How Do You Take the Covariant Derivative of a Tensor Twice?

Mr-R
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Doing some problems in D'INVERNO GR textbook and I am stuck on taking the covariant derivation of a tensor twice. Please see the attached picture and please do inform me if something is not clear :smile:
 

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Hello.
Where do e comes from??

Take ##A^i=B^i_jC^j##.
j is a dummy index, there is a summation over j.
i can be 1, 2 or 3. This equation tells that the equality is true for all three values of i.
##A^k=B^k_jC^j## is exactly the same as ##A^i=B^i_jC^j##, you must not keep track of indices from one equation to another.
 
Heya bloby,

For e, I just chose a new tensor to represent the covariant derivative of the original tensor. Then what should I have named it? T^{a}_{b} ?

Thanks
 
Rather ##T^a_d## the same indices than LHS. The indices are related to basis element. They must be consistent within an equation, like ##v^i=\frac{dx^i}{dt}##, not ##v^i=\frac{dx^j}{dt}##. The 3rd and 4th line of the thumbnail are the same(after corrections) with renamed indices .
 
bloby said:
Rather ##T^a_d## the same indices than LHS. The indices are related to basis element. They must be consistent within an equation, like ##v^i=\frac{dx^i}{dt}##, not ##v^i=\frac{dx^j}{dt}##. The 3rd and 4th line of the thumbnail are the same(after corrections) with renamed indices .

Much Appreciated bloby :smile:

Thanks
 

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