Rigidity of inversive distance circle packings revisited

Abstract

Inversive distance circle packing metric was introduced by P Bowers and K Stephenson BS as a generalization of Thurston's circle packing metric T1. They conjectured that the inversive distance circle packings are rigid. For nonnegative inversive distance, Guo Guo proved the infinitesimal rigidity and then Luo L3 proved the global rigidity. In this paper, based on an observation of Zhou Z, we prove this conjecture for inversive distance in (-1, +∞) by variational principles. We also study the global rigidity of a combinatorial curvature introduced in GJ4,GX4,GX6 with respect to the inversive distance circle packing metrics where the inversive distance is in (-1, +∞).