English

The $\theta$-adics

Number Theory 2025-10-03 v1

Abstract

This paper introduces an archimedean, locally Cantor multi-field Oθ\mathcal{O}_{\theta} which gives an analog of the pp-adic number field at a place at infinity of a real quadratic extension KK of Q\mathbb{Q}. This analog is defined using a unit 1<θOK×1<\theta\in \mathcal{O}_{K}^{\times}, which plays the same role as the prime pp does in Zp\mathbb{Z}_{p}; the elements of Oθ\mathcal{O}_{\theta} are then greedy Laurent series in the base θ\theta. There is a canonical inclusion of the integers OK\mathcal{O}_{K} with dense image in Oθ\mathcal{O}_{\theta} and the operations of sum and product extend to multi-valued operations having at most three values, making Oθ\mathcal{O}_{\theta} a multi-field in the sense of Marty. We show that the (geometric) completions of 1-dimensional quasicrystals contained in OK\mathcal{O}_{K} map canonically to Oθ\mathcal{O}_{\theta}. The motivation for this work arises in part from a desire to obtain a more arithmetic treatment of a place at infinity by replacing R\mathbb{R} with Oθ\mathcal{O}_{\theta}, with an eye toward obtaining a finer version of class field theory incorporating the ideal arithmetic of quasicrystal rings.

Keywords

Cite

@article{arxiv.2510.01422,
  title  = {The $\theta$-adics},
  author = {T. M. Gendron and A. Zenteno},
  journal= {arXiv preprint arXiv:2510.01422},
  year   = {2025}
}

Comments

65 pages

R2 v1 2026-07-01T06:11:52.578Z