Monogenic Cyclic Cubic Trinomials
Number Theory
2024-12-18 v1
Abstract
A series of recent articles has shown that there exist only three monogenic cyclic quartic trinomials in , and they are all of the form . In this article, we conduct an analogous investigation for cubic trinomials in . Two irreducible cyclic cubic trinomials are said to be equivalent if their splitting fields are equal. We show that there exist two infinite families of non-equivalent monogenic cyclic cubic trinomials of the form . We also show that there exist exactly four monogenic cyclic cubic trinomials of the form , all of which are equivalent to .
Cite
@article{arxiv.2412.13075,
title = {Monogenic Cyclic Cubic Trinomials},
author = {Lenny Jones},
journal= {arXiv preprint arXiv:2412.13075},
year = {2024}
}