Rate $(n-1)/n$ Systematic MDS Convolutional Codes over $GF(2^m)$
Abstract
A systematic convolutional encoder of rate and maximum degree generates a code of free distance at most and, at best, a column distance profile (CDP) of . A code is \emph{Maximum Distance Separable} (MDS) if it possesses this CDP. Applied on a communication channel over which packets are transmitted sequentially and which loses (erases) packets randomly, such a code allows the recovery from any pattern of erasures in the first -packet blocks for , with a delay of at most blocks counting from the first erasure. This paper addresses the problem of finding the largest for which a systematic rate code over exists, for given and . In particular, constructions for rates and are presented which provide optimum values of equal to 3 and 4, respectively. A search algorithm is also developed, which produces new codes for for field sizes . Using a complete search version of the algorithm, the maximum value of , and codes that achieve it, are determined for all code rates and every field size for (and for some rates for ).
Cite
@article{arxiv.1705.10091,
title = {Rate $(n-1)/n$ Systematic MDS Convolutional Codes over $GF(2^m)$},
author = {Ángela Barbero and Øyvind Ytrehus},
journal= {arXiv preprint arXiv:1705.10091},
year = {2017}
}