On the Geometry of Flat Pseudo-Riemannian Homogeneous Spaces

Abstract

Let M be complete flat pseudo-Riemannian homogeneous manifold and ⊂(ns) its fundamental group. We show that M is a trivial fiber bundle G/ Mn-k, where G is the Zariski closure of in (ns). Moreover, we show that the G-orbits in ns are affinely diffeomorphic to G endowed with the (0)-connection. If the induced metric on the G-orbits is non-degenerate, then G (and hence ) has linear abelian holonomy. If additionally G is not abelian, then G contains a certain subgroup of dimension 6. In particular, for non-abelian G orbits with non-degenerate metric can appear only if G≥ 6.