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Weil_pairing abstract "In mathematics, the Weil pairing is a pairing (bilinear form, though with multiplicative notation) on the points of order dividing n of an elliptic curve E, taking values in nth roots of unity. More generally there is a similar Weil pairing between points of order n of an abelian variety and its dual. It was introduced by André Weil (1940) for Jacobians of curves, who gave an abstract algebraic definition; the corresponding results for elliptic functions were known, and can be expressed simply by use of the Weierstrass sigma function.".
Weil_pairing wikiPageExternalLink pair-over-C.pdf.
Weil_pairing wikiPageID "1131644".
Weil_pairing wikiPageRevisionID "605689606".
Weil_pairing hasPhotoCollection Weil_pairing.
Weil_pairing subject Category:Abelian_varieties.
Weil_pairing subject Category:Elliptic_curves.
Weil_pairing subject Category:Pairing-based_cryptography.
Weil_pairing type AbelianVarieties.
Weil_pairing type Abstraction100002137.
Weil_pairing type Assortment108398773.
Weil_pairing type Attribute100024264.
Weil_pairing type Collection107951464.
Weil_pairing type Curve113867641.
Weil_pairing type EllipticCurves.
Weil_pairing type Group100031264.
Weil_pairing type Line113863771.
Weil_pairing type Shape100027807.
Weil_pairing comment "In mathematics, the Weil pairing is a pairing (bilinear form, though with multiplicative notation) on the points of order dividing n of an elliptic curve E, taking values in nth roots of unity. More generally there is a similar Weil pairing between points of order n of an abelian variety and its dual.".
Weil_pairing label "Weil pairing".
Weil_pairing label "韦伊配对".
Weil_pairing sameAs m.048_j4.
Weil_pairing sameAs Q7980191.
Weil_pairing sameAs Q7980191.
Weil_pairing sameAs Weil_pairing.
Weil_pairing wasDerivedFrom Weil_pairing?oldid=605689606.
Weil_pairing isPrimaryTopicOf Weil_pairing.