On the Lie Foliation structure of Walker Manifolds

Abstract

We study Walker manifolds, that is, pseudo-Riemannian manifolds (Mn,g) admitting a null parallel distribution of rank r≤n2. We show that always integrates to a G-Lie foliation , where G is the simply connected Lie group with Lie algebra equal to the structure algebra of . The transverse holonomy group of (M,g) coincides with the image of the holonomy morphism h:π1(M) G. We prove that Ric(X,·)=0 for all X∈Γ(), and show that in dimension~3 the model group is always , while in dimension~4 with rank~2 the structure algebra is always abelian. A local classification distinguishes the abelian, nilpotent, and solvable cases, and a rigidity theorem shows that a minimal nilpotent Walker foliation of dimension~4 cannot be deformed into a non-nilpotent solvable one.