Area Operator in Loop Quantum Gravity

Abstract

A hyperlink is a finite set of non-intersecting simple closed curves in R × R3. Let S be an orientable surface in R3. The dynamical variables in General Relativity are the vierbein e and a su(2)×su(2)-valued connection ω. Together with Minkowski metric, e will define a metric g on the manifold. Denote AS(e) as the area of S, for a given choice of e. The Einstein-Hilbert action S(e,ω) is defined on e and ω. We will quantize the area of the surface S by integrating AS(e) against a holonomy operator of a hyperlink L, disjoint from S, and the exponential of the Einstein-Hilbert action, over the space of vierbeins e and su(2)×su(2)-valued connections ω. Using our earlier work done on Chern-Simons path integrals in R3, we will write this infinite dimensional path integral as the limit of a sequence of Chern-Simons integrals. Our main result shows that the area operator can be computed from a link-surface diagram between L and S. By assigning an irreducible representation of su(2)×su(2) to each component of L, the area operator gives the total net momentum impact on the surface S.