Cartan-Hadamard theorem: Difference between revisions
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Any [[negatively curved manifold]], viz any manifold which has negative sectional curvature everywhere, has the property that its universal cover is diffeomorphic to real Euclidean space. | Any [[negatively curved manifold]], viz any manifold which has negative sectional curvature everywhere, has the property that its universal cover is diffeomorphic to real Euclidean space. | ||
==Relation with other results== | |||
===Bonnet-Myers theorem=== | |||
{{further|[[Bonnet-Myers theorem]]}} | |||
The Bonnet-Myers theorem states that the universal cover of a manifold with Ricci curvature bounded below by a positive number, is compact. | |||
Revision as of 10:52, 23 June 2007
This article describes a result related to the sectional curvature of a Riemannian manifold
This result relates information on curvature to information on topology of a manifold
This article makes a prediction about the universal cover of a manifold based on given data at the level of a:Riemannian manifold
This result is valid in all dimensions
Statement
Any negatively curved manifold, viz any manifold which has negative sectional curvature everywhere, has the property that its universal cover is diffeomorphic to real Euclidean space.
Relation with other results
Bonnet-Myers theorem
Further information: Bonnet-Myers theorem
The Bonnet-Myers theorem states that the universal cover of a manifold with Ricci curvature bounded below by a positive number, is compact.