Two Dimensional $\left( \alpha,\beta \right) $-Constacyclic Codes of arbitrary length over a Finite Field

In this paper we characterize the algebraic structure of two-dimensional $(\alpha,\beta )$-constacyclic codes of arbitrary length $s.\ell$ and of their duals. For $\alpha,\beta \in \{1,-1\}$, we give necessary and sufficient conditions for a two-dimensional $(\alpha,\beta )$-constacyclic code to be self-dual. We also show that a two-dimensional $(\alpha,1 )$-constacyclic code $\mathcal{C}$ of length $n=s.\ell$ can not be self-dual if $\gcd(s,q)= 1$. Finally, we give some examples of self-dual, isodual, MDS and quasi-twisted codes corresponding to two-dimensional $(\alpha,\beta )$-constacyclic codes.