In elementary geometry a quadrangle is a figure consisting of four segments intersecting in four (corner) points.
Note that each point is incident with 2 lines, each line is incident with 2 points, that there is at most one line passing through two distinct points, that two lines intersect in at most one point, and that for a point and a line not incident with that point there is a unique line through that point intersecting the given line.
These properties exemplify the simplest case of a generalized quadrangle. This is an incidence system , i.e. a (symmetric) incidence relation between points (the set ) and lines (or blocks, the set ) such that
i) for each point and line not passing through there is precisely one pair with on , on and .
A generalized quadrangle can be seen as a very special kind of bipartite graph (cf. Graph, bipartite), obtained by taking as its vertex set the disjoint union and with , connected if and only if is on .
Interchanging and one obtains the dual generalized quadrangle.
A generalized quadrangle is non-degenerate if there is no point that is collinear with all others, where two points are collinear if they are on a common line.
A finite generalized quadrangle of order is one that satisfies i) above and also
ii) each point is incident with precisely lines and there is at most one line through two distinct points;
iii) each line has points and two lines intersect in at most one point.
A simple example of a finite generalized quadrangle of order is depicted below
This is also an example of a grid, which is an incidence structure with , with on if and only if and on if and only if .
There are three known families of generalized quadrangles associated with the classical groups; these are known as classical generalized quadrangles. There are also others, for instance coming from ovoids (cf. Ovoid).
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|[a2]||R. Dembowski, "Finite geometries" , Springer (1968) pp. 254|
|[a3]||S.E. Payne, J.A. Thas, "Finite generalized quadrangles" , Pitman (1984)|
|[a4]||E.E. Shult, "Characterizations of the Lie incidence geometries" K. Lloyd (ed.) , Surveys in Combinatorics , Cambridge Univ. Press (1983) pp. 157–186|
Quadrangle. Encyclopedia of Mathematics. URL: http://encyclopediaofmath.org/index.php?title=Quadrangle&oldid=13574