On ZpZpk-additive codes and their duality

Abstract

In this paper, two different Gray-like maps from Zpα× Zpkβ, where p is prime, to Zpn, n=α+β pk-1, denoted by φ and , respectively, are presented. We have determined the connection between the weight enumerators among the image codes under these two mappings. We show that if C is a Zp Zpk-additive code, and C is its dual, then the weight enumerators of the image p-ary codes φ(C) and (C) are formally dual. This is a partial generalization of [On Z2k-dual binary codes, arXiv:math/0509325], and the result is generalized to odd characteristic p and mixed alphabet. Additionally, a construction of 1-perfect additive codes in the mixed Zp Zp2 ... Zpk alphabet is given.