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- Enriques_surface abstract "In mathematics, Enriques surfaces are algebraic surfacessuch that the irregularity q = 0 and the canonical line bundle K is non-trivial but has trivial square. Enriques surfaces are all projective (and therefore Kähler over the complex numbers) and are elliptic surfaces of genus 0.Over fields of characteristic not 2 they are quotients of K3 surfaces by a group of order 2 acting without fixed points and their theory is similar to that of algebraic K3 surfaces. Enriques surfaces were first studied in detail by Enriques (1896), though some of the Reye congruences introduced earlier by Reye (1882) are also examples of Enriques surfaces.Enriques surfaces can also be defined over other fields.Over fields of characteristic other than 2, Artin (1960) showed that the theory is similar to that over the complex numbers. Over fields of characteristic 2 the definition is modified, and there are two new families, called singular and supersingular Enriques surfaces, described by Bombieri & Mumford (1976).".
- Enriques_surface wikiPageExternalLink enriques.shtml.
- Enriques_surface wikiPageExternalLink diegeometrieder01reyegoog.
- Enriques_surface wikiPageExternalLink enriques.le-superficie-algebriche.1949.300dpi.djvu.
- Enriques_surface wikiPageID "3094760".
- Enriques_surface wikiPageRevisionID "599473889".
- Enriques_surface hasPhotoCollection Enriques_surface.
- Enriques_surface subject Category:Algebraic_surfaces.
- Enriques_surface subject Category:Birational_geometry.
- Enriques_surface subject Category:Complex_surfaces.
- Enriques_surface type AlgebraicSurfaces.
- Enriques_surface type Artifact100021939.
- Enriques_surface type ComplexSurfaces.
- Enriques_surface type Object100002684.
- Enriques_surface type PhysicalEntity100001930.
- Enriques_surface type Surface104362025.
- Enriques_surface type Whole100003553.
- Enriques_surface comment "In mathematics, Enriques surfaces are algebraic surfacessuch that the irregularity q = 0 and the canonical line bundle K is non-trivial but has trivial square. Enriques surfaces are all projective (and therefore Kähler over the complex numbers) and are elliptic surfaces of genus 0.Over fields of characteristic not 2 they are quotients of K3 surfaces by a group of order 2 acting without fixed points and their theory is similar to that of algebraic K3 surfaces.".
- Enriques_surface label "Enriques surface".
- Enriques_surface sameAs エンリケス曲面.
- Enriques_surface sameAs m.08r1n5.
- Enriques_surface sameAs Q5379864.
- Enriques_surface sameAs Q5379864.
- Enriques_surface sameAs Enriques_surface.
- Enriques_surface wasDerivedFrom Enriques_surface?oldid=599473889.
- Enriques_surface isPrimaryTopicOf Enriques_surface.