Mathematical Methods for Physics and Engineering : A Comprehensive Guide

(Darren Dugan) #1

28.7 SUBDIVIDING A GROUP


(i) the set of elementsH′inG′that are images of the elements ofGforms a
subgroup ofG′;
(ii) the set of elementsKinGthat are mapped onto the identityI′inG′forms
a subgroup ofG.

As indicated in the previous section, the subgroupKis called thekernelof the


homomorphism.


To prove (i), supposeZandWbelong toH′, withZ=X′andW=Y′,where

XandYbelong toG.Then


ZW=X′Y′=(XY)′

and therefore belongs toH′,and


Z−^1 =(X′)−^1 =(X−^1 )′

and therefore belongs toH′. These two results, together with the fact thatI′


belongs toH′, are enough to establish result (i).


To prove (ii), supposeXandYbelong toK;then

(XY)′=X′Y′=I′I′=I′ (closure),

I′=(XX−^1 )′=X′(X−^1 )′=I′(X−^1 )′=(X−^1 )′

and thereforeX−^1 belongs toK. These two results, together with the fact thatI


belongs toK, are enough to establish (ii). An illustration of this result is provided


by the mapping Φ of →U(1) considered in the previous section. Its kernel


consists of the set of real numbers of the form 2πn,wherenis an integer; it forms


a subgroup ofR, the additive group of real numbers.


In fact the kernelKof a homomorphism is anormalsubgroup ofG.The

defining property of such a subgroup is that for every elementXinGand every


elementYin the subgroup,XY X−^1 belongs to the subgroup. This property is


easily verified for the kernelK,since


(XY X−^1 )′=X′Y′(X−^1 )′=X′I′(X−^1 )′=X′(X−^1 )′=I′.

Anticipating the discussion of subsection 28.7.2, the cosets of a normal subgroup


themselves form a group (see exercise 28.16).


28.7 Subdividing a group

We have already noted, when looking at the (arbitrary) order of headings in a


group table, that some choices appear to make the table more orderly than do


others. In the following subsections we will identify ways in which the elements


of a group can be divided up into sets with the property that the members of any


one set are more like the other members of the set, in some particular regard,

Free download pdf