The Cosmological Time Function
Abstract
Let (M,g) be a time oriented Lorentzian manifold and d the Lorentzian distance on M. The function τ(q):=p< q d(p,q) is the cosmological time function of M, where as usual p< q means that p is in the causal past of q. This function is called regular iff τ(q) < ∞ for all q and also τ 0 along every past inextendible causal curve. If the cosmological time function τ of a space time (M,g) is regular it has several pleasant consequences: (1) It forces (M,g) to be globally hyperbolic, (2) every point of (M,g) can be connected to the initial singularity by a rest curve (i.e., a timelike geodesic ray that maximizes the distance to the singularity), (3) the function τ is a time function in the usual sense, in particular (4) τ is continuous, in fact locally Lipschitz and the second derivatives of τ exist almost everywhere.
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