English

On Dynamical Gaskets Generated by Rational Maps, Kleinian Groups, and Schwarz Reflections

Dynamical Systems 2023-02-07 v2

Abstract

According to the Circle Packing Theorem, any triangulation of the Riemann sphere can be realized as a nerve of a circle packing. Reflections in the dual circles generate a Kleinian group HH whose limit set is an Apollonian-like gasket ΛH\Lambda_H. We design a surgery that relates HH to a rational map gg whose Julia set Jg\mathcal{J}_g is (non-quasiconformally) homeomorphic to ΛH\Lambda_H. We show for a large class of triangulations, however, the groups of quasisymmetries of ΛH\Lambda_H and Jg\mathcal{J}_g are isomorphic and coincide with the corresponding groups of self-homeomorphisms. Moreover, in the case of HH, this group is equal to the group of M\"obius symmetries of ΛH\Lambda_H, which is the semi-direct product of HH itself and the group of M\"obius symmetries of the underlying circle packing. In the case of the tetrahedral triangulation (when ΛH\Lambda_ H is the classical Apollonian gasket), we give a piecewise affine model for the above actions which is quasiconformally equivalent to gg and produces HH by a David surgery. We also construct a mating between the group and the map coexisting in the same dynamical plane and show that it can be generated by Schwarz reflections in the deltoid and the inscribed circle.

Keywords

Cite

@article{arxiv.1912.13438,
  title  = {On Dynamical Gaskets Generated by Rational Maps, Kleinian Groups, and Schwarz Reflections},
  author = {Russell Lodge and Mikhail Lyubich and Sergei Merenkov and Sabyasachi Mukherjee},
  journal= {arXiv preprint arXiv:1912.13438},
  year   = {2023}
}

Comments

54 pages, 14 figures, final accepted version

R2 v1 2026-06-23T13:00:04.554Z