Incidence theorem

In projective geometry, an intersection theorem or incidence theorem is a statement concerning an incidence structure – consisting of points, lines, and possibly higher-dimensional objects and their incidences – together with a pair of objects $A$ and $B$ (for instance, a point and a line). The "theorem" states that, whenever a set of objects satisfies the incidences (i.e. can be identified with the objects of the incidence structure in such a way that incidence is preserved), then the objects $A$ and $B$ must also be incident. An intersection theorem is not necessarily true in all projective geometries; it is a property that some geometries satisfy but others don't.

For example, Desargues' theorem can be stated using the following incidence structure:

The implication is then $(R,PQ)$ —that point $R$ is incident with line $PQ$ .

Desargues' theorem holds in a projective plane $P$ if and only if $P$ is the projective plane over some division ring (skewfield} $D$ — $P=\mathbb {P} _{2}D$ . The projective plane is then called desarguesian. A theorem of Amitsur and Bergman states that, in the context of desarguesian projective planes, for every intersection theorem there is a rational identity such that the plane $P$ satisfies the intersection theorem if and only if the division ring $D$ satisfies the rational identity.

...
Wikipedia