Some notes on generalized quadrangles of order $s$ with a span of regular points

Bart De Bruyn and Stanley E. Payne

Abstract: Let $Q$ be a generalized quadrangle of order $s \geq 2$ with a regular point $x$. The set $x^\perp$ together with all spans which are contained in $x^\perp$ define a projective plane $\pi_x$ of order $s$. We introduce a property ($P_y$) for every point $y$ of $Q$ noncollinear with $x$ and prove that this property is equivalent with the regularity of the point $y$. We will use this to give an elementary proof for the following result: every generalized quadrangle of order $q$ which has a center of symmetry $x$ such that $\pi_x \cong {\mathrm{PG}}(2,q)$ and a regular point $y$ noncollinear with $x$ is isomorphic to $W(q)$.

Keywords: generalized quadrangle, center of symmetry

Classification (MSC2000): 51E12

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