Curvature collineation

A curvature collineation (often abbreviated to CC) is vector field which preserves the Riemann tensor in the sense that,


 * $$\mathcal{L}_X R^a{}_{bcd}=0$$

where $$R^a{}_{bcd}$$ are the components of the Riemann tensor. The set of all smooth curvature collineations forms a Lie algebra under the Lie bracket operation (if the smoothness condition is dropped, the set of all curvature collineations need not form a Lie algebra). The Lie algebra is denoted by $$CC(M)$$ and may be infinite-dimensional. Every affine vector field is a curvature collineation.