A characterization of $\mathbb{Z}_2\mathbb{Z}_2[u]$-linear codes

Joaquim Borges

arXiv:1611.05655·math.CO·November 18, 2016

A characterization of $\mathbb{Z}_2\mathbb{Z}_2[u]$-linear codes

Joaquim Borges

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TL;DR

This paper characterizes $\

Contribution

It provides a complete characterization of $\

Findings

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Abstract

We prove that the class of $Z_{2} Z_{2} [u]$ -linear codes is exactly the class of $Z_{2}$ -linear codes with automorphism group of even order. Using this characterization, we give examples of known codes, e.g. perfect codes, which has a nontrivial $Z_{2} Z_{2} [u]$ structure. We also exhibit an example of a $Z_{2}$ -linear code which is not $Z_{2} Z_{2} [u]$ -linear. Also, we state that duality of $Z_{2} Z_{2} [u]$ -linear codes is the same that duality of $Z_{2}$ -linear codes. Finally, we prove that the class of $Z_{2} Z_{4}$ -linear codes which are also $Z_{2}$ -linear is strictly contained in the class of $Z_{2} Z_{2} [u]$ -linear codes.

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Taxonomy

TopicsCoding theory and cryptography · graph theory and CDMA systems · Finite Group Theory Research