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- Cubic_threefold abstract "In algebraic geometry, a cubic threefold is a hypersurface of degree 3 in 4-dimensional projective space. Cubic threefolds are all unirational, but Clemens & Griffiths (1972) used intermediate Jacobians to show that non-singular cubic threefolds are not rational. The space of lines on a non-singular cubic 3-fold is a Fano surface.".
- Cubic_threefold wikiPageExternalLink item?id=ASNSP_1967_3_21_1_1_0.
- Cubic_threefold wikiPageExternalLink item?id=CM_1972__25_2_161_0.
- Cubic_threefold wikiPageID "23560713".
- Cubic_threefold wikiPageRevisionID "446773771".
- Cubic_threefold hasPhotoCollection Cubic_threefold.
- Cubic_threefold subject Category:Algebraic_varieties.
- Cubic_threefold subject Category:Threefolds.
- Cubic_threefold type Abstraction100002137.
- Cubic_threefold type AlgebraicVarieties.
- Cubic_threefold type Assortment108398773.
- Cubic_threefold type Collection107951464.
- Cubic_threefold type Group100031264.
- Cubic_threefold comment "In algebraic geometry, a cubic threefold is a hypersurface of degree 3 in 4-dimensional projective space. Cubic threefolds are all unirational, but Clemens & Griffiths (1972) used intermediate Jacobians to show that non-singular cubic threefolds are not rational. The space of lines on a non-singular cubic 3-fold is a Fano surface.".
- Cubic_threefold label "Cubic threefold".
- Cubic_threefold sameAs m.06w6yfz.
- Cubic_threefold sameAs Q5192251.
- Cubic_threefold sameAs Q5192251.
- Cubic_threefold sameAs Cubic_threefold.
- Cubic_threefold wasDerivedFrom Cubic_threefold?oldid=446773771.
- Cubic_threefold isPrimaryTopicOf Cubic_threefold.