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{{Short description|Class of error correction code}}
{{one source |date=April 2024}}
In [[coding theory]], '''alternant codes''' form a class of parameterised [[Error detection and correction|error-correcting codes]] which generalise the [[BCH code]]s.
==Definition==
An ''alternant code'' over GF(''q'') of length ''n'' is defined by a parity check matrix ''H'' of [[alternant matrix|alternant]] form ''H''<sub>''i'',''j''</sub> = α<sub>j</sub><sup>i</sup>''y''<sub>''i''</sub>, where the α<sub>''j''</sub> are distinct elements of the extension GF(''q''<sup>''m''</sup>), the ''y''<sub>''i''</sub> are further non-zero parameters again in the extension GF(''q''<sup>''m''</sup>) and the indices range as ''i'' from 0 to δ &
==Properties==
The parameters of this alternant code are length ''n'', dimension ≥ ''n
There exist long alternant codes which meet the [[
The class of alternant codes includes
* [[BCH code]]s
* [[Binary Goppa code|Goppa codes]]
* [[
== References ==
{{refbegin}}
* {{cite book | author=F.J. MacWilliams | authorlink=Jessie MacWilliams |
{{refend}}
[[Category:Error detection and correction]]
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[[Category:Coding theory]]
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