Rigidity of surfaces with no conjugate points (Q756714)
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scientific article; zbMATH DE number 4192560
| Language | Label | Description | Also known as |
|---|---|---|---|
| English | Rigidity of surfaces with no conjugate points |
scientific article; zbMATH DE number 4192560 |
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Rigidity of surfaces with no conjugate points (English)
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1991
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E. Hopf proved that any complete Riemannian metric with no conjugate points on the torus \(T^ 2\) is flat. Our paper extends Hopf's argument to obtain sufficient conditions for metrics with no conjugate points on a cylinder or the plane to be flat. We show that a cylinder with no conjugate points, curvature bounded from below whose ends do not open out, must be flat. In the case of the plane, we show that a metric with no conjugate points and curvature bounded from below that satisfies a version of Euclid's parallel axiom must be flat.
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rigidity
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Riccati equation
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no conjugate points
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cylinder
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plane
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parallel axiom
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0.9306407
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0.9228015
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0.92147976
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0.9157529
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0.9124307
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