On $(n,\sigma)-$equivalence relation between skew constacyclic codes
Abstract
In this paper we generalize the notion of -equivalence relation introduced by Chen et al. in \cite{Chen2014} to classify constacyclic codes of length over a finite field , where is a prime power, to the case of skew constacyclic codes without derivation. We call this relation -equivalence relation, where is the length of the code and is an automorphism of the finite field. We compute the number of -equivalence classes, and we give conditions on and for which -constacyclic codes and -constacyclic codes are equivalent with respect to our -equivalence relation. Under some conditions on and we prove that skew constacyclic codes are equivalent to cyclic codes. We also prove that when is even and is the Frobenius autmorphism, skew constacyclic codes of length are equivalent to cyclic codes when . Finally we give some examples as applications of the theory developed here.
Cite
@article{arxiv.2311.17527,
title = {On $(n,\sigma)-$equivalence relation between skew constacyclic codes},
author = {Hassan Ou-azzou and Mustapha Najmeddine and Nuh Aydin},
journal= {arXiv preprint arXiv:2311.17527},
year = {2023}
}
Comments
16 pages