Isolated singularities of conformal hyperbolic metrics
Abstract
J. Nitsche proved that an isolated singularity of a conformal hyperbolic metric is either a conical singularity or a cusp one. We prove by developing map that there exists a complex coordinate z centered at the singularity where the metric has the expression of either 4α2 z 2α-2(1- z 2α)2 d z 2 with α>0 or z -2(|z|)-2|dz|2.
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