nLab Gelfand-Naimark-Segal construction

Contents

Context

Functional analysis

Algebraic Field Theory

Idea
Details

For $C^\ast$ -algebras
For $C^\ast$ -categories

Functorial Aspects
Related concepts
References

Idea

The Gelfand-Naimark-Segal construction (“GNS construction”) represents a state on a star-algebra over the complex numbers — which a priori is defined purely algebraically as a non-degenerate positive linear function

\rho \;\colon\; \mathcal{A} \longrightarrow \mathbb{C} \,,

— by a vector $\psi \in \mathcal{H}$ in a complex Hilbert space $\mathcal{H}_\rho$ as the “expectation value”

\begin{aligned} \rho(A) & = \langle \psi \vert \, A \, \vert \psi \rangle \\ & \coloneqq \langle \psi, \pi(A) \psi \rangle \end{aligned}

with respect to some star-representation

\pi \;\colon\; \mathcal{A} \longrightarrow End(\mathcal{H}_\rho)

of $\mathcal{A}$ on (a dense subspace of) $\mathcal{H}_\rho$ ; where $\langle -,-\rangle$ denotes the Hermitian inner product on the Hilbert space.

It follows that every mixed state/density matrix on $\mathcal{H}_\rho$ gives another algebraic state on $\mathcal{A}$ , and the states on $\mathcal{A}$ arising this way are called the folium of states corresponding to $\rho$ . [Haag 1996 p 124, cf. Moretti 2017 Def. 14.9].

Originally and typically by default the GNS construction is considered for C*-algebras and C*-representations (Gelfand & Naimark 1943, Segal 1947, cf. e.g. Schmüdgen 1990), but the construction applies to general unital star algebras $\mathcal{A}$ (Khavkine & Moretti 2015) as well as to other coefficient rings, such as to formal power series algebras over $\mathbb{C}[ [\hbar] ]$ (Bordemann & Waldmann 1996).

The GNS-construction plays a central role in algebraic quantum field theory (cf. Haag 1996, Moretti 2017, Khavkine & Moretti 2015), where $\mathcal{A}$ plays the role of an algebra of observables and $\rho \colon \mathcal{A} \to \mathbb{C}$ the role of an actual state of a physical system (whence the terminology) jointly constituting the “Heisenberg picture”-perspective of quantum physics; so that the GNS-construction serves to re-construct a corresponding Hilbert space of states as in the Schrödinger picture of quantum physics. In this context the version for C*-algebras corresponds to non-perturbative quantum field theory, while the generalization to formal power series algebras corresponds to perturbative quantum field theory.

Details

under construction

For $C^\ast$ -algebras

Theorem

Given

a C*-algebra $\mathcal{A}$ ;
a state $\rho \;\colon\; \mathcal{A} \to \mathbb{C}$ in the sense of
1. a linear map on the underlying vector space
  
  (1) $\rho \,\colon\, \mathcal{A} \to \mathbb{C} \,,$
2. which takes star-involution to complex conjugation
  
  (2) $A \in \mathcal{A} \;\;\; \vdash \;\;\; \rho\big(A^\ast\big) = \overline{\rho(A)} \,,$
3. and satisfies “positivity” in the sense that
  
  (3) $A \in \mathcal{A} \;\;\; \vdash \;\;\; \rho(A^\ast A) \in \mathbb{R}_{\geq 0} \subset \mathbb{C} \,,$

then there exists

a C*-representation

$\pi \;\colon\; \mathcal{A} \longrightarrow End(\mathcal{H})$

of $\mathcal{A}$ on some Hilbert space $\mathcal{H}$
a cyclic vector $\psi_\rho \in \mathcal{H}$

such that $\rho$ is the pure state corresponding to $\psi_\rho$ , in that

\begin{aligned} \rho(A) & = \langle \psi_\rho \vert\, A \, \vert \psi_\rho \rangle \\ & \coloneqq \langle \psi_\rho , \pi(A) \psi_\rho \rangle \end{aligned}

for all $A \in \mathcal{A}$ .

Proof

Consider on the underlying complex vector space of $\mathcal{A}$ the sesquilinear form (inner product)

(4)

\langle A,B \rangle_\rho \;\coloneqq\; \rho \big( A^\ast B \big) \,.

