Teichm\"uller's problem for Gromov hyperbolic domains

Abstract

Let TK(D) be the class of K-quasiconformal automorphisms of a domain D⊂neq Rn with identity boundary values. Teichm\"uller's problem is to determine how far a given point x∈ D can be mapped under a mapping f∈ TK(D). We estimate this distance between x and f(x) from the above by using two different metrics, the distance ratio metric and the quasihyperbolic metric. We study Teichm\"uller's problem for Gromov hyperbolic domains in Rn with identity values at the boundary of infinity. As applications, we obtain results on Teichm\"uller's problem for -uniform domains and inner uniform domains in Rn.