Pseudo-Riemannian geodesic foliations by circles
Abstract
We investigate under which assumptions an orientable pseudo-Riemannian geodesic foliations by circles is generated by an S1-action. We construct examples showing that, contrary to the Riemannian case, it is not always true. However, we prove that such an action always exists when the foliation does not contain lightlike leaves, i.e. a pseudo-Riemannian Wadsley's Theorem. As an application, we show that every Lorentzian surface all of whose spacelike/timelike geodesics are closed, is finitely covered by S1× . It follows that every Lorentzian surface contains a non-closed geodesic.
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