Homogeneous riemannian manifolds are complete. Trouble understanding proof.

Homogeneity implies that all metric balls of the same radius are isometric. Therefore if one can extend a geodesic at a point $p$ in each direction by a distance of $\delta$, then one can extend by the same $\delta$ at every point of the manifold.

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Riemannian Geometry

Differential Geometry

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