Mathematical Methods for Physics and Engineering : A Comprehensive Guide

(Darren Dugan) #1

REPRESENTATION THEORY


column matrices (P R Q)Tand (Q P R)Trespectively. The forms of the representative
matricesMnat(X), (29.2), are now determined by equations such as, for elementE,



Q


P


R



=




010


100


001






P


Q


R




implying that


Dnat(E)=



010


100


001




T

=



010


100


001



.


In this way the complete representation is obtained as


Dnat(I)=



100


010


001



, Dnat(A)=



001


100


010



, Dnat(B)=



010


001


100



,


Dnat(C)=



100


001


010



, Dnat(D)=



001


010


100



, Dnat(E)=



010


100


001



.


It should be emphasised that although the group contains six elements this representation
is three-dimensional.


We will concentrate on matrix representations offinitegroups, particularly

rotation and reflection groups (the so-called crystal point groups). The general


ideas carry over to infinite groups, such as the continuous rotation groups, but in


a book such as this, which aims to cover many areas of applicable mathematics,


some topics can only be mentioned and not explored. We now give the formal


definition of a representation.


Definition.A representationD={D(X)}of a groupGis an assignment of a non-


singular squaren×nmatrixD(X)to each elementXbelonging toG, such that


(i)D(I)=In,the unitn×nmatrix,
(ii)D(X)D(Y)=D(XY)for any two elementsXandYbelonging toG,i.e.the
matrices multiply in the same way as the group elements they represent.

As mentioned previously, a representation byn×nmatrices is said to be an

n-dimensional representationofG. The dimensionnis not to be confused with


g, the order of the group, which gives the number of matrices needed in the


representation, though they might not all be different.


A consequence of the two defining conditions for a representation is that the

matrix associated with the inverse ofXis the inverse of the matrix associated


withX. This follows immediately from settingY=X−^1 in (ii):


D(X)D(X−^1 )=D(XX−^1 )=D(I)=In;

hence


D(X−^1 )=[D(X)]−^1.
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