Complete classification of $(\delta+\alpha u^2)$-constacyclic codes over $\mathbb{F}_{2^m}[u]/\langle u^4\rangle$ of oddly even length

TL;DR

This paper provides a complete classification, explicit representation, and enumeration of all $( ext{delta}+ ext{alpha} u^2)$-constacyclic codes over a specific finite ring of length $2n$, where $n$ is odd.

Contribution

It offers the first comprehensive classification and enumeration of these constacyclic codes over the ring $ ext{F}_{2^m}[u]/ ext{<}u^4 ext{>}$ for odd length $2n$.

Findings

Explicit representation of all codes

Enumeration of all distinct codes

Complete classification over the specified ring

Abstract

Let $\mathbb{F}_{2^m}$ be a finite field of cardinality $2^m$, $R=\mathbb{F}_{2^m}[u]/\langle u^4\rangle)$ and $n$ is an odd positive integer. For any $\delta,\alpha\in \mathbb{F}_{2^m}^{\times}$, ideals of the ring $R[x]/\langle x^{2n}-(\delta+\alpha u^2)\rangle$ are identified as $(\delta+\alpha u^2)$-constacyclic codes of length $2n$ over $R$. In this paper, an explicit representation and enumeration for all distinct $(\delta+\alpha u^2)$-constacyclic codes of length $2n$ over $R$ are presented.