Classification of closed conformally flat Lorentzian manifolds with unipotent holonomy
Abstract
We classify closed, conformally flat Lorentzian manifolds of dimension n ≥ 3 with unipotent holonomy in PO(2,n). They are all Kleinian and fall into four different geometric types according to the intersection of the image of the developing map with a holonomy-invariant isotropic flag. They are homeomorphic to Sn-1 × S1 or a nilmanifold of degree at most three, up to a finite cover. We classify those admitting an essential conformal flow; these fall into two geometric types, both homeomorphic to Sn-1 × S1 up to finite cover.
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