List-decoding of AG codes without genus penalty
Abstract
In this paper we consider algebraic geometry (AG) codes: a class of codes constructed from algebraic codes (equivalently, using function fields) by Goppa. These codes can be list-decoded using the famous Guruswami-Sudan (GS) list-decoder, but the genus of the used function field gives rise to negative term in the decoding radius, which we call the genus penalty. In this article, we present a GS-like list-decoding algorithm for arbitrary AG codes, which we call the \emph{inseparable GS list-decoder}. Apart from the multiplicity parameter and designed list size , common for the GS list-decoder, we introduce an inseparability exponent . Choosing this exponent to be positive gives rise to a list-decoder for which the genus penalty is reduced with a factor compared to the usual GS list-decoder. Here is the characteristic. Our list-decoder can be executed in field operations, where is the code length.
Keywords
Cite
@article{arxiv.2307.04203,
title = {List-decoding of AG codes without genus penalty},
author = {Peter Beelen and Maria Montanucci},
journal= {arXiv preprint arXiv:2307.04203},
year = {2023}
}