Linear codes associated with the Desarguesian ovoids in Q+(7,q)

Abstract

The Desarguesian ovoids in the orthogonal polar space Q+(7,q) with q even have first been introduced by Kantor by examining the 8-dimensional absolutely irreducible modular representations of PGL(2,q3). We investigate this module for all prime power values of q. The shortest PGL(2,q3)-orbit O gives the Desarguesian ovoid in Q+(7,q) for even q and it is known to give a complete partial ovoid of the symplectic polar space W(7,q) for odd~q. We determine the hyperplane sections of O. As a corollary, we obtain the parameters [q3+1,8,q3-q2-q]q and the weight distribution of the associated Fq-linear code CO and the parameters [q3+1,q3-7,5]q of the dual code CO for q 4. We also show that both codes CO and CO are length-optimal for all prime power values of q.