Geometric hyperplanes of the Lie geometry An,\1,n\(F)

Abstract

In this paper we investigate hyperplanes of the point-line geometry An,\1,n\(F) of point-hyerplane flags of the projective geometry PG(n,F). Renouncing a complete classification, which is not yet within our reach, we describe the hyperplanes which arise from the natural embedding of An,\1,n\(F), that is the embedding which yields the adjoint representation of SL(n+1,F). The information we shall collect on these hyperplanes will allow us to prove that all hyperplanes of An,\1,n\(F) are maximal subspaces of An,\1,n\(F). Hyperplanes of An,\1,n\(F) can also be contructed starting from suitable line-spreads of PG(n,F) (provided that PG(n,F) admits line-spreads, of course). Explicitly, let S be a line-spread of PG(n,K) satisfying certain conditions to be stated in this paper (which hold for all line-spreads obtained via the most popular constructions). The set of point-hyperplane flags (p,H) of PG(n,F) such that H contains the member of S through the point p is a hyperplane of An,\1,n\(F). We call these hyperplanes hyperplanes of spread type. Many of them arise from the natural embedding. We don't know if this is the case for all of them.