Mathematical Methods for Physics and Engineering : A Comprehensive Guide

(Darren Dugan) #1

28.6 SUBGROUPS


(a)

IABCDE


I IABCDE


A AB IECD


B BIADEC


C CDE I AB


D DECB I A


E ECDAB I


(b)

IABC


I IABC


A AICB


B BC I A


C CBAI


Table 28.9 Reproduction of (a) table 28.8 and (b) table 28.3 with the relevant
subgroups shown in bold.

For the sake of completeness, we add that a homomorphism for which (I) above

holds is said to be amonomorphism(or an isomorphisminto), whilst a homomor-


phism for which (II) holds is called anepimorphism(or an isomorphismonto). If,


in either case, the other requirement is met as well then the monomorphism or


epimorphism is also an isomorphism.


Finally, if the initial and final groups are the same,G=G′, then the isomorphism

G→G′is termed anautomorphism.


28.6 Subgroups

More detailed inspection of tables 28.8 and 28.3 shows that not only do the


complete tables have the properties associated with a group multiplication table


(see section 28.2) but so do the upper left corners of each table taken on their


own. The relevant parts are shown in bold in the tables 28.9(a) and (b).


This observation immediately prompts the notion of asubgroup. A subgroup

of a groupGcan be formally defined as any non-empty subsetH={Hi}of


G, the elements of which themselves behave as a group under the same rule of


combination as applies inGitself. As for all groups, the order of the subgroup is


equal to the number of elements it contains; we will denote it byhor|H|.


Any groupGcontains two trivial subgroups:

(i)Gitself;
(ii) the setIconsisting of the identity element alone.

All other subgroups ofGare termedproper subgroups. In a group with multipli-


cation table 28.8 the elements{I, A, B}form a proper subgroup, as do{I, A}in a


group with table 28.3 as its group table.


Some groups have no proper subgroups. For example, the so-calledcyclic

groups, mentioned at the end of subsection 28.1.1, have no subgroups other


than the whole group or the identity alone. Tables 28.10(a) and (b) show the


multiplication tables for two of these groups. Table 28.6 is also the group table


for a cyclic group, that of order 4.

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