Visualising the arithmetic of imaginary quadratic fields
Abstract
We study the orbit of under the Bianchi group , where is an imaginary quadratic field. The orbit, called a Schmidt arrangement , is a geometric realisation, as an intricate circle packing, of the arithmetic of . This paper presents several examples of this phenomenon. First, we show that the curvatures of the circles are integer multiples of and describe the curvatures of tangent circles in terms of the norm form of . Second, we show that the circles themselves are in bijection with certain ideal classes in orders of , the conductor being a certain multiple of the curvature. This allows us to count circles with class numbers. Third, we show that the arrangement of circles is connected if and only if is Euclidean. These results are meant as foundational for a study of a new class of thin groups generalising Apollonian groups, in a companion paper.
Cite
@article{arxiv.1410.0417,
title = {Visualising the arithmetic of imaginary quadratic fields},
author = {Katherine E. Stange},
journal= {arXiv preprint arXiv:1410.0417},
year = {2017}
}
Comments
Correction to proof of Lemma 7.8. 22 pages, 5 figures