T. Asselmeyer-Maluga, R. Mader, J. Krol
Usually, the topology of a 4-manifolds $M$ is restricted to admit a global
hyperbolic structure $\Sigma\times\mathbb{R}$. The result was obtained by using
two conditions: existence of a Lorentz structure and causality (no time-like
closed curves). In this paper we study the influence of the smoothness
structure to show its independence of the two conditions. Then we obtain the
possibility for a topology-change of the 3-manifold $\Sigma$ keeping fix its
homology. We will study the example $S^{3}\times\mathbb{R}$ with an exotic
differential structure more carefully to show some implications for cosmology.
Especially we obtain an interpretation of the transition in topology as dark
energy.
View original:
http://arxiv.org/abs/1110.6768
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