English

On the negative Pell equation

Number Theory 2022-11-14 v1

Abstract

Using a recent breakthrough of Smith, we improve the results of Fouvry and Kl\"uners on the solubility of the negative Pell equation. Let D\mathcal{D} denote the set of fundamental discriminants having no prime factors congruent to 33 modulo 44. Stevenhagen conjectured that the density of DD in D\mathcal{D} such that the negative Pell equation x2Dy2=1x^2-Dy^2=-1 is solvable with x,yZx,y\in\mathbb{Z} is 58.1%58.1\%, to the nearest tenth of a percent. By studying the distribution of the 88-rank of narrow class groups CL+(D)\mathrm{CL}^+(D) of Q(D)\mathbb{Q}(\sqrt{D}), we prove that the infimum of this density is at least 53.8%53.8\%.

Keywords

Cite

@article{arxiv.1908.01752,
  title  = {On the negative Pell equation},
  author = {Stephanie Chan and Peter Koymans and Djordjo Milovic and Carlo Pagano},
  journal= {arXiv preprint arXiv:1908.01752},
  year   = {2022}
}
R2 v1 2026-06-23T10:40:02.791Z