ON ONE-DIMENSIONAL AND SINGULAR CALABI'S EXTREMAL METRICS WHOSE GAUSS CURVATURES HAVE NONZERO UMBILICAL HESSIANS

Chen Qing; Wu Yingyi; Xu Bin

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ON ONE-DIMENSIONAL AND SINGULAR CALABI'S EXTREMAL METRICS WHOSE GAUSS CURVATURES HAVE NONZERO UMBILICAL HESSIANS

机译：一维和奇异卡拉比的极值度量，高斯曲线具有Nonzero脐带黑森州

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We consider, on compact Riemann surfaces, singular extremal metrics whose Gauss curvatures have nonzero umbilical Hessians, which are usually called HCMU metrics. The singular sets of these HCMU metrics consist of conical and cusp singularities, both of which are finitely many. We show that these metrics exist with the prescribed singularities if and only if so do certain meromorphic 1-forms on the Riemann surfaces, which only have simple poles with real residues and whose real parts are exact outside their poles.

机译：我们在紧致的黎曼曲面上考虑奇异极值度量，其高斯曲率具有非零脐带黑森州，通常称为HCMU度量。这些HCMU度量的奇异集包括圆锥奇异点和尖角奇异点，两者都是有限的。我们证明，当且仅当Riemann表面上的某些亚纯1型确实存在时，这些度量才具有规定的奇点，这些亚纯1型仅具有带有实际残差的简单极点，并且其实际部分恰好在其极点之外。

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《Israel Journal of Mathematics》 |2015年第null期|共28页
作者
Chen Qing; Wu Yingyi; Xu Bin;
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正文语种 eng
中图分类数学;
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机译：一维和奇异卡拉比的极值度量，高斯曲线具有Nonzero脐带黑森州
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ON ONE-DIMENSIONAL AND SINGULAR CALABI'S EXTREMAL METRICS WHOSE GAUSS CURVATURES HAVE NONZERO UMBILICAL HESSIANS

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