On the Einstein condition for Lorentzian 3-manifolds

Abstract

It is well known that in Lorentzian geometry there are no compact spherical space forms; in dimension 3, this means there are no closed Einstein 3-manifolds with positive Einstein constant. We generalize this fact here, by proving that there are also no closed Lorentzian 3-manifolds (M,g) whose Ricci tensor satisfies Ric = fg+(f-λ)T T, for any unit timelike vector field T, any positive constant λ, and any smooth function f that never takes the values 0,λ. (Observe that this reduces to the positive Einstein case when f = λ.) We show that there is no such obstruction if λ is negative. Finally, the "borderline" case λ = 0 is also examined: we show that if λ = 0 and f > 0, then (M,g) must be isometric to (S1\!× \!N,-dt2 h) with (N,h) a Riemannian manifold.