Quasiconformal homeomorphisms and the convex hull boundary
成果类型:
Article
署名作者:
Epstein, DBA; Marden, A; Markovic, V
刊物名称:
ANNALS OF MATHEMATICS
ISSN/ISSBN:
0003-486X
DOI:
10.4007/annals.2004.159.305
发表日期:
2004
页码:
305-336
关键词:
holomorphic motions
core
MAPS
摘要:
We investigate the relationship between an open simply-connected region Omega subset of S-2 and the boundary Y of the hyperbolic convex hull in H-3 of S-2 \ Omega. A counterexample is given to Thurston's conjecture that these spaces are related by a 2-quasiconformal homeomorphism which extends to the identity map on their common boundary, in the case when the homeomorphism is required to respect any group of Mobius transformations which preserves Q. We show that the best possible universal lipschitz constant for the nearest point retraction r : Omega --> Y is 2. We find explicit universal constants 0 < c(2) < c(1), such that no pleating map which bends more than cl in some interval of unit length is an embedding, and such that any pleating map which bends less than c(2) in each interval of unit length is embedded. We show that every K-quasiconformal homeomorphism D-2 --> D-2 is a (K, a(K))-quasi-isometry, where a(K) is an explicitly computed function. The multiplicative constant is best possible and the additive constant a(K) is best possible for some values of K.