Mathematical Methods for Physics and Engineering : A Comprehensive Guide

(Darren Dugan) #1

26.19 COVARIANT DIFFERENTIATION


constant (this term vanishes in Cartesian coordinates). Using (26.75) we write


∂v
∂uj

=

∂vi
∂uj

ei+viΓkijek.

Sinceiandkare dummy indices in the last term on the right-hand side, we may


interchange them to obtain


∂v
∂uj

=

∂vi
∂uj

ei+vkΓikjei=

(
∂vi
∂uj

+vkΓikj

)
ei. (26.86)

The reason for the interchanging the dummy indices, as shown in (26.86), is that


we may now factor outei. The quantity in parentheses is called thecovariant


derivative, for which the standard notation is


vi;j≡

∂vi
∂uj

+Γikjvk, (26.87)

the semicolon subscript denoting covariant differentiation. A similar short-hand


notation also exists for the partial derivatives, a comma being used for these


instead of a semicolon; for example,∂vi/∂uj is denoted byvi,j. In Cartesian


coordinates all the Γikjare zero, and so the covariant derivative reduces to the


simple partial derivative∂vi/∂uj.


Using the short-hand semicolon notation, the derivative of a vector may be

written in the very compact form


∂v
∂uj

=vi;jei

and, by the quotient rule (section 26.7), it is clear that thevi;jare the (mixed)


components of a second-order tensor. This may also be verified directly, using


the transformation properties of∂vi/∂ujand Γikjgiven in (26.84) and (26.78)


respectively.


In general, we may regard thevi;jas the mixed components of a second-

order tensor called the covariant derivative ofvand denoted by∇v. In Cartesian


coordinates, the components of this tensor are just∂vi/∂xj.


Calculatevi;iin cylindrical polar coordinates.

Contracting (26.87) we obtain


vi;i=

∂vi
∂ui

+Γikivk.

Now from (26.83) we have


Γi 1 i=Γ^111 +Γ^212 +Γ^313 =1/ρ,
Γi 2 i=Γ^121 +Γ^222 +Γ^323 =0,
Γi 3 i=Γ^131 +Γ^232 +Γ^333 =0,
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