Quasi self-dual codes over non-unital rings of order six
Author
Alahmadi, Adel
Alkathiry, Amani
Altassan, Alaa
Basaffar, Widyan
Bonnecaze, Alexis
Shoaib, Hatoon
Solé, Patrick
Full text
https://www.revistaproyecciones.cl/index.php/proyecciones/article/view/433710.22199/issn.0717-6279-2020-04-0066
Abstract
There exist two semi-local rings of order 6 without identity for the multiplication. We classify up to coordinate permutation self-orthogonal codes of length n and size 6n/2 over these rings (called here quasi self-dual codes or QSD) till the length n = 8. To any such code is attached canonically a ?6-code, which, when self-dual, produces an unimodular lattice by Construction A.