Deformations of Margulis space-times with parabolics

Abstract

Let E be a flat Lorentzian space of signature (2, 1). A Margulis space-time is a noncompact complete Lorentz flat 3-manifold E/ with a free isometry group of rank g ≥ 2. We consider the case when contains a parabolic element. We show that sufficiently small deformations of still act properly on E. We use our previous work showing that E/ can be compactified relative to a union of solid tori and some old idea of Carri\`ere in his famous work. We will show that the there is also a decomposition of E/ by crooked planes that are disjoint and embedded in a generalized sense. These can be perturbed so that E/ decomposes into cells. This partially affirms the conjecture of Charette-Drumm-Goldman.

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