nLab continuous field of C*-algebras

Contents

Context

Topology

Operator algebra

Bundles

Idea
Applications

In strict deformation quantization

References

Idea

A continous field of $C^\ast$ -algebras is a kind of topological bundle of $C^\ast$ -algebras: A topological space $X$ and a C*-algebra $A_x$ for each point $x \in X$ , such that these algebras vary continuously, in some sense, as $x$ varies in $X$ . When $X$ is thought of as a topological groupoid with only identity morphisms, this may be understaood as a special case of Fell bundles over $X$ .

Applications

In strict deformation quantization

In C* algebraic deformation quantization continuous fields of $C^\ast$ -algebras over subspaces of the standard interval (tyically $\{1 , \frac{1}{2}, \frac{1}{3}, \cdots, 0\} \hookrightarrow [0,1]$ ) which at $\hbar = 0$ are Poisson algebras constitute non-perturbative deformation quantizations of this Poisson algebra (hence of the phase space of some physical system that it represents).

References

The notion originates with:

Jacques Dixmier, §10 in: $C^\ast$ -algebras, North Holland (1977)

An efficient reformulation is due to:

Eberhard Kirchberg, Simon Wassermann, Def. 1.1 in: Operations on continuous bundles of $C^\ast$ -algebras, Mathematische Annalen 303 4 (1995) 677-698 [eudml:165387, pdf]

nLab continuous field of C*-algebras

Context

Topology

Operator algebra

Concepts

Theorems

States and observables

Operator algebra

Local QFT

Perturbative QFT

Bundles

Context

Classes of bundles

Universal bundles

Presentations

Examples

Constructions

Contents

Idea

Applications

In strict deformation quantization

References