On Eisenstein additive codes over chain rings and linear codes over mixed alphabets

Abstract

Let Re=GR(pe,r)[y]/ g(y),pe-1yt be a finite commutative chain ring, where p is a prime number, GR(pe,r) is the Galois ring of characteristic pe and rank r, t and k are positive integers satisfying 1≤ t≤ k when e ≥ 2, while t=k when e=1, and g(y)=yk+p(gk-1yk-1+·s+g1y+g0)∈ GR(pe,r)[y] is an Eisenstein polynomial with g0 as a unit in GR(pe,r). In this paper, we first establish a duality-preserving 1-1 correspondence between additive codes over Re and ZpeZpe-1-linear codes, where the character-theoretic dual codes of additive codes over Re correspond to the Euclidean dual codes of ZpeZpe-1-linear codes, and vice versa. This correspondence gives rise to a method for constructing additive codes over Re and their character-theoretic dual codes, as unlike additive codes over Re, ZpeZpe-1-linear codes can be completely described in terms of generator matrices. We also list additive codes over the chain ring Z4[y]/ y2-2,2y achieving the Plotkin's bound for homogeneous weights, which suggests that additive codes over Re is a promising class of error-correcting codes to find optimal codes with respect to the homogeneous metric.

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