Weakly quasisymmetric maps and uniform spaces

Abstract

Suppose that X and Y are quasiconvex and complete metric spaces, that G⊂ X and G'⊂ Y are domains, and that f: G G' is a homeomorphism. In this paper, we first give some basic properties of short arcs, and then we show that: if f is a weakly quasisymmetric mapping and G' is a quasiconvex domain, then the image f(D) of every uniform subdomain D in G is uniform. As an application, we get that if f is a weakly quasisymmetric mapping and G' is an uniform domain, then the images of the short arcs in G under f are uniform arcs in the sense of diameter.