The Apollonian staircase
Abstract
A circle of curvature is a part of finitely many primitive integral Apollonian circle packings. Each such packing has a circle of minimal curvature , and we study the distribution of across all primitive integral packings containing a circle of curvature . As , the distribution is shown to tend towards a picture we name the Apollonian staircase. A consequence of the staircase is that if we choose a random circle packing containing a circle of curvature , then the probability that is tangent to the outermost circle tends towards . These results are found by using positive semidefinite quadratic forms to make a parameter space for (not necessarily integral) circle packings. Finally, we examine an aspect of the integral theory known as spikes. When is prime, the distribution of is extremely smooth, whereas when is composite, there are certain spikes that correspond to prime divisors of that are at most .
Cite
@article{arxiv.2203.08311,
title = {The Apollonian staircase},
author = {James Rickards},
journal= {arXiv preprint arXiv:2203.08311},
year = {2025}
}
Comments
25 pages, 12 figures, 1 table. v2: Minor revisions in accordance with referee feedback. Accepted to IMRN