The property of being a D'Atri space (i.e., a Riemannian manifold with volume-preserving symmetries) is equivalent, in the real analytic case, to the infinite numebr of curvature identities called the odd Ledger conditions. In particular, a Riemannian manifold (M, g) satisfying the first odd Ledger condition L3 is said to be an L3-space.
This definition extends easily to the affine space. Here we investigate the torsion-free affine manifolds (M, /nabla) and their Riemann extensions (T*M, g/bar) as concerns heredity of of the condition L3.
We also incorporate a short survey of the previous results in this direction, including also the topic of D'Atri spaces.