On Z2Z2[u]-(1+u)-additive constacyclic

Abstract

In this paper, we study Z2Z2[u]-(1+u)-additive constacyclic code of arbitrary length. Firstly, we study the algebraic structure of this family of codes and a set of generator polynomials for this family as a (Z2+uZ2)[x]-submodule of the ring Rα,β. Secondly, we give the minimal generating sets of this family codes, and we determine the relationship of generators between the Z2Z2[u]-(1+u)-additive constacyclic codes and its dual and give the parameters in terms of the degrees of the generator polynomials of the code. Lastly, we also study Z2Z2[u]-(1+u)-additive constacyclic code in terms of the Gray images.