Permutation relationships

permutation relations

Rules for permuting the product of two creation or annihilation operators. That is, for the annihilation operators and the adjoint creation operators , where is some Hilbert space, acting in the symmetric Fock space over , these relationships take the form

(1)

where is the inner product in and is the identity operator acting in . The relations (1) are also called the commutation relations. In the case of an anti-symmetric Fock space, the creation and annihilation operators permute in accordance with the rules

(2)

which are called the anti-commutation relations.

In the case of an infinite-dimensional space , besides the creation and annihilation operators acting in Fock spaces over there exist other irreducible representations not equivalent to them for the commutation and anti-commutation relations, i.e. other families of operators acting in some Hilbert space and satisfying the permutation rules (1) or (2) [1], . In the case of a finite-dimensional Hilbert space , all the irreducible representations of (1) or (2) are unitarily equivalent.

References

Comments

The abbreviations CCR and CAR, which stand for canonical commutation relations and canonical anti-commutation relations are often used for relations (1) and (2). One also speaks of CCR algebras and CAR algebras.

References