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Modular_elliptic_curve abstract "A modular elliptic curve is an elliptic curve E that admits a parametrisation X0(N) → E by a modular curve. This is not the same as a modular curve that happens to be an elliptic curve, and which could be called an elliptic modular curve. The modularity theorem, also known as the Taniyama–Shimura conjecture, asserts that every elliptic curve defined over the rational numbers is modular.".
Modular_elliptic_curve wikiPageID "4559850".
Modular_elliptic_curve wikiPageRevisionID "603887273".
Modular_elliptic_curve hasPhotoCollection Modular_elliptic_curve.
Modular_elliptic_curve subject Category:Elliptic_curves.
Modular_elliptic_curve type Abstraction100002137.
Modular_elliptic_curve type Attribute100024264.
Modular_elliptic_curve type Curve113867641.
Modular_elliptic_curve type EllipticCurves.
Modular_elliptic_curve type Line113863771.
Modular_elliptic_curve type Shape100027807.
Modular_elliptic_curve comment "A modular elliptic curve is an elliptic curve E that admits a parametrisation X0(N) → E by a modular curve. This is not the same as a modular curve that happens to be an elliptic curve, and which could be called an elliptic modular curve. The modularity theorem, also known as the Taniyama–Shimura conjecture, asserts that every elliptic curve defined over the rational numbers is modular.".
Modular_elliptic_curve label "Modulaire elliptische kromme".
Modular_elliptic_curve label "Modular elliptic curve".
Modular_elliptic_curve sameAs Modulaire_elliptische_kromme.
Modular_elliptic_curve sameAs m.07kcngj.
Modular_elliptic_curve sameAs Q2728886.
Modular_elliptic_curve sameAs Q2728886.
Modular_elliptic_curve sameAs Modular_elliptic_curve.
Modular_elliptic_curve wasDerivedFrom Modular_elliptic_curve?oldid=603887273.
Modular_elliptic_curve isPrimaryTopicOf Modular_elliptic_curve.