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- Artin–Zorn_theorem abstract "In mathematics, the Artin–Zorn theorem, named after Emil Artin and Max Zorn, states that any finite alternative division ring is necessarily a finite field. It was first published by Zorn, but in his publication Zorn credited it to Artin. The Artin–Zorn theorem is a generalization of the Wedderburn theorem, which states that finite associative division rings are fields. As a geometric consequence, every finite Moufang plane is the classical projective plane over a finite field.".
- Artin–Zorn_theorem wikiPageID "14818089".
- Artin–Zorn_theorem wikiPageRevisionID "551323558".
- Artin–Zorn_theorem subject Category:Ring_theory.
- Artin–Zorn_theorem subject Category:Theorems_in_abstract_algebra.
- Artin–Zorn_theorem comment "In mathematics, the Artin–Zorn theorem, named after Emil Artin and Max Zorn, states that any finite alternative division ring is necessarily a finite field. It was first published by Zorn, but in his publication Zorn credited it to Artin. The Artin–Zorn theorem is a generalization of the Wedderburn theorem, which states that finite associative division rings are fields. As a geometric consequence, every finite Moufang plane is the classical projective plane over a finite field.".
- Artin–Zorn_theorem label "Artin–Zorn theorem".
- Artin–Zorn_theorem label "Stelling van Artin-Zorn".
- Artin–Zorn_theorem sameAs Artin%E2%80%93Zorn_theorem.
- Artin–Zorn_theorem sameAs Stelling_van_Artin-Zorn.
- Artin–Zorn_theorem sameAs Q2558669.
- Artin–Zorn_theorem sameAs Q2558669.
- Artin–Zorn_theorem wasDerivedFrom Artin–Zorn_theorem?oldid=551323558.