CCR and CAR algebras explained

In mathematics and physics CCR algebras (after canonical commutation relations) and CAR algebras (after canonical anticommutation relations) arise from the quantum mechanical study of bosons and fermions, respectively. They play a prominent role in quantum statistical mechanics^[1] and quantum field theory.

CCR and CAR as *-algebras

Let

be a real vector space equipped with a nonsingular real antisymmetric bilinear form

( ⋅ , ⋅ )

(i.e. a symplectic vector space). The unital

-algebra

generated by elements of

subject to the relations

fg-gf=i(f,g)

f^*=f,

for any

f,~g

is called the canonical commutation relations (CCR) algebra. The uniqueness of the representations of this algebra when

is finite dimensional is discussed in the Stone–von Neumann theorem.

is equipped with a nonsingular real symmetric bilinear form

( ⋅ , ⋅ )

instead, the unital *-algebra generated by the elements of

subject to the relations

fg+gf=(f,g),

f^*=f,

for any

f,~g

is called the canonical anticommutation relations (CAR) algebra.

The C*-algebra of CCR

There is a distinct, but closely related meaning of CCR algebra, called the CCR C*-algebra. Let

be a real symplectic vector space with nonsingular symplectic form

( ⋅ , ⋅ )

. In the theory of operator algebras, the CCR algebra over

is the unital C*-algebra generated by elements

\{W(f):~f\inH\}

subject to

W(f)W(g)=e^-i(f,g)W(f+g),

W(f)^*=W(-f).

These are called the Weyl form of the canonical commutation relations and, in particular, they imply that each

W(f)

is unitary and

W(0)=1

. It is well known that the CCR algebra is a simple (unless the sympletic form is degenerate) non-separable algebra and is unique up to isomorphism.^[2]

When

is a complex Hilbert space and

( ⋅ , ⋅ )

is given by the imaginary part of the inner-product, the CCR algebra is faithfully represented on the symmetric Fock space over

by setting

W(f)\left(1,g,	g^⊗	,
	2!

	g^⊗
	3!

,\ldots\right)=

-	1	\\|f\\|^2-\langlef,g\rangle
	2

\left(1,f+g,

	(f+g)^⊗
	2!

	(f+g)^⊗
	3!

,\ldots\right),

for any

f,g\inH

. The field operators

B(f)

are defined for each

f\inH

as the generator of the one-parameter unitary group

(W(tf))_t\inR

on the symmetric Fock space. These are self-adjoint unbounded operators, however they formally satisfy

B(f)B(g)-B(g)B(f)=2i\operatorname{Im}\langlef,g\rangle.

As the assignment

f\mapstoB(f)

is real-linear, so the operators

B(f)

define a CCR algebra over

(H,2\operatorname{Im}\langle ⋅ , ⋅ \rangle)

in the sense of Section 1.

The C*-algebra of CAR

Let

be a Hilbert space. In the theory of operator algebras the CAR algebra is the unique C*-completion of the complex unital *-algebra generated by elements

\{b(f),b^*(f):~f\inH\}

subject to the relations

b(f)b^*(g)+b^{*(g)b(f)=\langle}f,g\rangle,

b(f)b(g)+b(g)b(f)=0,

λb^*(f)=b^*(λf),

b(f)^*=b^*(f),

for any

f,g\inH

λ\inC

.When

is separable the CAR algebra is an AF algebra and in the special case

is infinite dimensional it is often written as

{M
	2^infty

(C)}

.^[3]

Let

F_a(H)

be the antisymmetric Fock space over

and let

P_a

be the orthogonal projection onto antisymmetric vectors:

P_a:

	infty
oplus
	n=0

H^⊗\toF_a(H).

The CAR algebra is faithfully represented on

F_a(H)

by setting

	*(f)P
b
	a(g

_{1 ⊗}g_{2 ⊗ … ⊗}g_n)=P_{a(f ⊗}g_{1 ⊗}g_{2 ⊗ … ⊗}g_n)

for all

f,g_1,\ldots,g_n\inH

and

n\inN

. The fact that these form a C*-algebra is due to the fact that creation and annihilation operators on antisymmetric Fock space are bona-fide bounded operators. Moreover, the field operators

B(f):=b^*(f)+b(f)

satisfy

B(f)B(g)+B(g)B(f)=2Re\langlef,g\rangle,

giving the relationship with Section 1.

Superalgebra generalization

Let

be a real

Z₂

-graded vector space equipped with a nonsingular antisymmetric bilinear superform

( ⋅ , ⋅ )

(i.e.

(g,f)=-(-1)^|f||g|(f,g)

) such that

(f,g)

is real if either

is an even element and imaginary if both of them are odd. The unital *-algebra generated by the elements of

subject to the relations

fg-(-1)^|f||g|gf=i(f,g)

f^*=f,~g^*=g

for any two pure elements

f,~g

is the obvious superalgebra generalization which unifies CCRs with CARs: if all pure elements are even, one obtains a CCR, while if all pure elements are odd, one obtains a CAR.

In mathematics, the abstract structure of the CCR and CAR algebras, over any field, not just the complex numbers, is studied by the name of Weyl and Clifford algebras, where many significant results have accrued. One of these is that the graded generalizations of Weyl and Clifford algebras allow the basis-free formulation of the canonical commutation and anticommutation relations in terms of a symplectic and a symmetric non-degenerate bilinear form. In addition, the binary elements in this graded Weyl algebra give a basis-free version of the commutation relations of the symplectic and indefinite orthogonal Lie algebras.^[4]

References

Book: Bratteli . Ola . Operator Algebras and Quantum Statistical Mechanics: v.2 . Robinson . Derek W. . Springer, 2nd ed . 1997 . 978-3-540-61443-2 . Ola Bratteli . Derek W. Robinson.
Book: Petz, Denes . An Invitation to the Algebra of Canonical Commutation Relations . Leuven University Press . 1990 . 978-90-6186-360-1 .
Book: Evans . David E. . David E. Evans. Kawahigashi . Yasuyuki . Yasuyuki Kawahigashi . Quantum Symmetries in Operator Algebras. Oxford University Press. 1998. 978-0-19-851175-5. .
Roger Howe. Remarks on Classical Invariant Theory. Transactions of the American Mathematical Society. 313. 1989. 2. 539–570. 2001418. 10.1090/S0002-9947-1989-0986027-X. free.

CCR and CAR algebras explained

CCR and CAR as *-algebras

The C*-algebra of CCR

The C*-algebra of CAR

Superalgebra generalization

See also

References