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https://doi.org/10.1007/s10455-011-9289-6
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Cite Publication Date: Aug 13, 2011 | |
 Citations: 2 |
Affiliation: Duke University
We derive an obstruction to the existence of cuspidal Einstein metrics on finite-volume complex surfaces. This generalizes a theorem of LeBrun for compact complex surfaces. As in the compact case, such a result relies on a scalar curvature estimate. Finally, the obstruction is made explicit on some examples.
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