Cotton tensor Guide, Meaning , Facts, Information and Description
In differential geometry, the Cotton tensor on a (pseudo)-Riemannian manifold of dimension n is third-order tensor density concomitant of the metric. Like the Weyl tensor. Just as the vanishing of the Weyl tensor for n ≥ 4 is a necessary and sufficient condition for the manifold to be conformally flat, the same is true for the Cotton tensor for n=3, while for ''n <3 it is identically zero.In coordinates, and denoting the Ricci tensor by Rij and the scalar curvature by R the components of the Cotton tensor are
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The proof of classical result that for n=3 the vanishing of the Cotton tensor is equivalent the metric being conformally flat is given by Eisenhart using a standard integrability argument. This tensor density is uniquely characterized by its conformal properties coupled with the demand that it be differentiable for arbitrary metrics, as shown by Aldersley.