Identifying contact graphs of sphere packings with generic radii

Abstract

Ozkan et al. conjectured that any packing of n spheres with generic radii will be stress-free, and hence will have at most 3n-6 contacts. In this paper we prove that this conjecture is true for any sphere packing with contact graph of the form G K2, i.e., the graph formed by connecting every vertex in a graph G to every vertex in the complete graph with two vertices. We also prove the converse of the conjecture holds in this special case: specifically, a graph G K2 is the contact graph of a generic radii sphere packing if and only if G is a penny graph with no cycles.