Polar space

In mathematics, in the field of geometry, a polar space of rank n (n ≥ 3), or projective index n − 1, consists of a set P, conventionally the set of points, together with certain subsets of P, called subspaces, that satisfy these axioms:

It is possible to define and study a slightly bigger class of objects using only relationship between points and lines: a polar space is a partial linear space (P,L), so that for each point pP and each line lL, the set of points of l collinear to p, is either a singleton or the whole l.

A polar space of rank two is a generalized quadrangle; in this case in the latter definition the set of points of a line l collinear to a point p is the whole l only if p ∈ l. One recovers the former definition from the latter under assumptions that lines have more than 2 points, points lie on more than 2 lines, and there exist a line l and a point p not on l so that p is collinear to all points of l.

Finite polar spaces (where P is a finite set) are also studied as combinatorial objects.

Examples

Classification

Jacques Tits proved that a finite polar space of rank at least three, is always isomorphic with one of the three structures given above. This leaves only the problem of classifying generalized quadrangles.

References

This article is issued from Wikipedia - version of the Thursday, October 22, 2015. The text is available under the Creative Commons Attribution/Share Alike but additional terms may apply for the media files.