Repeated-root constacyclic codes of length 3lps and their dual codes

Abstract

Let p≠3 be any prime and l≠3 be any odd prime with gcd(p,l)=1. Fq*= is decomposed into mutually disjoint union of gcd(q-1,3lps) coset over the subgroup 3lps, where is a primitive (q-1)th root of unity. We classify all repeated-root constacyclic codes of length 3lps over the finite field Fq into some equivalence classes by the decomposition, where q=pm, s and m are positive integers. According to the equivalence classes, we explicitly determine the generator polynomials of all repeated-root constacyclic codes of length 3lps over Fq and their dual codes. Self-dual cyclic(negacyclic) codes of length 3lps over Fq exist only when p=2. And we give all self-dual cyclic(negacyclic) codes of length 3l2sover F2m and its enumeration.