Loop Quantization and Symmetry: Configuration Spaces

Abstract

Given two sets S1, S2 and unital C*-algebras A1, A2 of functions thereon, we show that a map σ : S1 S2 can be lifted to a continuous map σ : A1 A2 iff σ A2 := \σ f | f ∈ A2\ ⊂ A1. Moreover, σ is unique if existing, and injective iff σ A2 is dense. Then, we apply these results to loop quantum gravity and loop quantum cosmology. Here, the quantum configuration spaces are indeed spectra of certain C*-algebras A and A, respectively, whereas the choices for the algebras diverge in the literature. We decide now for all usual choices whether the respective cosmological quantum configuration space is embedded into the gravitational one. Typically, there is no embedding, but one can always get an embedding by defining A := C(σ A), where σ denotes the embedding between the classical configuration spaces. Finally, we explicitly determine C(σ A) in the homogeneous isotropic case for A generated by the matrix functions of parallel transports along analytic paths. The cosmological quantum configuration space obtained this way, equals the disjoint union of and the Bohr compactification of , appropriately glued together.