Legendrian links, causality, and the Low conjecture

Abstract

Let (Xm+1, g) be a globally hyperbolic spacetime with Cauchy surface diffeomorphic to an open subset of Rm. The Legendrian Low conjecture formulated by Nat\'ario and Tod says that two events x,y∈ are causally related if and only if the Legendrian link of spheres Sx, Sy whose points are light geodesics passing through x and y is non-trivial in the contact manifold of all light geodesics in X. The Low conjecture says that for m=2 the events x,y are causally related if and only if Sx, Sy is non-trivial as a topological link. We prove the Low and the Legendrian Low conjectures. We also show that similar statements hold for any globally hyperbolic (Xm+1, g) such that a cover of its Cauchy surface is diffeomorphic to an open domain in Rm.