nLab
Gelfand-Naimark-Segal construction

Context

Measure and probability theory

AQFT

Idea
GNS construction
Applications

under construction

Idea

The Gelfand–Naimark–Segal (GNS) construction establishes a correspondence between cyclic $*$ -representations of $C^{*}$ -algebras and certain linear functionals (usually called states) on those same $C^{*}$ -algebras. The correspondence comes about from an explicit construction of the *-representation from one of the linear functionals (states).

GNS construction

Theorem

Given a state, $ρ$ , on some C*-algebra, $A$ , there is a $*$ -representation $π$ of $A$ with a cyclic vector $ξ$ whose associated state is $ρ$ . In other words,

ρ (x) = ⟨ ξ, π (x) ξ ⟩

for every $x$ in $A$ .

and this needs to be finished. I don’t have the head for this right now.

Applications

The GNS construction is a central ingredient that translates between the Heisenberg picture and the Schrödinger pircture? of quantum mechnanics?: the AQFT and the FQFT picture of quantum field theory. In the former one considers $C^{*}$ -algebras of observables, in the lattes spaces of states. Given a $C^{*}$ -algebra of observables, the corresponding space of state can be taken to be that given by the GNS construction.

Revised on July 24, 2011 21:05:29 by Urs Schreiber (82.113.99.51)

nLab
Gelfand-Naimark-Segal construction

Context

Measure and probability theory

Measure theory

Probability theory

Information geometry

Thermodynamics

Theorems

AQFT

Definitions

Theorems

States and observables

Operator algebra

Local QFT

Euclidean QFT

Contents

Idea

GNS construction

Theorem

Applications

nLab Gelfand-Naimark-Segal construction

Context

Measure and probability theory

Measure theory

Probability theory

Information geometry

Thermodynamics

Theorems

AQFT

Definitions

Theorems

States and observables

Operator algebra

Local QFT

Euclidean QFT

Contents

Idea

GNS construction

Theorem

Applications

nLab
Gelfand-Naimark-Segal construction