Alexandre Fotue-Tabue, Christophe Mouaha, “On the lattice of cyclic codes over finite chain rings”, Algebra Discrete Math., 27:2 (2019), 252

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Algebra and Discrete Mathematics, 2019, Volume 27, Issue 2, Pages 252–268 (Mi adm706)

RESEARCH ARTICLE

On the lattice of cyclic codes over finite chain rings

Alexandre Fotue-Tabue^a, Christophe Mouaha^b

^a Department of Mathematics, Faculty of Science, University of Yaoundé 1, Cameroon
^b Department of Mathematics, Higher Teachers Training College, University of Yaoundé 1, Cameroon

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Abstract: In this paper,

$R$ is a finite chain ring of invariants

$(q,s)$ , and

$\ell$ is a positive integer fulfilling

$\operatorname{gcd}(\ell,q) = 1$ . In the language of

$q$ -cyclotomic cosets modulo

$\ell$ , the cyclic codes over

$R$ of length

$\ell$ are uniquely decomposed into a direct sum of trace-representable cyclic codes over

$R$ and the lattice of cyclic codes over

$R$ of length

$\ell$ is investigated.

Keywords: finite chain rings, cyclotomic cosets, linear code, cyclic code, trace map.

Received: 16.03.2017

Document Type: Article

MSC: 13B05, 94B05, 94B15, 03G10, 16P10

Language: English

Citation: Alexandre Fotue-Tabue, Christophe Mouaha, “On the lattice of cyclic codes over finite chain rings”, Algebra Discrete Math., 27:2 (2019), 252–268

Citation in format AMSBIB

\Bibitem{FotMou19}

\by Alexandre~Fotue-Tabue, Christophe~Mouaha

\paper On the lattice of cyclic codes over finite chain rings

\jour Algebra Discrete Math.

\yr 2019

\vol 27

\issue 2

\pages 252--268

\mathnet{http://mi.mathnet.ru/adm706}

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https://www.mathnet.ru/eng/adm/v27/i2/p252

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References:	29

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