A characterisation of Fq-conics of PG(2,q3)

Abstract

This article considers an Fq-conic contained in an Fq-subplane of PG(2,q3), and shows that it corresponds to a normal rational curve in the Bruck-Bose representation in PG(6,q). This article then characterises which normal rational curves of PG(6,q) correspond via the Bruck-Bose representation to Fq-conics of PG(2,q3). The normal rational curves of interest are called 3-special, which relates to how the extension of the normal rational curve meets the transversal lines of the regular 2-spread of the Bruck-Bose representation. This article uses geometric arguments that exploit the interaction between the Bruck-Bose representation of PG(2,q3) in PG(6,q), and the Bose representation of PG(2,q3) in PG(8,q).