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- Lubin–Tate_formal_group_law abstract "In mathematics, the Lubin–Tate formal group law is a formal group law introduced by Lubin and Tate (1965) to isolate the local field part of the classical theory of complex multiplication of elliptic functions. It does this by considering the (formal) endomorphisms of the formal group, emulating the way in which elliptic curves with extra endomorphisms are used to give abelian extensions of global fields".
- Lubin–Tate_formal_group_law wikiPageID "31457610".
- Lubin–Tate_formal_group_law wikiPageRevisionID "594917982".
- Lubin–Tate_formal_group_law author1Link "Jonathan Lubin".
- Lubin–Tate_formal_group_law author2Link "John Tate".
- Lubin–Tate_formal_group_law last "Lubin".
- Lubin–Tate_formal_group_law last "Tate".
- Lubin–Tate_formal_group_law year "1965".
- Lubin–Tate_formal_group_law subject Category:Algebraic_number_theory.
- Lubin–Tate_formal_group_law comment "In mathematics, the Lubin–Tate formal group law is a formal group law introduced by Lubin and Tate (1965) to isolate the local field part of the classical theory of complex multiplication of elliptic functions. It does this by considering the (formal) endomorphisms of the formal group, emulating the way in which elliptic curves with extra endomorphisms are used to give abelian extensions of global fields".
- Lubin–Tate_formal_group_law label "Lubin–Tate formal group law".
- Lubin–Tate_formal_group_law sameAs Lubin%E2%80%93Tate_formal_group_law.
- Lubin–Tate_formal_group_law sameAs Q6695334.
- Lubin–Tate_formal_group_law sameAs Q6695334.
- Lubin–Tate_formal_group_law wasDerivedFrom Lubin–Tate_formal_group_law?oldid=594917982.