By the “positivity”-condition (3) on $\rho$ , the pairing $\langle-,-\rangle$ is positive semi-definite, and therefore it satisfies the Cauchy-Schwarz inequality:

(5)

{\big\vert \rho\big( A^\ast B \big) \big\vert}^2 \;\leq\; \rho\big(A^\ast A\big) \, \rho(B^\ast B) \,.

However, (4) will in general not be definite, in that there may be a non-trivial linear subspace of norm=0 elements:

(6)

\mathcal{N} \;\coloneqq\; \Big\{ A \in \mathcal{A} \,\vert\, \rho\big(A^\ast A\big) = 0 \Big\} \,,

and hence we have to quotient out by this null-space in order to produce the desired Hilbert space.

Observe that this null space (6) is not just a linear subspace but a left ideal for the algebra structure, as follows by the Cauchy-Schwarz inequality (5):

(7)

\left. \begin{array}{l} N \in \mathcal{N} \\ A \in \mathcal{A} \end{array} \right\} \;\;\; \vdash \;\;\; \left\{ \begin{array}{l} \big\vert \rho\big( (A N)^\ast A N \big) \big\vert^2 \\ \;=\; \big\vert \rho\big( (N^\ast A^\ast A) N \big) \big\vert^2 \\ \;\leq\; \rho\big( (N^\ast A^\ast A) (N^\ast A^\ast A)^\ast \big) \, \underset{ = 0 }{ \underbrace{ \rho\big( N^\ast N \big) \,. } } \end{array} \right.

Similarly, the Cauchy-Schwarz inequality (5) implies that any inner product with a null vector vanishes:

(8)

\left. \begin{array}{l} N \in \mathcal{N} \\ A \in \mathcal{A} \end{array} \right\} \;\; \Rightarrow \;\; \rho\big( A^\ast N \big) \;=\; 0 \,.

Therefore $\langle-,-\rangle$ first of all descends to the quotient vector space

(9)

\mathscr{H} \;\coloneqq\; \mathcal{A}/\mathcal{N} \,,

because

\begin{array}{l} \big\langle A_1 ,\, A_2 + N_2 \big\rangle \\ \;\equiv\; \rho\big( A_1^\ast (A_2 + N_2) \big) \\ \;=\; \rho\big( A_1^\ast A_2 \big) + \rho\big( A_1^\ast N_2 \big) \\ \;=\; \rho\big( A_1^\ast A_2 \big) \,, \end{array}

where in the last step we used (8), and from this:

\begin{array}{l} \big\langle A_1 + N_1 ,\, A_2 \big\rangle \\ \;=\; \overline{ \big\langle A_2 ,\, A_1 + N_1 \big\rangle } \\ \;=\; \overline{ \big\langle A_2 ,\, A_1 \big\rangle } \;=\; \big\langle A_1 ,\, A_2 \big\rangle \,, \end{array}

where in the first and last step we used (2).

Descended to the quotient this way, the pairing $\langle-,-\rangle$ becomes positive definite by construction, so that it defines a Hermitian (by (2)) inner product on $\mathscr{H}$ , making it the desired Hilbert space.

Finally, again by the left-ideal property (7), the left multiplication action of $\mathcal{A}$ on itself also descends to an action on the quotient Hilbert space (9):

\array{ \mathcal{A} \otimes \mathcal{H} & \overset{ \;\;\;\;\; \pi \;\;\;\;\; }{ \longrightarrow } & \mathcal{H} \\ (A, [\psi]) &\mapsto& [A \cdot \psi] \,, }

and so the cyclic vector in question is that represented by the unit element $1 \in \mathcal{A}$ :

\psi_\rho \;\coloneqq\; [1] \;\in\; \mathscr{H} \,.

Hence on this Hilbert space $\mathscr{H}$ , the original operator-algebraic state $\rho$ is now represented by the tautological density matrix

\left\vert \psi_\rho \right\rangle \left\langle \psi_\rho \right\rangle \;=\; {\big\vert [1] \big\rangle} {\big\langle [1] \big\vert} \,.

