The π-geography problem and the Hurwitz problem
Let d ≥ 2 be an integer and a partition of d. In this article we study the problem of for which pairs of integers (a, b) there is a branched coating F: ∑ → D2 = {z ∈ C: | z | 6 ≤ 1} that has critical values, x (∑) = −b, and such that the monodromy that is obtained when crossing the border of D2 in a...
- Autores:
-
Cadavid, Carlos
Vélez-C.,Juan D.
- Tipo de recurso:
- Fecha de publicación:
- 2009
- Institución:
- Universidad EAFIT
- Repositorio:
- Repositorio EAFIT
- Idioma:
- spa
- OAI Identifier:
- oai:repository.eafit.edu.co:10784/14512
- Acceso en línea:
- http://hdl.handle.net/10784/14512
- Palabra clave:
- Branched Coating
Critical Value
Characteristic Of Euler
Riemann – Hurwitz Formula
Hurwitz Problem
Monodromia
Recubrimiento Ramificado
Valor Crítico
Característica De Euler
Fórmula De Riemann–Hurwitz
Hurwitz Problem
Monodromía
- Rights
- License
- Copyright (c) 2009 Carlos Cadavid, Juan D. Vélez-C.
| Summary: | Let d ≥ 2 be an integer and a partition of d. In this article we study the problem of for which pairs of integers (a, b) there is a branched coating F: ∑ → D2 = {z ∈ C: | z | 6 ≤ 1} that has critical values, x (∑) = −b, and such that the monodromy that is obtained when crossing the border of D2 in a positive sense belongs to the conjugation class in the symmetric group Sd determined by the π partition. Four variants of this problem are studied: i) without requiring domain connection, ii) requiring domain connection, iii) without requiring domain connection, but requiring that the coating be semi-stable, iv) requiring that the domain be related and that the coating is semi-stable. Complete solutions of the first two variants are obtained, and a partial solution of the remaining variants is obtained. It also explains how the interest in these problems arises from the study of an analogous question for functions whose domain is 4-dimensional. |
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