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- Chow's_moving_lemma abstract "In algebraic geometry, Chow's moving lemma, named after Wei-Liang Chow, states: given algebraic cycles Y, Z on a nonsingular quasi-projective variety X, there is another algebraic cycle Z' on X such that Z' is rationally equivalent to Z and Y and Z' intersect properly. The lemma is one of key ingredients in developing the intersection theory, as it is used to show the uniqueness of the theory.".
- Chow's_moving_lemma wikiPageID "38307346".
- Chow's_moving_lemma wikiPageRevisionID "605171490".
- Chow's_moving_lemma hasPhotoCollection Chow's_moving_lemma.
- Chow's_moving_lemma subject Category:Algebraic_geometry.
- Chow's_moving_lemma subject Category:Chinese_mathematical_discoveries.
- Chow's_moving_lemma comment "In algebraic geometry, Chow's moving lemma, named after Wei-Liang Chow, states: given algebraic cycles Y, Z on a nonsingular quasi-projective variety X, there is another algebraic cycle Z' on X such that Z' is rationally equivalent to Z and Y and Z' intersect properly. The lemma is one of key ingredients in developing the intersection theory, as it is used to show the uniqueness of the theory.".
- Chow's_moving_lemma label "Chow's moving lemma".
- Chow's_moving_lemma sameAs m.0q3y6md.
- Chow's_moving_lemma sameAs Q5105491.
- Chow's_moving_lemma sameAs Q5105491.
- Chow's_moving_lemma wasDerivedFrom Chow's_moving_lemma?oldid=605171490.
- Chow's_moving_lemma isPrimaryTopicOf Chow's_moving_lemma.