The planar projectivity of PG(2, $q^3$) of order 3 under field reduction

Abstract

Let $φ$ be a collineation of $\mathrm{PG}\left(2, q^{3}\right)$ of order 3 which fixes a plane of order $q$ pointwise. The points of $\mathrm{PG}\left(2, q^{3}\right)$ can be partitioned into three types with respect to orbits of $φ$ : fixed points; points $P$ with $P, P^φ, P^{φ^{2}}$ distinct and collinear; and points $P$ with $P, P^φ, P^{φ^{2}}$ not collinear. Under field reduction, the collineation $φ$ corresponds to a projectivity $σ$ of $\operatorname{PG}(8, q)$ of order 3 . With respect to the field reduction and the orbits of $σ$, the points of $\mathrm{PG}(8, q)$ can be partitioned into six types. This article looks at the projectivity $σ$ in detail, and classifies and counts the fixed points, fixed lines and fixed planes. The motivation is to give a description of the lines of the Figueroa projective plane in the $\mathrm{PG}(8, q)$ field reduction setting.