Polygones

We examine the relationship between collineations of generalized polygons and certain 'symmetries' of their coordinating structures.

In this paper we prove the following: Over each algebraically closed field K of Ž . characteristic 0 there exist precisely three algebraic polygons up to duality , namely the projective plane, the symplectic quadrangle, and the split Cayley Ž . hexagon over K Theorem 3.3 . As a corollary we prove th

For any fixed integer k G 2, define the class of k-polygon graphs as the intersection graphs of chords inside a convex k-polygon, where the endpoints of each chord lie on two different sides. The case where k s 2 is degenerate; for our purpose, we view any pair of parallel lines as a 2-polygon. Henc

We generalize a construction given in [3] to derive new near polygons from spreads of symmetry in generalized quadrangles.