On the isometry group and the geometric structure of compact stationary Lorentzian manifolds
arXiv:1002.0814
Abstract
We study the geometry of compact Lorentzian manifolds that admit a somewhere timelike Killing vector field, and whose isometry group has infinitely many connected components. Up to a finite cover, such manifolds are products (or amalgamated products) of a flat Lorentzian torus and a compact Riemannian (resp., lightlike) manifold.
27 pages