Equilateral Triangulations and The Postcritical Dynamics of Meromorphic Functions

Abstract

We show that any dynamics on any planar set S discrete in some domain D can be realized by the postcritical dynamics of a function holomorphic in D, up to a small perturbation. A key step in the proof, and a result of independent interest, is that any planar domain D can be equilaterally triangulated with triangles whose diameters →0 (at any prescribed rate) near ∂ D.