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Belyi's_theorem abstract "In mathematics, Belyi's theorem on algebraic curves states that any non-singular algebraic curve C, defined by algebraic number coefficients, represents a compact Riemann surface which is a ramified covering of the Riemann sphere, ramified at three points only.This is a result of G. V. Belyi from 1979. At the time it was considered surprising, and it spurred Grothendieck to develop his theory of dessins d'enfant, which describes nonsingular algebraic curves over the algebraic numbers using combinatorial data.".
Belyi's_theorem wikiPageID "3144280".
Belyi's_theorem wikiPageRevisionID "577400385".
Belyi's_theorem hasPhotoCollection Belyi's_theorem.
Belyi's_theorem subject Category:Algebraic_curves.
Belyi's_theorem subject Category:Theorems_in_algebraic_geometry.
Belyi's_theorem type Abstraction100002137.
Belyi's_theorem type AlgebraicCurves.
Belyi's_theorem type Attribute100024264.
Belyi's_theorem type Communication100033020.
Belyi's_theorem type Curve113867641.
Belyi's_theorem type Line113863771.
Belyi's_theorem type Message106598915.
Belyi's_theorem type Proposition106750804.
Belyi's_theorem type Shape100027807.
Belyi's_theorem type Statement106722453.
Belyi's_theorem type Theorem106752293.
Belyi's_theorem type TheoremsInAlgebraicGeometry.
Belyi's_theorem comment "In mathematics, Belyi's theorem on algebraic curves states that any non-singular algebraic curve C, defined by algebraic number coefficients, represents a compact Riemann surface which is a ramified covering of the Riemann sphere, ramified at three points only.This is a result of G. V. Belyi from 1979.".
Belyi's_theorem label "Belyi's theorem".
Belyi's_theorem sameAs m.08v8d1.
Belyi's_theorem sameAs Q4884950.
Belyi's_theorem sameAs Q4884950.
Belyi's_theorem sameAs Belyi's_theorem.
Belyi's_theorem wasDerivedFrom Belyi's_theorem?oldid=577400385.
Belyi's_theorem isPrimaryTopicOf Belyi's_theorem.