Functional codes arising from rank n Hermitian varieties and hypersurfaces in low dimensions

Abstract

We study the functional code Cd(X), introduced by G. Lachaud in 1996, in the case where X is a rank n degenerate Hermitian variety PUn-1 in Pn(Fq2) and d≤ q. We establish an upper bound for the maximum number of Fq2-rational points in the intersection of PUn-1 with an Fq2-hypersurface of degree at most q in Pn. Using this bound, we determine the parameters of the codes Cd(PUn-1) in the cases n=2,3,4. We also characterize the hypersurfaces that correspond to the minimum distance of these codes in the cases n=2,3,4.