1. Definition

2. The orthogonal group

3. See also

4. References

In mathematics, a Brauer algebra is an algebra introduced by {{harvs|txt|authorlink=Richard Brauer|first=Richard|last=Brauer|year=1937|loc=section 5}} used in the representation theory of the orthogonal group. It plays the same role that the symmetric group does for the representation theory of the general linear group in Schur–Weyl duality.

Definition

The Brauer algebra depends on the choice of a positive integer n and a number d (which in practice is often the dimension of the fundamental representation of an orthogonal group O_d). The Brauer algebra has dimension (2n)!/2ⁿn! = (2n − 1)(2n − 3) ··· 5·3·1 and has a basis consisting of all pairings on a set of 2n elements X₁, ..., X_n, Y₁, ..., Y_n (that is, all perfect matchings of a complete graph K_2n: any two of the 2n elements may be matched to each other, regardless of their symbols). The elements X_i are usually written in a row, with the elements Y_i beneath them. The product of two basis elements A and B is obtained by first identifying the endpoints in the bottom row of A and the top row of B (Figure AB in the diagram), then deleting the endpoints in the middle row and joining endpoints in the remaining two rows if they are joined, directly or by a path, in AB (Figure AB=nn in the diagram).

The orthogonal group

If O_d(R) is the orthogonal group acting on V = R^d, then

the Brauer algebra has a natural action on the space of polynomials on Vⁿ commuting with the action of the orthogonal group.

See also

• Birman–Wenzl algebra, a deformation of the Brauer algebra.

References

• {{Citation | last1=Brauer | first1=Richard | authorlink = Richard Brauer | title=On Algebras Which are Connected with the Semisimple Continuous Groups | jstor=1968843 | publisher=Annals of Mathematics | series=Second Series | year=1937 | journal=Annals of Mathematics | issn=0003-486X | volume=38 | issue=4 | pages=857–872 | doi=10.2307/1968843}}
• {{Citation | last1=Wenzl | first1=Hans | title=On the structure of Brauer's centralizer algebras | jstor=1971466 | mr=951511 | year=1988 | journal=Annals of Mathematics |series=Second Series | issn=0003-486X | volume=128 | issue=1 | pages=173–193 | doi=10.2307/1971466}}
• {{Citation | last1=Weyl | first1=Hermann | author1-link=Hermann Weyl | title=The Classical Groups: Their Invariants and Representations | url=https://books.google.com/books?id=zmzKSP2xTtYC | accessdate=03/2007/26 | publisher=Princeton University Press | isbn=978-0-691-05756-9 | mr=0000255 | year=1946}}

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