Two disguises of the linear representation of a subgeometry

Abstract

Let PG(n,q) be the Desarguesian projective space of dimension n over the finite field of order q. The linear representation of a point set K in a hyperplane at infinity of PG(n,q) is the point-line geometry consisting of the affine points of PG(n,q), together with the union of the parallel classes of affine lines corresponding to the points of K. This type of point-line geometry has been widely investigated in the literature. Curiously, if K is a subgeometry, two disguises of its linear representation occur in two separate works. In this short note, we give an explicit isomorphism between these two disguises by making use of field reduction.

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