Rigidity of infinite disk patterns
成果类型:
Article
署名作者:
He, ZX
刊物名称:
ANNALS OF MATHEMATICS
ISSN/ISSBN:
0003-486X
DOI:
10.2307/121018
发表日期:
1999
页码:
1-33
关键词:
circle packings
lemma
uniformization
CONVERGENCE
THEOREM
摘要:
Let P be a locally finite disk pattern on the complex plane C whose combinatorics are described by the one-skeleton G of a triangulation of the open topological disk and whose dihedral angles are equal to a function Theta E --> [0, pi/2] on the set of edges. Let P* be a combinatorially equivalent disk pattern on the plane with the same dihedral angle function. We show that P and P* differ only by a euclidean similarity. In particular, when the dihedral angle function Theta is identically zero, this yields the rigidity theorems of B. Rodin and D. Sullivan, and of O. Schramm, whose arguments rely essentially on the pairwise disjointness of the interiors of the disks. The approach here is analytical, and uses the maximum principle, the concept of vertex extremal length, and the recurrency of a family of electrical networks obtained by placing resistors on the edges in the contact graph of the pattern. A similar rigidity property holds for locally finite disk patterns in the hyperbolic plane, where the proof follows by a simple use of the maximum principle. Also, we have a uniformization result for disk patterns. In a future paper, the techniques of this paper will be extended to the case when 0 less than or equal to Theta < pi. In particular, we will show a rigidity property for a class of infinite convex polyhedra in the 3-dimensional hyperbolic space.