Myers Theorem

Myers theorem is a classical theorem in Riemannian geometry. It states that if Ricci curvature of a complete Riemannian manifold is bounded below by \left(n-1\right)k > 0 \,\!, then its diameter is at most \pi/\sqrt{k}, in particular any such manifold is compact and it has finite fundamental group. Moreover, if the diameter is equal to \pi/\sqrt{k}, then the manifold is isometric to a sphere of a constant sectional curvature k.

 

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