Desmic system

[image:Compound of two tetrahedron|tetrahedra.png|thumb|right|Two desmic tetrahedra. The third tetrahedron of this system is not shown, but has one vertex at the center and the other three on the plane at infinity.]
In projective geometry, a desmic system is a set of three tetrahedra in 3-dimensional projective space, such that any two are desmic. It was introduced by. The three tetrahedra of a desmic system are contained in a pencil of quartic surfaces.
Every line that passes through two vertices of two tetrahedra in the system also passes through a vertex of the third tetrahedron.
The 12 vertices of the desmic system and the 16 lines formed in this way are the points and lines of a Reye configuration.

Example

The three tetrahedra given by the equations
form a desmic system, contained in the pencil of quartics
for a + b + c = 0.