Linear codes arising from the point-hyperplane geometry -- Part II: the twisted embedding
Abstract
Let be the point-hyperplane geometry of a projective space where is a -dimensional vector space over a finite field of order Suppose that is an automorphism of and consider the projective embedding of into the projective space mapping the point to the projective point represented by the pure tensor , with In [I. Cardinali, L. Giuzzi, Linear codes arising from the point-hyperplane geometry -- part I: the Segre embedding (Jun. 2025). arXiv:2506.21309, doi:10.48550/ARXIV.2506.21309] we focused on the case and we studied the projective code arising from the projective system Here we focus on the case and we investigate the linear code arising from the projective system In particular, after having verified that is a minimal code, we determine its parameters, its minimum distance as well as its automorphism group. We also give a (geometrical) characterization of its minimum and second lowest weight codewords and determine its maximum weight when and are both odd.
Keywords
Cite
@article{arxiv.2507.16694,
title = {Linear codes arising from the point-hyperplane geometry -- Part II: the twisted embedding},
author = {Ilaria Cardinali and Luca Giuzzi},
journal= {arXiv preprint arXiv:2507.16694},
year = {2026}
}
Comments
28 pages