Rigidity of Circle Polyhedra in the 2-Sphere and of Hyperideal Polyhedra in Hyperbolic 3-Space
Abstract
We generalize Cauchy's celebrated theorem on the global rigidity of convex polyhedra in Euclidean 3-space E3 to the context of circle polyhedra in the 2-sphere S2. We prove that any two convex and proper non-unitary c-polyhedra with M\"obius-congruent faces that are consistently oriented are M\"obius-congruent. Our result implies the global rigidity of convex inversive distance circle packings in the Riemann sphere as well as that of certain hyperideal hyperbolic polyhedra in H3.
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