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- Katz–Lang_finiteness_theorem abstract "In number theory, the Katz–Lang finiteness theorem, proved by Katz and Lang (1981), states that if X is a smooth geometrically connected scheme of finite type over a field K that is finitely generated over the prime field, and Ker(X/K) is the kernel of the maps between their abelianized fundamental groups, then Ker(X/K) is finite if K has characteristic 0, and the part of the kernel coprime to p is finite if K has characteristic p > 0.".
- Katz–Lang_finiteness_theorem wikiPageID "37661448".
- Katz–Lang_finiteness_theorem wikiPageRevisionID "569647641".
- Katz–Lang_finiteness_theorem author1Link "Nicholas Katz".
- Katz–Lang_finiteness_theorem author2Link "Serge Lang".
- Katz–Lang_finiteness_theorem last "Katz".
- Katz–Lang_finiteness_theorem last "Lang".
- Katz–Lang_finiteness_theorem year "1981".
- Katz–Lang_finiteness_theorem subject Category:Number_theory.
- Katz–Lang_finiteness_theorem subject Category:Theorems_in_number_theory.
- Katz–Lang_finiteness_theorem comment "In number theory, the Katz–Lang finiteness theorem, proved by Katz and Lang (1981), states that if X is a smooth geometrically connected scheme of finite type over a field K that is finitely generated over the prime field, and Ker(X/K) is the kernel of the maps between their abelianized fundamental groups, then Ker(X/K) is finite if K has characteristic 0, and the part of the kernel coprime to p is finite if K has characteristic p > 0.".
- Katz–Lang_finiteness_theorem label "Katz–Lang finiteness theorem".
- Katz–Lang_finiteness_theorem sameAs Katz%E2%80%93Lang_finiteness_theorem.
- Katz–Lang_finiteness_theorem sameAs Q6378596.
- Katz–Lang_finiteness_theorem sameAs Q6378596.
- Katz–Lang_finiteness_theorem wasDerivedFrom Katz–Lang_finiteness_theorem?oldid=569647641.