CaTherine wheels

Abstract

A CaTherine wheel is a surjective continuous map f:S1 S2 such that for every closed interval I⊂ S1 the image f(I) is homeomorphic to a disk, and f(∂ I) is contained in the boundary of this disk. CaTherine wheels arise in many areas of low-dimensional geometry and topology, including conformal dynamics (expanding Thurston maps, expanding origamis), probability theory (whole plane SLE for 8, LQG metric trees) and elsewhere. We develop their theory in generality, and explain how CaTherine wheels and their associated structures can serve as a dictionary between these various fields. Our most substantial applications are to the theory of hyperbolic 3-manifolds. If M is a closed hyperbolic 3-manifold and G=π1(M), we show that there is a canonical bijection between four kinds of structures associated to M: 1. orbit-equivalence classes of pseudo-Anosov flows on M without perfect fits; 2. G-equivariant CaTherine wheels up to conjugacy; 3. minimal G-zippers; and 4. connected components of the space of uniform quasimorphisms on G. This generalizes and amplifies the theory of fiberings of hyperbolic 3-manifolds over the circle and the Thurston norm.