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- Faltings'_product_theorem abstract "In arithmetic geometry, the Faltings product theorem gives sufficient conditions for a subvariety of a product of projective spaces to be a product of varieties in the projective spaces. It was introduced by Faltings (1991) in his proof of Lang's conjecture that subvarieties of an abelian variety containing no translates of non-trivial abelian subvarieties have only finitely many rational points. Evertse (1995) and Ferretti (1996) gave explicit versions of the Falting product theorem.".
- Faltings'_product_theorem wikiPageExternalLink form.1996.8.401.
- Faltings'_product_theorem wikiPageExternalLink 2944319.
- Faltings'_product_theorem wikiPageExternalLink aa7332.pdf.
- Faltings'_product_theorem wikiPageID "37657137".
- Faltings'_product_theorem wikiPageRevisionID "534189644".
- Faltings'_product_theorem hasPhotoCollection Faltings'_product_theorem.
- Faltings'_product_theorem subject Category:Diophantine_approximation.
- Faltings'_product_theorem comment "In arithmetic geometry, the Faltings product theorem gives sufficient conditions for a subvariety of a product of projective spaces to be a product of varieties in the projective spaces. It was introduced by Faltings (1991) in his proof of Lang's conjecture that subvarieties of an abelian variety containing no translates of non-trivial abelian subvarieties have only finitely many rational points. Evertse (1995) and Ferretti (1996) gave explicit versions of the Falting product theorem.".
- Faltings'_product_theorem label "Faltings' product theorem".
- Faltings'_product_theorem sameAs m.0ndjbff.
- Faltings'_product_theorem sameAs Q5432814.
- Faltings'_product_theorem sameAs Q5432814.
- Faltings'_product_theorem wasDerivedFrom Faltings'_product_theorem?oldid=534189644.
- Faltings'_product_theorem isPrimaryTopicOf Faltings'_product_theorem.