On ZprZprZps-Additive Cyclic Codes

Abstract

In this paper, we introduce ZprZprZps-additive cyclic codes for r≤ s. These codes can be identified as Zps[x]-submodules of Zpr[x]/ xα-1 × Zpr[x]/ xβ-1× Zps[x]/ xγ-1. We determine the generator polynomials and minimal generating sets for this family of codes. Some previous works has been done for the case p=2 with r=s=1, r=s=2, and r=1,s=2. However, we show that in these previous works the classification of these codes were incomplete and the statements in this paper complete such classification. We also discuss the structure of separable ZprZprZps-additive cyclic codes and determine their generator polynomials. Further, we also study the duality of Zps[x]-submodules. As applications, we present some examples and construct some optimal binary codes.