Reversible double cyclic codes over a chain ring
Provides theoretical results for a class of codes over a chain ring, but the contribution is incremental for coding theory researchers.
The paper characterizes reversible double cyclic codes over a chain ring, derives conditions for reversibility and reversible-complement, and uses them to construct DNA codes over a specific ring, with some optimal codes found.
In this paper, we study the structure of double cyclic codes of length $(γ,δ)$ over $\mathbb F_q+u\mathbb F_q, u^2=0$. We also study the dual of double cyclic code of length $(γ,δ)$ and give a minimal spanning set of double cyclic codes. Moreover, we study the necessary and sufficient conditions for a double cyclic code to be reversible and reversible-complement double cyclic code and with the help of these codes, we constructed DNA codes over $\mathbb F_4+u\mathbb F_4, u^2=0$. We also constructed some optimal codes to support our results.