Explicit construction of extremal Hermitian metrics with finite conical singularities on \(S^2\) (Q1607502)
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scientific article; zbMATH DE number 1775022
| Language | Label | Description | Also known as |
|---|---|---|---|
| English | Explicit construction of extremal Hermitian metrics with finite conical singularities on \(S^2\) |
scientific article; zbMATH DE number 1775022 |
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Explicit construction of extremal Hermitian metrics with finite conical singularities on \(S^2\) (English)
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12 October 2003
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The authors construct a class of nonradial extremal Hermitian metrics with finite conical singular angles \(2\pi n_i\), \(n_i\) integer, on the sphere. They use ODE methods and the geometry of Gaussian curvature of so-called HCMU metrics, which are the simplest cases of Calabi's extremal metrics in singular spaces. Moreover, the considered HCMU metrics on \(S^2\) are classified: explicit formulae are given via rational holomorphic functions on \(\mathbb{C}\).
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extremal Hermitian metrics
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conical singularities
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0.92264354
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0.9043242
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0.88334906
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0.88176334
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0.8816111
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0.8795827
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0.8795527
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0.87885123
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