Mathematical Methods for Physics and Engineering : A Comprehensive Guide

(Darren Dugan) #1

26.15 The metric tensor


second-order tensorT. Using the outer product notation in (26.23), we may write


Tin three different ways:


T=Tijei⊗ej=Tijei⊗ej=Tijei⊗ej,

whereTij,Tij andTijare called thecontravariant, mixedandcovariantcom-


ponents ofTrespectively. It is important to remember that these three sets of


quantities form the components of thesametensorTbut refer to different (tensor)


bases made up from the basis vectors of the coordinate system. Again, if we are


using Cartesian coordinates then all three sets of components are identical.


We may generalise the above equation to higher-order tensors. Components

carrying only superscripts or only subscripts are referred to as the contravariant


and covariant components respectively; all others are called mixed components.


26.15 The metric tensor

Any particular curvilinear coordinate system is completely characterised at each


point in space by the nine quantities


gij=ei·ej, (26.56)

which, as we will show, are the covariant components of a symmetric second-order


tensorgcalled themetric tensor.


Since an infinitesimal vector displacement can be written asdr=duiei, we find

that the square of the infinitesimal arc length (ds)^2 can be written in terms of the


metric tensor as


(ds)^2 =dr·dr=duiei·dujej=gijduiduj. (26.57)

It may further be shown that the volume elementdVis given by


dV=


gdu^1 du^2 du^3 , (26.58)

wheregis the determinant of the matrix [gij], which has the covariant components


of the metric tensor as its elements.


If we compare equations (26.57) and (26.58) with the analogous ones in section

10.10 then we see that in the special case where the coordinate system is orthogonal


(so thatei·ej=0fori=j) the metric tensor can be written in terms of the


coordinate-system scale factorshi,i=1, 2 ,3as


gij=

{
h^2 i i=j,

0 i=j.

Its determinant is then given byg=h^21 h^22 h^23.

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