Ford Spheres in the Clifford-Bianchi Setting
Abstract
We define Ford Spheres P in hyperbolic n-space associated to Clifford-Bianchi groups PSL2(O) for O orders in rational Clifford algebras associated to positive definite, integral, primitive quadratic forms. For H2 and H3 these spheres correspond to the classical Ford circles and Ford spheres (these are non-maximal subsets of classical Apollonian packings). We prove the Ford spheres are integral, have disjoint interiors, and intersect tangentially when they do intersect. If we assume that O is Clifford-Euclidean then P is also connected. We also give connections to Dirichlet's Theorem and Farey fractions. In a discussion section, we pose some questions related to existing packings in the literature.
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