In algebraic geometry, a line complex is a 3-fold given by the intersection of the Grassmannian ''G''(2, 4) (embedded in projective space ''P''⁵ by

Plücker coordinates In geometry, Plücker coordinates, introduced by Julius Plücker in the 19th century, are a way to assign six homogeneous coordinates to each line in projective 3-space, P3. Because they satisfy a quadratic constraint, they establish a one-to- ...

) with a hypersurface. It is called a line complex because points of ''G''(2, 4) correspond to lines in ''P''³, so a line complex can be thought of as a 3-dimensional family of lines in ''P''³. The linear line complex and quadric line complex are the cases when the hypersurface has degree 1 or 2; they are both

rational varieties In mathematics, a rational variety is an algebraic variety, over a given field ''K'', which is birationally equivalent to a projective space of some dimension over ''K''. This means that its function field is isomorphic to :K(U_1, \dots , U_d), t ...

References

* * * Algebraic varieties 3-folds {{algebraic-geometry-stub