Mathematical Methods for Physics and Engineering : A Comprehensive Guide

(Darren Dugan) #1

26.15 THE METRIC TENSOR


where we have used the reciprocity relation (26.54). Similarly, we could write


a·b=aiei·bjej=aibjδji=aibi. (26.64)

By comparing the four alternative expressions (26.61)–(26.64) for the scalar

product of two vectors we can deduce one of the most useful properties of


the quantitiesgijandgij.Sincegijaibj=aibiholds for any arbitrary vector


componentsai, it follows that


gijbj=bi,

which illustrates the fact that the covariant componentsgijofthemetrictensor


can be used tolower an index. In other words, it provides a means of obtaining


the covariant components of a vector from its contravariant components. By a


similar argument, we have


gijbj=bi,

so that the contravariant componentsgijcan be used to perform the reverse


operation ofraising an index.


It is straightforward to show that the contravariant and covariant basis vectors,

eiandeirespectively, are related in the same way as other vectors, i.e. by


ei=gijej and ei=gijej.

We also note that, sinceeiandeiare reciprocal systems of vectors in three-


dimensional space (see chapter 7), we may write


ei=

ej×ek
ei·(ej×ek)

,

for the combination of subscriptsi, j, k=1, 2 ,3 and its cyclic permutations. A


similar expression holds foreiin terms of theei-basis. Moreover, it may be shown


that|e 1 ·(e 2 ×e 3 )|=



g.

Show that the matrix[gij]is the inverse of the matrix[gij]. Hence calculate the con-
travariant componentsgijof the metric tensor in cylindrical polar coordinates.

Using the index-lowering and index-raising properties ofgijandgijon an arbitrary vector
a, we find


δikak=ai=gijaj=gijgjkak.

But, sinceais arbitrary, we must have


gijgjk=δki. (26.65)

Denoting the matrix [gij]byGand [gij]byGˆ, equation (26.65) can be written in matrix
form asGGˆ =I,whereIis the unit matrix. HenceGandGˆare inverse matrices of each
other.

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