The Apollonian structure of Bianchi groups

Abstract

We study the orbit of R under the M\"obius action of the Bianchi group PSL2(OK) on C, where OK is the ring of integers of an imaginary quadratic field K. The orbit SK, called a Schmidt arrangement, is a geometric realisation, as an intricate circle packing, of the arithmetic of K. We give a simple geometric characterisation of certain subsets of SK generalizing Apollonian circle packings, and show that SK, considered with orientations, is a disjoint union of all primitive integral such K-Apollonian packings. These packings are described by a new class of thin groups of arithmetic interest called K-Apollonian groups. We make a conjecture on the curvatures of these packings, generalizing the local-to-global conjecture for Apollonian circle packings.