The Apollonian staircase

Abstract

A circle of curvature n∈Z+ is a part of finitely many primitive integral Apollonian circle packings. Each such packing has a circle of minimal curvature -c≤ 0, and we study the distribution of c/n across all primitive integral packings containing a circle of curvature n. As n→∞, 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 C of curvature n, then the probability that C is tangent to the outermost circle tends towards 3/π. These results are found by using positive semidefinite quadratic forms to make P1(C) a parameter space for (not necessarily integral) circle packings. Finally, we examine an aspect of the integral theory known as spikes. When n is prime, the distribution of c/n is extremely smooth, whereas when n is composite, there are certain spikes that correspond to prime divisors of n that are at most n.