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- Honda–Tate_theorem abstract "In mathematics, the Honda–Tate theorem classifies abelian varieties over finite fields up to isogeny. It states that the isogeny classes of simple abelian varieties over a finite field of order q correspond to algebraic integers all of whose conjugates (given by eigenvalues of the Frobenius endomorphism on the first cohomology group or Tate module) have absolute value √q.Tate (1966) showed that the map taking an isogeny class to the eigenvalues of the Frobenius is injective, and Taira Honda (1968) showed that this map is surjective, and therefore a bijection.".
- Honda–Tate_theorem wikiPageID "32458611".
- Honda–Tate_theorem wikiPageRevisionID "569593638".
- Honda–Tate_theorem authorlink "Taira Honda".
- Honda–Tate_theorem first "Taira".
- Honda–Tate_theorem last "Honda".
- Honda–Tate_theorem year "1968".
- Honda–Tate_theorem subject Category:Theorems_in_algebraic_geometry.
- Honda–Tate_theorem comment "In mathematics, the Honda–Tate theorem classifies abelian varieties over finite fields up to isogeny.".
- Honda–Tate_theorem label "Honda–Tate theorem".
- Honda–Tate_theorem sameAs Honda%E2%80%93Tate_theorem.
- Honda–Tate_theorem sameAs Q5892839.
- Honda–Tate_theorem sameAs Q5892839.
- Honda–Tate_theorem wasDerivedFrom Honda–Tate_theorem?oldid=569593638.