Mathematical Methods for Physics and Engineering : A Comprehensive Guide

(Darren Dugan) #1

REPRESENTATION THEORY


of simple pair interchanges to which a permutation is equivalent. That these


assignments are in accord with the group multiplication table 28.8 should be


checked.


Thus the three irreps of the groupG(i.e. the group 3morC 3 vorS 3 ), are, using

the conventional notation A 1 ,A 2 , E (see section 29.8), as follows:


Element
IABCDE
A 1 11 1 1 1 1
Irrep A 2 11 1− 1 − 1 − 1
E MI MA MB MC MD ME

(29.12)

where


MI=

(
10

01

)

, MA=

(
−^12


3
2


3
2 −

1
2

)

, MB=

(
−^12 −


3
√^2
3
2 −

1
2

)

,

MC=

(
− 10

01

)

, MD=

(
1
2 −


3
2


3
2 −

1
2

)

, ME=

(
1
2


3
√^2
3
2 −

1
2

)

.

29.5 The orthogonality theorem for irreducible representations

We come now to the central theorem of representation theory, a theorem that


justifies the relatively routine application of certain procedures to determine


the restrictions that are inherent in physical systems that have some degree of


rotational or reflection symmetry. The development of the theorem is long and


quite complex when presented in its entirety, and the reader will have to refer


elsewhere for the proof.§


The theorem states that, in a certain sense, the irreps of a groupGare as

orthogonal as possible, as follows. If, for each irrep, the elements in any one


positionineachofthegmatricesareusedtomakeupg-component column


matrices then


(i) any two such column matrices coming from different irreps are orthogonal;
(ii) any two such column matrices coming from different positions in the
matrices of the same irrep are orthogonal.

This orthogonality is in addition to the irreps’ being in the form of orthogo-


nal (unitary) matrices and thus each comprising mutually orthogonal rows and


columns.


§See, e.g., H. F. Jones,Groups, Representations and Physics(Bristol: Institute of Physics, 1998); J.
F. Cornwell,Group Theory in Physics, vol 2 (London: Academic Press, 1984); J-P. Serre,Linear
Representations of Finite Groups(New York: Springer, 1977).
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