English

Dynamics of Modular Matings

Dynamical Systems 2022-11-14 v3

Abstract

We develop dynamical theory for the family of holomorphic correspondences Fa\mathcal{F}_a proved by the current authors to be matings between the modular group and parabolic rational maps in the Milnor slice Per1(1)Per_1(1) (in 'Mating quadratic maps with the modular group II'). Such a mating endows the complement of the limit set of Fa\mathcal{F}_a with the geometry of the hyperbolic plane, equipped with the action of the modular group. We introduce bi-infinite coding sequences for geodesics in this complement, utilising continued fraction expressions of end points; we prove landing theorems for periodic and preperiodic geodesics, and we establish a stronger Yoccoz inequality for repelling fixed points of these correspondences than Yoccoz's classical inequality for quadratic polynomials. We deduce that the connectedness locus of the family Fa\mathcal{F}_a is contained in a particular lune in parameter space.

Keywords

Cite

@article{arxiv.1707.04764,
  title  = {Dynamics of Modular Matings},
  author = {Shaun Bullett and Luna Lomonaco},
  journal= {arXiv preprint arXiv:1707.04764},
  year   = {2022}
}

Comments

addition of material to the Introduction clarifying background and methods

R2 v1 2026-06-22T20:47:56.716Z