Differential geometry MOC

Ricci curvature

Let 𝑀 be a 𝐢𝛼-manifold equipped with an affine connexion βˆ‡ giving Riemannian curvature π‘…π‘π‘‘π‘Žπ‘. The Ricci curvature π‘…π‘Žπ‘ ∈T02(𝑀) is the tensor field given by the trace

π‘…π‘Žπ‘:=π‘…π‘π‘Žπ‘π‘.

A manifold with null Ricci curvature is said to be Ricci flat.

Properties

See also the properties of the Levi-Civita connexion.

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