Reducible Riemannian space

A Riemannian space $ M $ whose linear (or, in other words, homogeneous) holonomy group is reducible, i.e. has non-trivial invariant subspaces. A Riemannian space with an irreducible holonomy group is called irreducible. A complete simply-connected reducible Riemannian space is decomposable (de Rham's decomposition theorem), i.e. splits into a direct product of Riemannian spaces of positive dimension. Moreover, any complete simply-connected Riemannian space is isometric to the direct product $ M _ {0} \times M _ {1} \times \dots \times M _ {k} $ of a Euclidean space $ M _ {0} $ and complete simply-connected irreducible Riemannian spaces $ M _ {i} $, $ i > 0 $; this decomposition is unique up to a rearrangement of factors.

A weak version of this theorem holds for pseudo-Riemannian spaces: A pseudo-Riemannian space is called weakly irreducible if all non-trivial subspaces of the tangent space that are invariant with respect to the holonomy group $ \Gamma $ are isotropic, i.e. the scalar product induced on them is degenerate. Any complete simply-connected pseudo-Riemannian space splits into a direct product of weakly irreducible pseudo-Riemannian spaces. If the subspace of vectors that are fixed under the holonomy group is non-isotropic, this decomposition is unique up to a rearrangement of factors. A weakly irreducible pseudo-Riemannian space does not split necessarily into a direct product of pseudo-Riemannian spaces [3].

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Comments

For de Rham's paper see [a1].

References