Simply connected indefinite homogeneous spaces of finite volume

Abstract

Let M be a simply connected pseudo-Riemannian homogeneous space of finite volume with isometry group G. We show that M is compact and that the solvable radical of G is abelian and the Levi factor is a compact semisimple Lie group acting transitively on M. For metric index less than three, we find that the isometry group of M is compact itself. Examples demonstrate that G is not necessarily compact for higher indices. To prepare these results, we study Lie algebras with abelian solvable radical and a nil-invariant symmetric bilinear form. For these, we derive an orthogonal decomposition into three distinct types of metric Lie algebras.