Complexifier Coherent States for Quantum General Relativity

TL;DR

This paper unifies various semiclassical states in Quantum General Relativity using the complexifier method, introduces new non-Abelian complexifiers, and discusses their implications for the Hilbert space structure and semiclassical analysis.

Contribution

It demonstrates that Varadarajan's polymer-like states are complexifier coherent states and introduces new non-Abelian complexifiers that influence the Hilbert space structure in QGR.

Findings

Varadarajan's states are complexifier coherent states.

New non-Abelian complexifiers are constructed.

Graph dependent states are effective for semiclassical analysis.

Abstract

Recently, substantial amount of activity in Quantum General Relativity (QGR) has focussed on the semiclassical analysis of the theory. In this paper we want to comment on two such developments: 1) Polymer-like states for Maxwell theory and linearized gravity constructed by Varadarajan which use much of the Hilbert space machinery that has proved useful in QGR and 2) coherent states for QGR, based on the general complexifier method, with built-in semiclassical properties. We show the following: A) Varadarajan's states {\it are} complexifier coherent states. This unifies all states constructed so far under the general complexifier principle. B) Ashtekar and Lewandowski suggested a non-Abelean generalization of Varadarajan's states to QGR which, however, are no longer of the complexifier type. We construct a new class of non-Abelean complexifiers which come close to the one underlying Varadarajan's construction. C) Non-Abelean complexifiers close to Varadarajan's induce new types of Hilbert spaces which do not support the operator algebra of QGR. The analysis suggests that if one sticks to the present kinematical framework of QGR and if kinematical coherent states are at all useful, then normalizable, graph dependent states must be used which are produced by the complexifier method as well. D) Present proposals for states with mildened graph dependence, obtained by performing a graph average, do not approximate well coordinate dependent observables. However, graph dependent states, whether averaged or not, seem to be well suited for the semiclassical analysis of QGR with respect to coordinate independent operators.