The focus of this post is elation generalised quadrangles. These are generalised quadrangles defined with respect to certain automorphisms of the generalised quadrangle. My main sources for this post have been Michel (Celle) Lavrauw’s and Maska Law’s Phd theses which are both availiable from Ghent’s PhD theses in finite geometry page.

Let be a generalised quadrangle of order with a point . An *elation* about is an automorphism of that fixes , fixes each line incident with and fixes no point not collinear with . If there exists a group of order consisting entirely of elations and which acts regularly on the set of points not collinear with then is called an *elation generalised quadrangle* or simply an EGQ. The group is called an *elation group* and is called the *base point*.

Continue reading “Generalised quadrangles V: elation generalised quadrangles”