Quasiconformal maps with bilipschitz or identity boundary values in Banach spaces

Abstract

Suppose that E and E' denote real Banach spaces with dimension at least 2 and that D E and D' E' are uniform domains with homogeneously dense boundaries. We consider the class of all -FQC (freely -quasiconformal) maps of D onto D' with bilipschitz boundary values. We show that the maps of this class are η-quasisymmetric. As an application, we show that if D is bounded, then maps of this class satisfy a two sided H\"older condition. Moreover, replacing the class -FQC by the smaller class of M-QH maps, we show that M-QH maps with bilipschitz boundary values are bilipschitz. Finally, we show that if f is a -FQC map which maps D onto itself with identity boundary values, then there is a constant C\,, depending only on the function \,, such that for all x∈ D, the quasihyperbolic distance satisfies kD(x,f(x))≤ C.