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