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- Q2067112 subject Q8234758.
- Q2067112 subject Q8405593.
- Q2067112 abstract "In mathematics, a del Pezzo surface or Fano surface is a two-dimensional Fano variety, in other words a non-singular projective algebraic surface with ample anticanonical divisor class. They are in some sense the opposite of surfaces of general type, which have ample canonical class.They are named for Pasquale del Pezzo who studied the surfaces with the more restrictive condition that they have a very ample anticanonical divisor class, or in his language the surfaces with a degree n embedding in n-dimensional projective space (del Pezzo 1887), which are the del Pezzo surfaces of degree at least 3.".
- Q2067112 wikiPageExternalLink lecturenotes.html.
- Q2067112 wikiPageExternalLink catalogue.asp?isbn=9780521832076.
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- Q2067112 wikiPageWikiLink Q5138925.
- Q2067112 wikiPageWikiLink Q7446320.
- Q2067112 wikiPageWikiLink Q8234758.
- Q2067112 wikiPageWikiLink Q8405593.
- Q2067112 wikiPageWikiLink Q844128.
- Q2067112 wikiPageWikiLink Q846881.
- Q2067112 wikiPageWikiLink Q912887.
- Q2067112 comment "In mathematics, a del Pezzo surface or Fano surface is a two-dimensional Fano variety, in other words a non-singular projective algebraic surface with ample anticanonical divisor class.".
- Q2067112 label "Del Pezzo surface".