Multiple-Rate Channel Codes in $\texttt{GF}(p^{n^{2}})$
Abstract
A code defined over is conventionally designed to encode a -symbol user data into a codeword of length , resulting in a fixed-rate coding. This paper proposes a coding procedure to derive a multiple-rate code from existing channel codes defined over a composite field . Formally, by viewing a symbol of as an -tuple over the base field , the proposed coding scheme employs children codes defined over to encode user messages of arbitrary lengths and incorporates a variable-rate feature. In sequel, unlike the conventional block codes of length , the derived multiple-rate code of fixed blocklength (over ) can be used to encode and decode user messages (over ) of arbitrary lengths , thereby supporting a range of information rates - inclusive of the code rates , in addition to the existing code rate . The proposed multiple-rate coding scheme is also equipped with a decoding strategy, wherein the identification of children encoded user messages of variable length are carried out through a simple procedure using {\it orthogonal projectors}.
Cite
@article{arxiv.1909.11296,
title = {Multiple-Rate Channel Codes in $\texttt{GF}(p^{n^{2}})$},
author = {R. S. Raja Durai and Ashwini Kumar},
journal= {arXiv preprint arXiv:1909.11296},
year = {2025}
}
Comments
This paper is withdrawn by the author due to ongoing revision