A class of p-ary cyclic codes and their weight enumerators

Abstract

Let m, k be positive integers such that m(m,k)≥ 3, p be an odd prime and π be a primitive element of Fpm. Let h1(x) and h2(x) be the minimal polynomials of -π-1 and π-pk+12 over Fp, respectively. In the case of odd m(m,k), when k is even, (m,k) is odd or when k(m,k) is odd, Zhou et~al. in zhou obtained the weight distribution of a class of cyclic codes C over Fp with parity-check polynomial h1(x)h2(x). In this paper, we further investigate this class of cyclic codes C over Fp in the rest case of odd m(m,k) and the case of even m(m,k). Moreover, we determine the weight distribution of cyclic codes C.