Classification of Self-Dual Constacyclic Codes of Prime Power Length $p^s$ Over $\frac{\mathbb{F}_{p^m}[u]}{\left\langle u^3\right\rangle} $

Ismail Akharraz

Classification of Self-Dual Constacyclic Codes of Prime Power Length ps Over Fpm[u] u3

Abstract

Let Fpm be a finite field of cardinality pm, where p is a prime number and m is a positive integer. Self-dual constacyclic codes of length $ ps $ over $ Fpm[u] u3 $ exist only when $ p = 2 $. In this work, we classify and enumerate all self-dual cyclic codes of length $ 2s $ over $ F2m[u] u3 $, thereby completing the classification and enumeration of self-dual constacyclic codes of length $ ps $ over $ Fpm[u] u3 $. Additionally, we correct and improve results from B. Kim and Y. Lee (2020) in kim2020classification.

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