Characterizations and properties of principal (f, σ, δ)-codes over rings

Abstract

Let A be a ring with identity, σ a ring endomorphism of A that maps the identity to itself, δ a σ-derivation of A, and consider the skew-polynomial ring A[X;σ,δ]. When A is a finite field, a Galois ring, or a general ring, some fairly recent literature used A[X;σ,δ] to construct new interesting codes (e.g. skew-cyclic and skew-constacyclic codes) that generalize their classical counterparts over finite fields (e.g. cyclic and constacyclic linear codes). This paper presents results concerning principal (f, σ, δ)-codes over a ring A, where f∈ A[X;σ,δ] is monic. We provide recursive formulas that compute the entries of both a generating matrix and a control matrix of such a code C. When A is a finite commutative ring with identity and σ is a ring automorphism of A, we also give recursive formulas for the entries of a parity-check matrix of C. Also in this case, with δ=0, we give a generating matrix of the dual C, present a characterization of principal σ-codes whose duals are also principal σ-codes, and deduce a characterization of self-dual principal σ-codes. Some corollaries concerning principal σ-constacyclic codes are also given, and some highlighting examples are provided.