A closer look at some cyclic semifields
Abstract
We show that different choices of generators of the Galois group of produce non-isomorphic cyclic semifields when : there are thus non-isomorphic classes of Sandler semifields , one class for each generator involved in their construction, where is the Euler function. We prove that when , two Sandler semifields constructed from different generators and of are not isotopic. Hence when there are non-isotopic classes of these semifields, each class belonging to one choice of generator. We then present a full parametrization of the non-isomorphic Sandler semifields , when is prime and contains a primitive th root of unity. Since for , two Sandler semifields constructed from the same generator are isotopic if and only if they are isomorphic, this parametrizes these Sandler semifields up to isotopy, and thus parametrizes both the corresponding non-Desarguesian projective planes, and maximum rank distance codes. Most of our results are proved in all generality for any cyclic Galois field extension.
Cite
@article{arxiv.2502.00770,
title = {A closer look at some cyclic semifields},
author = {Susanne Pumpluen},
journal= {arXiv preprint arXiv:2502.00770},
year = {2025}
}
Comments
New version has extended last section