Cyclic codes over Z4[u]/ uk of odd length

Abstract

Let R=Z4[u]/ uk=Z4+uZ4+…+uk-1Z4 (uk=0) where k∈ Z+ satisfies k≥ 2. For any odd positive integer n, it is known that cyclic codes over R of length n are identified with ideals of the ring R[x]/ xn-1. In this paper, an explicit representation for each cyclic code over R of length n is provided and a formula to count the number of codewords in each code is given. Then a formula to calculate the number of cyclic codes over R of length n is obtained. Precisely, the dual code of each cyclic code and self-dual cyclic codes over R of length n are investigated. When k=4, some optimal quasi-cyclic codes over Z4 of length 28 and index 4 are obtained from cyclic codes over R=Z4 [u]/ u4.