Cubic threefold

In algebraic geometry, a cubic threefold is a hypersurface of degree 3 in 4-dimensional projective space. Cubic threefolds are all unirational, but 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.

Examples

 * Koras–Russell cubic threefold
 * Klein cubic threefold
 * Segre cubic