Multi-twisted codes over finite fields and their dual codes
Abstract
Let denote the finite field of order let be positive integers satisfying for and let Let be fixed, where are non-zero elements of In this paper, we study the algebraic structure of -multi-twisted codes of length over and their dual codes with respect to the standard inner product on We provide necessary and sufficient conditions for the existence of a self-dual -multi-twisted code of length over and obtain enumeration formulae for all self-dual and self-orthogonal -multi-twisted codes of length over We also derive some sufficient conditions under which a -multi-twisted code is LCD. We determine the parity-check polynomial of all -multi-twisted codes of length over and obtain a BCH type bound on their minimum Hamming distances. We also determine generating sets of dual codes of some -multi-twisted codes of length over from the generating sets of the codes. Besides this, we provide a trace description for all -multi-twisted codes of length over by viewing these codes as direct sums of certain concatenated codes, which leads to a method to construct these codes. We also obtain a lower bound on their minimum Hamming distances using their multilevel concatenated structure.
Cite
@article{arxiv.1707.05039,
title = {Multi-twisted codes over finite fields and their dual codes},
author = {Anuradha Sharma and Varsha Chauhan and Harshdeep Singh},
journal= {arXiv preprint arXiv:1707.05039},
year = {2017}
}