Sobolev extensions of Lipschitz mappings into metric spaces

Abstract

Wenger and Young proved that the pair (Rm,Hn) has the Lipschitz extension property for m ≤ n where Hn is the sub-Riemannian Heisenberg group. That is, for some C>0, any L-Lipschitz map from a subset of Rm into Hn can be extended to a CL-Lipschitz mapping on Rm. In this paper, we construct Sobolev extensions of such Lipschitz mappings with no restriction on the dimension m. We prove that any Lipschitz mapping from a compact subset of Rm into Hn may be extended to a Sobolev mapping on any bounded domain containing the set. More generally, we prove this result in the case of mappings into any Lipschitz (n-1)-connected metric space.