Linear codes over \(\frac{\mathbb{Z}_4[x]}{\langle{x^2} + 2x \rangle}\) (Q906905)
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scientific article; zbMATH DE number 6537526
| Language | Label | Description | Also known as |
|---|---|---|---|
| English | Linear codes over \(\frac{\mathbb{Z}_4[x]}{\langle{x^2} + 2x \rangle}\) |
scientific article; zbMATH DE number 6537526 |
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Linear codes over \(\frac{\mathbb{Z}_4[x]}{\langle{x^2} + 2x \rangle}\) (English)
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29 January 2016
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Codes are studied over the local Frobenius ring \(\mathbb Z_4[x]/ \langle x^2 +2x \rangle.\) The authors describe the ring structure and give a duality preserving Gray map. This, in turn, is used to produce MacWilliams relations for the Lee weight enumerator of codes over this ring. Self-dual codes over this ring are connected via the Gray map to quaternary self-dual codes and to real unimodular lattices. Some different versions of quaternary Reed-Muller codes are shown to be images of linear codes over this ring.
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Frobenius ring
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chain ring
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local Frobenius non-chain rings
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codes over rings
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Reed-Muller codes
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\(Z_4\) codes
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self-dual codes
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