English

CaTherine wheels

Geometric Topology 2026-04-28 v1 Dynamical Systems Group Theory Probability

Abstract

A CaTherine wheel is a surjective continuous map f:S1S2f:S^1 \to S^2 such that for every closed interval IS1I\subset S^1 the image f(I)f(I) is homeomorphic to a disk, and f(I)f(\partial 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 SLEκ{\rm SLE}_\kappa for κ8\kappa \ge 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 MM is a closed hyperbolic 3-manifold and G=π1(M)G=\pi_1(M), we show that there is a canonical bijection between four kinds of structures associated to MM: 1. orbit-equivalence classes of pseudo-Anosov flows on MM without perfect fits; 2. GG-equivariant CaTherine wheels up to conjugacy; 3. minimal GG-zippers; and 4. connected components of the space of uniform quasimorphisms on GG. This generalizes and amplifies the theory of fiberings of hyperbolic 3-manifolds over the circle and the Thurston norm.

Keywords

Cite

@article{arxiv.2604.24619,
  title  = {CaTherine wheels},
  author = {Danny Calegari and Ino Loukidou},
  journal= {arXiv preprint arXiv:2604.24619},
  year   = {2026}
}

Comments

81 pages, 35 figures

R2 v1 2026-07-01T12:37:29.607Z