Simplest cubic fields with small class number
Number Theory
2026-04-07 v2
Abstract
Let be an integer and be the simplest cubic field with class number and conductor where is a root of . Let be the ring of integers of . By using PARI/GP, we confirm that if resp. , , i.e. resp. , , then there exist exactly (resp. , ) integers such that . We also show that if , then holds for integers . More precisely, there exist resp. , , , , , integers with such that resp. , , , , , which are given explicitly.
Keywords
Cite
@article{arxiv.2603.18802,
title = {Simplest cubic fields with small class number},
author = {Akinari Hoshi and Hiroaki Iida},
journal= {arXiv preprint arXiv:2603.18802},
year = {2026}
}
Comments
23 pages. We would like to thank Stephane Louboutin for helpful explanations concerning Theorem 1.8 which improved the proof of Theorem 1.13. For Theorem 1.14, the result is also improved as integers m up to 10^7 instead of 4x10^6. Only one additional case was found as in Table 3