Bi-Lipschitz parts of quasisymmetric mappings

Abstract

A natural quantity that measures how well a map f:Rd→ RD is approximated by an affine transformation is \[ωf(x,r)=∈fA(1|B(x,r)|∫B(x,r)(|f-A||A'|r)2)12,\] where the infimum ranges over all non constant affine transformations. This is natural insofar as it is invariant under rescaling f in either its domain or image. We show that if f:Rd→ RD is quasisymmetric and its image has a sufficient amount of rectifiable structure (although not necessarily Hd-finite), then ωf(x,r)2dxdrr is a Carleson measure on Rd×(0,∞). Moreover, this is an equivalence: the existence of such a Carleson measure implies that, in every ball B(x,r)⊂eq Rd, there is a set E occupying 90% of B(x,r), say, upon which f is bi-Lipschitz (and hence guaranteeing rectifiable pieces in the image). En route, we make a minor adjustment to a theorem of Semmes to show that quasisymmetric maps of subsets of Rd into Rd are bi-Lipschitz on a large subset quantitatively.