In summary, notice that this GNS construction constitutes a kind of operator-state correspondence modulo null-operators:

\begin{array}{rcl} \mathcal{A}/\mathcal{N} &\xleftrightarrow{\phantom{---}}& \mathscr{H} \\ [A] &\mapsto& A \cdot \psi_\rho \end{array}

For $C^\ast$ -categories

The GNS construction for $C^\ast$ -algebras is a special case of a more general construction of Ghez, Lina & Roberts 1985, Prop. 1.9 applied to C*-categories (the horizontal categorification of $C^\ast$ -algebras):

Theorem

Let $\mathcal{C}$ be a $C^\ast$ -category. Fix an object $A \in \operatorname{Ob}\mathcal{C}$ and let $\sigma$ be a state on the $C^\ast$ -algebra $\mathcal{C}(A,A)$ . Then there exists a $*$ -representation

\rho_\sigma \colon \mathcal{C} \to \mathbf{Hilb}

together with a cyclic vector $\xi \in \rho_\sigma(A)$ such that for all $x \in \mathcal{C}(A,A)$ ,

\sigma(x) = \langle \xi, \rho_\sigma(x)\xi \rangle.

A C*-algebra $\mathcal{A}$ is a $C^\ast$ -category with a single object $\bullet$ , where we make the identification $A = \mathcal{A}(\bullet,\bullet)$ . In this case the theorem reduces to the classical GNS construction.

Functorial Aspects

See Functorial Aspects of the GNS Representation.

Related concepts

Riesz representation theorem

quantum probability theory – observables and states

References

The original construction for C*-algebras and C*-representations is due to:

Israel Gelfand, Mark Naimark, On the imbedding of normed rings into the ring of operators on a Hilbert space, Matematicheskii Sbornik. 12 (2): 197–217 (1943)

reprinted in:

Robert Doran (ed.), $C^\ast$ -Algebras: 1943–1993, Contemporary Mathematics 167, AMS 1994 (doi:10.1090/conm/167)
Irving Segal, Irreducible representations of operator algebras, Bull. Am. Math. Soc. 53: 73–88, (1947) (pdf, euclid)

Textbook accounts:

Gerard Murphy, Section 3.4 of: $C^\ast$ -algebras and Operator Theory, Academic Press 1990 (doi:10.1016/C2009-0-22289-6)
Konrad Schmüdgen, Section 8.3 of: Unbounded operator algebras and representation theory, Operator theory, advances and applications, vol. 37. Birkhäuser, Basel (1990) (doi:10.1007/978-3-0348-7469-4)
Kehe Zhu, Section 14 of: An Introduction to Operator Algebras, CRC Press 1993 (ISBN:9780849378751)
Richard V. Kadison, John R. Ringrose, Theorem 4.5.2 in: Fundamentals of the theory of operator algebras – Volume I: Elementary Theory, Graduate Studies in Mathematics 15, AMS 1997 (ISBN:978-0-8218-0819-1, ZMATH)

in the context of algebraic quantum field theory:

Rudolf Haag, pp 123 of: Local Quantum Physics – Fields, Particles, Algebras, Texts and Monographs in Physics, Springer (1996) [ISBN 978-3-642-61458-3]
Valter Moretti, §14.1.3-5 in: Spectral Theory and Quantum Mechanics – Mathematical Foundations of Quantum Theories, Symmetries and Introduction to the Algebraic Formulation, Springer (2017) [doi:10.1007/978-3-319-70706-8]

Review with an eye towards quantum probability and entropy:

A. P. Balachandran, T. R. Govindarajan, Amilcar R. de Queiroz, A. F. Reyes-Lega, Section II of: Algebraic approach to entanglement and entropy, Phys. Rev. A 88 (2013) 022301 [arXiv:1301.1300, doi:10.1103/PhysRevA.88.022301]

nLab Gelfand-Naimark-Segal construction

Context

Functional analysis

Overview diagrams

Basic concepts

Theorems

Topics in Functional Analysis

Algebraic Field Theory

Concepts

Theorems

States and observables

Operator algebra

Local QFT

Perturbative QFT

Contents

Idea

Details

For $C^\ast$ -algebras

Theorem

Proof

For $C^\ast$ -categories

Theorem

Functorial Aspects

Related concepts

References

nLab Gelfand-Naimark-Segal construction

Context

Functional analysis

Overview diagrams

Basic concepts

Theorems

Topics in Functional Analysis

Algebraic Field Theory

Concepts

Theorems

States and observables

Operator algebra

Local QFT

Perturbative QFT

Contents

Idea

Details

For C *C^\ast-algebras

Theorem

Proof

For C *C^\ast-categories

Theorem

Functorial Aspects

Related concepts

References

For $C^\ast$ -algebras

For $C^\ast$ -categories