Quasiconformality and hyperbolic skew
Complex Variables
2019-09-26 v2
Abstract
We prove that if , for , is a homeomorphism with bounded skew over all equilateral hyperbolic triangles, then is in fact quasiconformal. Conversely, we show that if is quasiconformal then is -quasisymmetric in the hyperbolic metric, where depends only on and . We obtain the same result for hyperbolic -manifolds. Analogous results in , and metric spaces that behave like , are known, but as far as we are aware, these are the first such results in the hyperbolic setting, which is the natural metric to use on .
Cite
@article{arxiv.1808.07448,
title = {Quasiconformality and hyperbolic skew},
author = {C. Ackermann and A. Fletcher},
journal= {arXiv preprint arXiv:1808.07448},
year = {2019}
}