Embeddings and hyperplanes of the Lie incidence geometry $An,\1,n\(F)

Abstract

In this paper we consider a family of projective embeddings of the geometry = An,\1,n\(F) of point-hyperplanes flags of the projective geometry = PG(n,F). The natural embedding mathrmnat is one of them. It maps every point-hyperplane flag (p,H) of onto the vector-line x, where x is a representative vector of p and is a linear functional describing H. The other embeddings have been discovered by Thas and Van Maldeghem (2000) for the case n = 2 and later generalized to any n by De Schepper, Schillewaert and Van Maldeghem (2023). They are obtained as twistings of nat by non-trivial automorphisms of F. Explicitly, for σ∈ Aut(F)\idF\, the twisting σ of nat by σ maps (p,H) onto xσ . We shall prove that, when |Aut(F)| > 1 a geometric hyperplane H of arises from nat and one of its twistings or from two distinct twistings of nat if and only if H = \(p,H)∈ p∈ A or a ∈ H\ for a possibly non-incident point-hyperplane pair (a,A) of . We call these hyperplanes quasi-singular hyperplanes. With the help of this result we shall prove that if |Aut(F)| > 1 then admits no absolutely universal embedding.