The minimum distance of the antiprimitive BCH code with designed distance 3

Abstract

Let C(q,qm+1,3,h) denote the antiprimitive BCH code with designed distance 3. In this paper, we demonstrate that the minimum distance d of C(q,qm+1,3,h) equals 3 if and only if (2h+1,q+1,qm+1)1. When both q and m are odd, we determine the sufficient and necessary condition for d=4 and fully characterize the minimum distance in this case. Based on these conditions, we investigate the parameters of C(q,qm+1,3,h) for certain h. Additionally, two infinite families of distance-optimal codes and several linear codes with the best known parameters are presented.