Complete classification for simple root cyclic codes over local rings Zps[v]/ v2-pv

Abstract

Let p be a prime integer, n,s≥ 2 be integers satisfying gcd(p,n)=1, and denote R=Zps[v]/ v2-pv. Then R is a local non-principal ideal ring of p2s elements. First, the structure of any cyclic code over R of length n and a complete classification of all these codes are presented. Then the cardinality of each code and dual codes of these codes are given. Moreover, self-dual cyclic codes over R of length n are investigated. Finally, we list some optimal 2-quasi-cyclic self-dual linear codes over Z4 of length 30 and extremal 4-quasi-cyclic self-dual binary linear [60,30,12] codes derived from cyclic codes over Z4[v]/ v2+2v of length 15.