Families of Geodesic Orbit Spaces and Related Pseudo-Riemannian Manifolds

Abstract

Two homogeneous pseudo-riemannian manifolds (G/H, ds2) and (G'/H', ds'2) belong to the same real form family if their complexifications (G C/H C, ds C2) and (G' C/H' C, ds'2 C) are isometric. The point is that in many cases a particular space (G/H, ds2) has interesting properties, and those properties hold for the spaces in its real form family. Here we prove that if (G/H, ds2) is a geodesic orbit space with a reductive decomposition g = h + m, then the same holds all the members of its real form family. In particular our understanding of compact geodesic orbit riemannian manifolds gives information on geodesic orbit pseudo-riemannian manifolds. We also prove similar results for naturally reductive spaces, for commutative spaces, and in most cases for weakly symmetric spaces. We end with a discussion of inclusions of these real form families, a discussion of D'Atri spaces, and a number of open problems.

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