Talk:Curvature collineation

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Definition of a cc

This is how the Riemann tensor is defined ('1 up and 3 down'). By writing ${\displaystyle {\mathcal {L}}_{X}R=0}$ , the definition is ambiguous unless it is specified where the indices are - the positions of the indices matters in the definition of a cc (unless ${\displaystyle {\mathcal {L}}_{X}g=0}$ , i.e., unless ${\displaystyle X}$  is Killing, which in general isn't true).

You're quite right. Unfortunately the index placement is not enough to be unambiguous since it differs according to which definition of R you use.--MarSch 14:57, 20 Jun 2005 (UTC)

True, but the Riemann tensor is defined to be a 1 up 3 down tensor (remember the idea of taking a vector and parallel transporting it around the manifold in two different ways). Strictly speaking, any raising or lowering of indices changes the Riemann tensor (this is a technicality that many people overlook). To take a simple example, consider a metric tensor (defined as a rank 2 covariant tensor) for a specific spacetime (say exterior Schwarzschild) and write it's components as ${\displaystyle g_{ab}}$ ; now contract this with ${\displaystyle g^{bc}}$  to get ${\displaystyle \delta _{a}{}^{c}}$  - nobody would claim that this (${\displaystyle \delta _{a}{}^{c}}$ ) still represents the Schwarzschild metric ! Similarly, taking a Riemann tensor (defined to be 1 up 3 down) with components ${\displaystyle R^{a}{}_{bcd}}$ , any tensor contraction of this changes the Riemann tensor to something else - the notation we use is still '${\displaystyle R}$ ' but the fact that the indices change position after contraction - which in general means multiplying the Riemann tensor components with non-constant functions of the coordinates - means it is not the same tensor (just like ${\displaystyle \delta _{a}{}^{c}}$  is not the same as the Schwarzschild metric) ! In desperation, one may define a new type of symmetry vector field satisfying ${\displaystyle {\mathcal {L}}_{X}R_{abcd}=0}$ , but this would be different from the cc definition (different tensor). Hope this clears the ambiguity. --Mpatel 6 July 2005 16:56 (UTC)