On ZpZp[u, v]-additive cyclic and constacyclic codes

Abstract

Let Zp be the ring of residue classes modulo a prime p. The ZpZp[u,v]-additive cyclic codes of length (α,β) is identify as Zp[u,v][x]-submodule of Zp[x]/ xα-1 × Zp[u,v][x]/ xβ-1 where Zp[u,v]=Zp+uZp+vZp with u2=v2=uv=vu=0. In this article, we obtain the complete sets of generator polynomials, minimal generating sets for cyclic codes with length β over Zp[u,v] and ZpZp[u,v]-additive cyclic codes with length (α,β) respectively. We show that the Gray image of ZpZp[u,v]-additive cyclic code with length (α,β) is either a QC code of length 4α with index 4 or a generalized QC code of length (α,3β) over Zp. Moreover, some structural properties like generating polynomials, minimal generating sets of ZpZp[u,v]-additive constacyclic code with length (α,p-1) are determined.