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 whose Ricci tensor satisfies for any unit timelike vector field , any positive constant , and any smooth function that never takes the values . (Observe that this reduces to the positive Einstein case when .) We show that there is no such obstruction if is negative. Finally, the "borderline" case is also examined: we show that if and , then must be isometric to with a Riemannian manifold.
Cite
@article{arxiv.2005.09508,
title = {On the Einstein condition for Lorentzian 3-manifolds},
author = {Amir Babak Aazami},
journal= {arXiv preprint arXiv:2005.09508},
year = {2021}
}
Comments
v4: this is a reposting of v2; the previous version (v3) contained an error in the proof of Proposition 2