When isometry and equivalence for skew constacyclic codes coincide

Abstract

We work in the setting of linear skew constacyclic codes over a commutative base ring S. We show that the notions of (n,σ)-isometry and (n,σ)-equivalence introduced by Ou-azzou et al coincide for most skew (σ,a)-constacyclic codes of length n. To prove this, we show that all Hamming-weight preserving isomorphisms between their ambient rings which extend some automorphism τ of S that commutes with σ must have degree one, when those rings are not associative. In the process we determine isomorphisms between their nonassociative ambient rings, the Petit rings S[t;σ]/S[t;σ](tn-a), which give rise to skew constacyclic codes. As a consequence, we propose new definitions of equivalence and isometry of skew constacyclic codes that exactly capture all Hamming-weight preserving isomorphisms between the ambient rings of skew constacyclic codes which extend τ∈ Aut(S) that commute with σ, and lead to tighter classifications.