Skew Constacyclic Codes Of Length nps over $ Fpm[u] uk

Abstract

Let Fpm be the field containing pm elements where p is an odd prime and m ∈ N. In this article, we propose a unified approach to the study of skew constacyclic codes of length nps over the ring Rk = Fpm[u]/ uk , where n, s, k ∈ N and (n, p)=1. Consider the skew polynomial ring Rk[x;Θ], where Θ is an automorphism of Rk such that xa = Θ(a)x for all a ∈ Rk. Let f(x) be a central irreducible divisor of xnps - λ of degree l and multiplicity j in Rk[x;Θ], where λ is an invertible element in Rk. In this article, we study skew constacyclic codes of length \(nps\) over \(Rk\), which reduces to the study of skew polycyclic codes of length jl associated with a polynomial \(f(x)j\). Using the fact that skew polycyclic codes associated with a polynomial \(f(x)j\) can be described by the left ideal structure of the quotient ring Rk[x;Θ]/ f(x)j, we investigate this class of codes for specific choices of Θ. In particular, if λ is an invertible element of Fpm, we classify all left ideals and establish an isomorphism between skew cyclic and skew constacyclic codes, under suitable conditions. Furthermore, we provide a comprehensive analysis of skew constacyclic codes of length 3ps over Rk. Finally, we examine skew cyclic and skew negacyclic codes of length 6ps over Rk using the factorization of x6ps - 1 and x6ps + 1, respectively; with a complete case-by-case analysis. Examples demonstrating codes with optimal parameters are also included.