Основні поняття
Thurston maps with at most three singular values and four postsingular values can be characterized by the existence of weakly degenerate Levy fixed curves. The Hurwitz classes of such Thurston maps exhibit interesting properties, including the existence of infinitely many realized and obstructed maps.
Анотація
The paper develops the theory of Thurston maps that are defined everywhere on the topological sphere S^2 with a possible exception of a single essential singularity. The authors establish an analog of Thurston's celebrated characterization theorem for a broad class of such Thurston maps having four postsingular values.
Key highlights:
- The authors show that for Thurston maps with at most three singular values and four postsingular values, it is sufficient to consider Levy fixed curves to determine whether the map is realized or obstructed. Specifically, the map is realized if and only if it has no weakly degenerate Levy fixed curve.
- The authors analyze the dynamics of the corresponding pullback maps defined on the Teichmüller space, which allows them to derive various properties of Hurwitz classes of the Thurston maps in this family.
- The authors prove that if a Thurston map in this family is not totally unobstructed, then its Hurwitz class contains infinitely many pairwise combinatorially inequivalent obstructed Thurston maps. Moreover, if the map has infinite degree, then its Hurwitz class contains infinitely many pairwise combinatorially inequivalent realized Thurston maps.
- As an application, the authors show that the parameter space of a transcendental meromorphic map with at most three singular values contains infinitely many pairwise (topologically or conformally) non-conjugate postsingularly finite maps with four postsingular values.