nLab continuous field of C*-algebras

Redirected from "string Lie algebroid".

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

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States and observables

Operator algebra

Local QFT

Perturbative QFT

Bundles

Context

Classes of bundles

Universal bundles

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Contents

Idea

Applications

In strict deformation quantization

References