Codazzi tensor: Difference between revisions

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Codazzi tensors (named after Delfino Codazzi) arise very naturally in the study of Riemannian manifolds with harmonic curvature or harmonic Weyl tensor. In fact, existence of Codazzi tensors impose strict conditions on the Curvature tensor of the manifold.

Definition

Let $(M,g)$ be a n-dimensional Riemannian manifold for $n\geq 3$ , let $T$ be a tensor, and let $\nabla$ be a Levi-Civita connection on the manifold. We say that the tensor $T$ is a Codazzi Tensor if $(\nabla _{X}T)g(Y,Z)=(\nabla _{Y}T)g(X,Z)$ .

References

Arthur Besse, Einstein Manifolds, Springer (1987).

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	'''Codazzi tensors''' arise very naturally in the study of [[Riemannian manifolds]] with [[harmonic]] [[curvature]] or harmonic [[Weyl tensor]]. In fact, existence of Codazzi tensors impose strict conditions on the [[Riemann curvature tensor\|Curvature tensor]] of the manifold.		'''Codazzi tensors''' (named after [[Delfino Codazzi]]) arise very naturally in the study of [[Riemannian manifolds]] with [[harmonic]] [[curvature]] or harmonic [[Weyl tensor]]. In fact, existence of Codazzi tensors impose strict conditions on the [[Riemann curvature tensor\|Curvature tensor]] of the manifold.

	==Definition==		==Definition==

Revision as of 22:55, 9 July 2015

Definition

See also

References