Ovoidal fibrations in PG(3,q), q even

Abstract

We prove that, given a partition of the point-set of PG(3,q), q=2n >2, by ovoids \θi\qi=0 of PG(3,q) and a line of PG(3,q), not tangent to θ0 if denotes the polar of relative to the symplectic form on PG(3,q) whose isotropic lines are the tangent lines to θ0, then and are tangent to distinct ovoids θj, θk, both distinct from θ0. This uses the fact that the radical of the linear code generated by the dual duals of the hyperbolic quadrics , with and as above, is of codimension 1