Self-dual codes over $\mathbb {F}_{2} \times (\mathbb {F}_{2}+v\mathbb {F}_{2})$

Abstract

In this study we consider Euclidean and Hermitian self-dual codes over the direct product ring $\mathbb {F}_{2} \times (\mathbb {F}_{2}+v\mathbb {F}_{2})$ where v2 = v. We obtain some theoretical outcomes about self-dual codes via the generator matrices of free linear codes over $\mathbb {F}_{2} \times (\mathbb {F}_{2}+v\mathbb {F}_{2})$ . Also, we obtain upper bounds on the minimum distance of linear codes for both the Lee distance and the Gray distance. Moreover, we find some free Euclidean and free Hermitian self-dual codes over $\mathbb {F}_{2} \times (\mathbb {F}_{2}+v\mathbb {F}_{2})$ via some useful construction methods.