Decomposing Multitwists

Abstract

The Decomposition Problem in the class LIP(S2) is to decompose any bi-Lipschitz map f:S2 S2 as a composition of finitely many maps of arbitrarily small isometric distortion. In this paper, we construct a decomposition for certain bi-Lipschitz maps which spiral around every point of a Cantor set X of Assouad dimension strictly smaller than one. These maps are constructed by considering a collection of Dehn twists on the Riemann surface S2 X. The decomposition is then obtained via a bi-Lipschitz path which simultaneously unwinds these Dehn twists. As part of our construction, we also show that X ⊂ S2 is uniformly disconnected if and only if the Riemann surface S2 X has a pants decomposition whose cuffs have hyperbolic length uniformly bounded above, which may be of independent interest.