Geometry of the inversion in a finite field and partitions of PG(2k-1,q) in normal rational curves

Abstract

Let L= Fqn be a finite field and let F= Fq be a subfield of L. Consider L as a vector space over F and the associated projective space that is isomorphic to PG(n-1,q). The properties of the projective mapping induced by x x-1 have been studied in Cs13,Fa02,Ha83,He85,Bu95, where it is proved that the image of any line is a normal rational curve in some subspace. In this note a more detailed geometric description is achieved. Consequences are found related to mixed partitions of the projective spaces; in particular, it is proved that for any positive integer k, if q2k-1, then there are partitions of PG(2k-1,q) in normal rational curves of degree 2k-1. For smaller q the same construction gives partitions in (q+1)-tuples of independent points.