Towards a classification of Lorentzian holonomy groups. Part II: Semisimple, non-simple weak-Berger algebras
Abstract
The holonomy group of an (n+2)-dimensional simply-connected, indecomposable but non-irreducible Lorentzian manifold (M,h) is contained in the parabolic group (R × SO(n)) Rn. The main ingredient of such a holonomy group is the SO(n)--projection G:=prSO(n)(Holp(M,h)) and one may ask whether it has to be a Riemannian holonomy group. In this paper we show that this is always the case, completing our results of the first part math.DG/0305139. We draw consequences for the existence of parallel spinors on Lorentzian manifolds.
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