Thurston maps and asymptotic upper curvature

Abstract

A Thurston map is a branched covering map from 2 to 2 with a finite postcritical set. We associate a natural Gromov hyperbolic graph =(f, C) with an expanding Thurston map f and a Jordan curve C on 2 containing (f). The boundary at infinity of with associated visual metrics can be identified with 2 equipped with the visual metric induced by the expanding Thurston map f. We define asymptotic upper curvature of an expanding Thurston map f to be the asymptotic upper curvature of the associated Gromov hyperbolic graph, and establish a connection between the asymptotic upper curvature of f and the entropy of f.