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- Killing–Hopf_theorem abstract "In geometry, the Killing–Hopf theorem states that complete connected Riemannian manifolds of constant curvature are isometric to a quotient of a sphere, Euclidean space, or hyperbolic space by a group acting freely and properly discontinuously. These manifolds are called space forms. The Killing–Hopf theorem was proved by Killing (1891) and Hopf (1926).".
- Killing–Hopf_theorem wikiPageID "37711150".
- Killing–Hopf_theorem wikiPageRevisionID "569652922".
- Killing–Hopf_theorem subject Category:Riemannian_geometry.
- Killing–Hopf_theorem subject Category:Theorems_in_Riemannian_geometry.
- Killing–Hopf_theorem comment "In geometry, the Killing–Hopf theorem states that complete connected Riemannian manifolds of constant curvature are isometric to a quotient of a sphere, Euclidean space, or hyperbolic space by a group acting freely and properly discontinuously. These manifolds are called space forms. The Killing–Hopf theorem was proved by Killing (1891) and Hopf (1926).".
- Killing–Hopf_theorem label "Killing–Hopf theorem".
- Killing–Hopf_theorem sameAs Killing%E2%80%93Hopf_theorem.
- Killing–Hopf_theorem sameAs Q6407842.
- Killing–Hopf_theorem sameAs Q6407842.
- Killing–Hopf_theorem wasDerivedFrom Killing–Hopf_theorem?oldid=569652922.