Riemannian counterparts to Lorentzian space forms

Abstract

On a smooth n-manifold M with n ≥ 3, we study pairs (g,T) consisting of a Riemannian metric g and a unit length closed vector field T. Motivated by how Ricci solitons generalize Einstein metrics via a distinguished vector field, we propose to generalize space forms by considering those pairs (g,T) whose corresponding Lorentzian metric g L = g - 2T T has constant curvature. We show by examples that such pairs exist when M is noncompact, and that complete metrics exist among them. When M is compact, however, the situation is more rigid. In the compact setting, we prove that the only pairs (g,T) whose corresponding Lorentzian metric g L is a space form are those where (M,g) is flat and its universal covering splits isometrically as a product R × N. The nonexistence of compact Lorentzian spherical space forms plays a key role in our proof.