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- Chow's_lemma abstract "In algebraic geometry Chow's lemma, named after Wei-Liang Chow, roughly says that a proper morphism is fairly close to being a projective morphism. More precisely, a version of it states the following:If X is a scheme that is proper over a noetherian base S, then there exists a projective S-scheme X' and S-morphism that induces for some open dense subset U.Chow's lemma is one of the foundational results in algebraic geometry.".
- Chow's_lemma wikiPageID "11127518".
- Chow's_lemma wikiPageRevisionID "605171431".
- Chow's_lemma hasPhotoCollection Chow's_lemma.
- Chow's_lemma subject Category:Algebraic_geometry.
- Chow's_lemma subject Category:Chinese_mathematical_discoveries.
- Chow's_lemma comment "In algebraic geometry Chow's lemma, named after Wei-Liang Chow, roughly says that a proper morphism is fairly close to being a projective morphism. More precisely, a version of it states the following:If X is a scheme that is proper over a noetherian base S, then there exists a projective S-scheme X' and S-morphism that induces for some open dense subset U.Chow's lemma is one of the foundational results in algebraic geometry.".
- Chow's_lemma label "Chow's lemma".
- Chow's_lemma sameAs m.0ll480q.
- Chow's_lemma sameAs Q5105492.
- Chow's_lemma sameAs Q5105492.
- Chow's_lemma wasDerivedFrom Chow's_lemma?oldid=605171431.
- Chow's_lemma isPrimaryTopicOf Chow's_lemma.