Commuting rational functions revisited
Abstract
Let B be a rational function of degree at least two that is neither a Latt\`es map nor conjugate to z n or Tn. We provide a method for describing the set CB consisting of all rational functions commuting with B. Specifically, we define an equivalence relation B on CB such that the quotient CB/B possesses the structure of a finite group GB, and describe generators of GB in terms of the fundamental group of a special graph associated with B.
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