(, , a)-cyclic codes over Fql and their applications in the construction of quantum codes

Abstract

In this article, for a finite field Fq and a natural number l, let R denote the product ring Fql. Firstly, for an automorphism of R, a -derivation of R and for a unit a in R, we study (, , a)-cyclic codes over R. In this direction, we give an algebraic characterization of a (, , a)-cyclic code over R, determine its generator polynomial, and find its decomposition over Fq. Secondly, we give a necessary and sufficient condition for a (, 0, a)-cyclic code to be Euclidean dual-containing code over R. Thirdly, we study Gray maps and obtain several MDS and optimal linear codes over Fq as Gray images of (, , a)-cyclic codes over R. Moreover, we determine orthogonality preserving Gray maps and construct Euclidean dual-containing codes with good parameters. Lastly, as an application, we construct MDS and almost MDS quantum codes by employing the Euclidean dual-containing and annihilator dual-containing CSS constructions.