English

Critically fixed Thurston maps: classification, recognition, and twisting

Dynamical Systems 2026-01-28 v2

Abstract

An orientation-preserving branched covering map f ⁣:S2S2f\colon S^2 \to S^2 is called a critically fixed Thurston map if ff fixes each of its critical points. It was recently shown that there is an explicit one-to-one correspondence between M\"obius conjugacy classes of critically fixed rational maps and isomorphism classes of planar embedded connected graphs. In the paper, we generalize this result to the whole family of critically fixed Thurston maps. Namely, we show that each critically fixed Thurston map ff is obtained by applying the blow-up operation, introduced by Kevin Pilgrim and Tan Lei, to a pair (G,φ)(G,\varphi), where GG is a planar embedded graph in S2S^2 without isolated vertices and φ\varphi is an orientation-preserving homeomorphism of S2S^2 that fixes each vertex of GG. This result allows us to provide a classification of combinatorial equivalence classes of critically fixed Thurston maps. We also develop an algorithm that reconstructs (up to isotopy) the pair (G,φ)(G,\varphi) associated with a critically fixed Thurston map ff. Finally, we solve some special instances of the twisting problem for the family of critically fixed Thurston maps obtained by blowing up pairs (G,idS2)(G, \mathrm{id}_{S^2}).

Keywords

Cite

@article{arxiv.2212.14759,
  title  = {Critically fixed Thurston maps: classification, recognition, and twisting},
  author = {Mikhail Hlushchanka and Nikolai Prochorov},
  journal= {arXiv preprint arXiv:2212.14759},
  year   = {2026}
}

Comments

62 pages, 18 figures, to appear in Proceeding of the LMS

R2 v1 2026-06-28T07:57:18.699Z