Long quasi-polycyclic $t-$CIS codes
Information Theory
2017-03-10 v1 math.IT
Abstract
We study complementary information set codes of length and dimension of order called (CIS code for short). Quasi-cyclic and quasi-twisted -CIS codes are enumerated by using their concatenated structure. Asymptotic existence results are derived for one-generator and have co-index by Artin's conjecture for quasi cyclic and special case for quasi twisted. This shows that there are infinite families of long QC and QT -CIS codes with relative distance satisfying a modified Varshamov-Gilbert bound for rate codes. Similar results are defined for the new and more general class of quasi-polycyclic codes introduced recently by Berger and Amrani.
Cite
@article{arxiv.1703.03109,
title = {Long quasi-polycyclic $t-$CIS codes},
author = {Adel Alahmadi and Cem Güneri and Hatoon Shoaib and Patrick Solé},
journal= {arXiv preprint arXiv:1703.03109},
year = {2017}
}
Comments
12 pages