A classification of finite antiflag-transitive generalized quadrangles

Abstract

A generalized quadrangle is a point-line incidence geometry Q such that: (i) any two points lie on at most one line, and (ii) given a line and a point P not incident with , there is a unique point of collinear with P. The finite Moufang generalized quadrangles were classified by Fong and Seitz (1973), and we study a larger class of generalized quadrangles: the antiflag-transitive quadrangles. An antiflag of a generalized quadrangle is a non-incident point-line pair (P, ), and we say that the generalized quadrangle Q is antiflag-transitive if the group of collineations is transitive on the set of all antiflags. We prove that if a finite thick generalized quadrangle Q is antiflag-transitive, then Q is either a classical generalized quadrangle or is the unique generalized quadrangle of order (3,5) or its dual.