Quasi-self-similar fractals containing "Y" have dimension larger than one

Abstract

Suppose X is a compact connected metric space and f: X X is a metric coarse expanding conformal map in the sense of Ha\"issinsky-Pilgrim. We show that if X contains a homeomorphic copy of the letter "Y", then the Hausdorff dimension of X is greater than one. As an application, we show that for a semi-hyperbolic rational map f its Julia set Jf is quasi-symmetric equivalent to a space having Hausdorff dimension 1 if and only if Jf is homeomorphic to a circle or a closed interval.