Bi-Lipschitz extension from boundaries of certain hyperbolic spaces

Abstract

Tukia and Vaisala showed that every quasi-conformal map of n extends to a quasi-conformal self-map of n+1. The restriction of the extended map to the upper half-space n × + is, in fact, bi-Lipschitz with respect to the hyperbolic metric. More generally, every homogeneous negatively curved manifold decomposes as M = N + where N is a nilpotent group with a metric on which + acts by dilations. We show that under some assumptions on N, every quasi-symmetry of N extends to a bi-Lipschitz map of M. The result applies to a wide class of manifolds M including non-compact rank one symmetric spaces and certain manifolds that do not admit co-compact group actions. Although M must be Gromov hyperbolic, its curvature need not be strictly negative.