{{one source |date=May 2024}} In mathematics, an '''Enoki surface''' is compact complex surface with positive second Betti number that has a global spherical shell and a non-trivial divisor ''D'' with ''H''<sup>0</sup>(O(''D''))&nbsp;≠&nbsp;0 and (''D'',&nbsp;''D'')&nbsp;=&nbsp;0. {{harvtxt|Enoki|1980}} constructed some examples. They are surfaces of class VII, so are non-Kähler and have Kodaira dimension &minus;∞.

==References== *{{Citation | doi=10.3792/pjaa.56.275 | last1=Enoki | first1=Ichiro | title=On surfaces of class VII<sub>0</sub> with curves | mr=581470 | year=1980 | journal=Japan Academy. Proceedings. Series A. Mathematical Sciences | issn=0386-2194 | volume=56 | issue=6 | pages=275–279| doi-access=free }}

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Category:Complex surfaces

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