Global universe structure

Global structure covers the geometryand the topology of the whole universe—both the observable universe and beyond. While the local geometry does not determine the global geometry completely, it does limit the possibilities, particularly a geometry of a constant curvature. The universe is often taken to be a geodesic manifold, free of topological defects; relaxing either of these complicates the analysis considerably. A global geometry is a local geometry plus a topology. It follows that a topology alone does not give a global geometry: for instance, Euclidean 3-space and hyperbolic 3-space have the same topology but different global geometries.

As stated in the introduction, investigations within the study of the global structure of the universe include:

Whether the universe is infinite or finite in extentWhether the geometry of the global universe is flat, positively curved, or negatively curvedWhether the topology is simply connected like a sphere or multiply connected, like a torus

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