Additive one-rank hull codes over finite fields
Abstract
This article explores additive codes with one-rank hull, offering key insights and constructions. The article introduces a novel approach to finding one-rank hull codes over finite fields by establishing a connection between self-orthogonal elements and solutions of quadratic forms. It also provides a precise count of self-orthogonal elements for any duality over the finite field , particularly odd primes. Additionally, construction methods for small rank hull codes are introduced. The highest possible minimum distance among additive one-rank hull codes is denoted by . The value of for and with respect to any duality over any finite field is determined. Furthermore, the new quaternary one-rank hull codes are identified over non-symmetric dualities with better parameters than symmetric ones.
Cite
@article{arxiv.2310.08074,
title = {Additive one-rank hull codes over finite fields},
author = {Astha Agrawal and R. K. Sharma},
journal= {arXiv preprint arXiv:2310.08074},
year = {2024}
}