Proofs involving covariant derivatives

Contracted Bianchi identities

R_{{abmn;l}}+R_{{ablm;n}}+R_{{abnl;m}}=0\,\!

Contract both sides of the above equation with a pair of metric tensors:

g^{{bn}}g^{{am}}(R_{{abmn;l}}+R_{{ablm;n}}+R_{{abnl;m}})=0,\,\!

g^{{bn}}(R^{m}{}_{{bmn;l}}-R^{m}{}_{{bml;n}}+R^{m}{}_{{bnl;m}})=0,\,\!

g^{{bn}}(R_{{bn;l}}-R_{{bl;n}}-R_{b}{}^{m}{}_{{nl;m}})=0,\,\!

R^{n}{}_{{n;l}}-R^{n}{}_{{l;n}}-R^{{nm}}{}_{{nl;m}}=0.\,\!

The first term on the left contracts to yield a Ricci scalar, while the third term contracts to yield a mixed Ricci tensor,

R_{{;l}}-R^{n}{}_{{l;n}}-R^{m}{}_{{l;m}}=0.\,\!

The last two terms are the same (changing dummy index n to m) and can be combined into a single term which shall be moved to the right,

R_{{;l}}=2R^{m}{}_{{l;m}},\,\!

which is the same as

\nabla _{m}R^{m}{}_{l}={1 \over 2}\nabla _{l}R\,\!

Swapping the index labels l and m yields

\nabla _{l}R^{l}{}_{m}={1 \over 2}\nabla _{m}R\,\!

, Q.E.D. (return to article)

The last equation in Proof 1 above can be expressed as

\nabla _{l}R^{l}{}_{m}-{1 \over 2}\delta ^{l}{}_{m}\nabla _{l}R=0\,\!

where δ is the Kronecker delta. Since the mixed Kronecker delta is equivalent to the mixed metric tensor,

\delta ^{l}{}_{m}=g^{l}{}_{m},\,\!

and since the covariant derivative of the metric tensor is zero (so it can be moved in or out of the scope of any such derivative), then

\nabla _{l}R^{l}{}_{m}-{1 \over 2}\nabla _{l}g^{l}{}_{m}R=0.\,\!

Factor out the covariant derivative

\nabla _{l}\left(R^{l}{}_{m}-{1 \over 2}g^{l}{}_{m}R\right)=0,\,\!

then raise the index m throughout

\nabla _{l}\left(R^{{lm}}-{1 \over 2}g^{{lm}}R\right)=0.\,\!

The expression in parentheses is the Einstein tensor, so ^[1]

\nabla _{l}G^{{lm}}=0,\,\!

Q.E.D. (return to article)

this means that the covariant divergence of the Einstein tensor vanishes.

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Danielson, Donald A. (2003). Vectors and Tensors in Engineering and Physics (2/e ed.). Westview (Perseus). ISBN 978-0-8133-4080-7.
Lovelock, David; Hanno Rund (1989) [1975]. Tensors, Differential Forms, and Variational Principles. Dover. ISBN 978-0-486-65840-7.
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T. Frankel (2012), The Geometry of Physics (3rd ed.), Cambridge University Press, ISBN 978-1107-602601

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