On the space of null geodesics of a spacetime: the compact case, Engel geometry and retrievability

Abstract

We compute the contact manifold of null geodesics of the family of spacetimes \(S2×S1, g-d2c2dt2)\d,c∈N+ coprime, with g the round metric on S2 and t the S1-coordinate. We find that these are the lens spaces L(2c,1) together with the pushforward of the canonical contact structure on STS2 L(2,1) under the natural projection L(2,1) L(2c,1). We extend this computation to Z× S1 for Z a Zoll manifold. On the other hand, motivated by these examples, we show how Engel geometry can be used to describe the manifold of null geodesics of a certain class of three-dimensional spacetimes, by considering the Cartan deprolongation of their Lorentz prolongation. We characterize the three-dimensional contact manifolds that are contactomorphic to the space of null geodesics of a spacetime. The characterization consists in the existence of an overlying Engel manifold with a certain foliation and, in this case, we also retrieve the spacetime.

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