Injectivity Radius Bounds in Hyperbolic Convex Cores I
摘要
A version of a conjecture of McMullen is as follows: Given a hyperbolizable 3-manifold M with incompressible boundary, there exists a uniform constant K such that if N is a hyperbolic 3-manifold homeomorphic to the interior of M, then the injectivity radius based at points in the convex core of N is bounded above by K. This conjecture suggests that convex cores are uniformly congested. In previous work, the author has proven the conjecture for -bundles over a closed surface, taking into account the possibility of cusps. In this paper, we establish the conjecture in the case that M is a book of I-bundles or an acylindrical, hyperbolizable 3-manifold. In particular, we show that if M is a book of I-bundles, then the bound on injectivity radius depends on the number of generators in the fundamental group of M.
引用
@article{arxiv.math/9907058,
title = {Injectivity Radius Bounds in Hyperbolic Convex Cores I},
author = {Carol E. Fan},
journal= {arXiv preprint arXiv:math/9907058},
year = {2007}
}
备注
23 pages, 1 figure