Skew cyclic codes over Z4+vZ4 with derivation: structural properties and computational results
Abstract
In this work, we study a class of skew cyclic codes over the ring R:=Z4+vZ4, where v2=v, with an automorphism θ and a derivation θ, namely codes as modules over a skew polynomial ring R[x;θ,θ], whose multiplication is defined using an automorphism θ and a derivation θ. We investigate the structures of a skew polynomial ring R[x;θ,θ]. We define θ-cyclic codes as a generalization of the notion of cyclic codes. The properties of θ-cyclic codes as well as dual θ-cyclic codes are derived. As an application, some new linear codes over Z4 with good parameters are obtained by Plotkin sum construction, also via a Gray map as well as residue and torsion codes of these codes.
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