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- Fulton–Hansen_connectedness_theorem abstract "In mathematics, the Fulton–Hansen connectedness theorem is a result from intersection theory in algebraic geometry, for the case of subvarieties of projective space with codimension large enough to make the intersection have components of dimension at least 1.The formal statement is that if V and W are irreducible algebraic subvarieties of a projective space P, all over an algebraically closed field, and if dim(V) + dim (W) > dim (P)in terms of the dimension of an algebraic variety, then the intersection U of V and W is connected. More generally, the theorem states that if is a projective variety and is any morphism such that , then is connected, where is the diagonal in . The special case of intersections is recovered by taking , with the natural inclusion.".
- Fulton–Hansen_connectedness_theorem wikiPageID "5287504".
- Fulton–Hansen_connectedness_theorem wikiPageRevisionID "551297521".
- Fulton–Hansen_connectedness_theorem subject Category:Intersection_theory.
- Fulton–Hansen_connectedness_theorem subject Category:Theorems_in_algebraic_geometry.
- Fulton–Hansen_connectedness_theorem comment "In mathematics, the Fulton–Hansen connectedness theorem is a result from intersection theory in algebraic geometry, for the case of subvarieties of projective space with codimension large enough to make the intersection have components of dimension at least 1.The formal statement is that if V and W are irreducible algebraic subvarieties of a projective space P, all over an algebraically closed field, and if dim(V) + dim (W) > dim (P)in terms of the dimension of an algebraic variety, then the intersection U of V and W is connected. ".
- Fulton–Hansen_connectedness_theorem label "Fulton–Hansen connectedness theorem".
- Fulton–Hansen_connectedness_theorem sameAs Fulton%E2%80%93Hansen_connectedness_theorem.
- Fulton–Hansen_connectedness_theorem sameAs Q5508482.
- Fulton–Hansen_connectedness_theorem sameAs Q5508482.
- Fulton–Hansen_connectedness_theorem wasDerivedFrom Fulton–Hansen_connectedness_theorem?oldid=551297521.