R} \times \mathbb{R}^3. The dynamical variables in General Relativity are the vierbein ee and a su(2)×su(2)\mathfrak{su}(2)\times\mathfrak{su}(2)-valued connection ω\omega. Together with Minkowski metric, ee will define a metric gg on the manifold. The Einstein-Hilbert action S(e,ω)S(e,\omega) is defined using ee and ω\omega. We will define a path integral II by integrating a functional H(e,ω)H(e,\omega) against a holonomy operator of a hyperlink LL, and the exponential of the Einstein-Hilbert action, over the space of vierbeins ee and su(2)×su(2)\mathfrak{su}(2)\times\mathfrak{su}(2)-valued connections ω\omega. Three different types of functional will be considered for HH, namely area of a surface, volume of a region and the curvature of a surface SS. Using our earlier work done on Chern-Simons path integrals in R3\mathbb{R}^3, we will derive and write these infinite dimensional path integrals II as the limit of a sequence of Chern-Simons integrals.

Cite

@article{arxiv.1705.00396,
  title  = {Einstein-Hilbert Path Integrals in $\mathbb{R}^4$},
  author = {Adrian P. C. Lim},
  journal= {arXiv preprint arXiv:1705.00396},
  year   = {2017}
}
R2 v1 2026-06-22T19:32:26.781Z