Invariant Connections and Symmetry Reduction in Loop Quantum Gravity

Maximilian Hanusch

Published 2016-01-21Version 1

The intention of this thesis is to provide general tools and concepts that allow to perform a mathematically substantiated symmetry reduction in (quantum) gauge field theories. Here, the main focus is on the framework of loop quantum gravity (LQG), where we concentrate on the reduction of the quantum configuration space, and the construction of a normalized Radon measures on the reduced one. More precisely, we introduce a new way to symmetry reduce the LQG-configuration space directly on the quantum level, and then show that this always leads to a (strictly) larger reduced space than quantizing the classical configuration space of invariant connections (traditional approach). We prove a general classification theorem for such invariant connections, which we then use to calculate the classical configuration space for the homogeneous and the spherically symmetric case. Here, the backbone of the introduced reduction concept is a lifting result for group actions on sets to spectra of $C^*$-subalgebras of the bounded functions thereon; and as a further application of this, we single out the standard kinematical Hilbert space of homogeneous isotropic loop quantum cosmology by means of the same invariance condition for both the standard configuration space $\mathbb{R}_{\mathrm{Bohr}}$, as well as for the Fleischhack one $\mathbb{R}\sqcup\mathbb{R}_{\mathrm{Bohr}}$. Along the way, symmetries of embedded analytic curves under a given analytic Lie group action are investigated, and a first classification result is proven for the case that the action is proper or pointwise proper and transitive, and only admits normal stabilizers.