Cyclic codes over the ring $$ Z_{P^2 } $$ of length p e

Abstract

The study of cyclic codes over rings has generated a lot of public interest. In this paper, we study cyclic codes and their dual codes over the ring \( Z_{P^2 } \) of length pe, and find a set of generators for these codes. The ranks and minimal generator sets of these codes are studied as well, which play an important role in decoding and determining the distance distribution of codes.