An Enlargeability Obstruction for Spacetimes with both Big Bang and Big Crunch

Abstract

Given a spacelike hypersurface M of a time-oriented Lorentzian manifold (M, g), the pair (g, k) consisting of the induced Riemannian metric g and the second fundamental form k is known as initial data set. In this article, we study the space of all initial data sets (g, k) on a fixed closed manifold M that are subject to a strict version of the dominant energy condition. Whereas the pairs of the form (g, τ g) and (g, -τ g), for a sufficiently large τ > 0, belong to the same path-component of this space when M admits a positive scalar curvature metric, it was observed in a previous work arXiv:1906.00099 that this is not the case when the existence of a positive scalar curvature metric on M is obstructed by α(M) ≠ 0. In the present article we extend this non-connectedness result to Gromov-Lawson's enlargeability obstruction, which covers many examples, also in dimension 3. In the context of relativity theory, this result may be interpreted as excluding the existence of certain globally hyperbolic spacetimes with both a big bang and a big crunch singularity