Cyclic codes with lenght divisible by the field characteristic as invariant subspaces

Authors

  • Diana Radkova
  • Asen Bojilov

Keywords:

cyclic codes, invariant subspaces

Abstract

In the theory of cyclic codes it is a common practice to require $(n,q)=1$, where $n$ is the word length and $F_q$ is the alphabet. However, much of the theory also goes through without this restriction on $n$ and $q$. We observe that the cyclic shift map is a linear operator in $F^n_q$. Our approach is to consider cyclic codes as invariant subspaces of $F^n_q$ with respect to this operator and thus obtain a description of cyclic codes in this more general setting.

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Published

2008-12-12

How to Cite

Radkova, D., & Bojilov, A. (2008). Cyclic codes with lenght divisible by the field characteristic as invariant subspaces. Ann. Sofia Univ. Fac. Math. And Inf., 98, 181–189. Retrieved from https://ftl5.uni-sofia.bg./index.php/fmi/article/view/137