Open AccessLowest uniformizations of compact Klein surfaces
Author(s) -
Rubén A. Hidalgo
Publication year - 2013
Publication title -
revista matemática iberoamericana
Language(s) - English
Resource type - Journals
SCImago Journal Rank - 1.569
H-Index - 52
eISSN - 2235-0616
pISSN - 0213-2230
DOI - 10.4171/rmi/724
Subject(s) - schottky diode , riemann surface , discontinuity (linguistics) , group (periodic table) , mathematics , surface (topology) , compact riemann surface , simple (philosophy) , pure mathematics , mathematical analysis , physics , geometry , quantum mechanics , philosophy , epistemology , diode
A Schottky group is a purely loxodromic Kleinian group, with non-empty region of discontinuity, isomorphic to a free group of finite rank. An extended Schottky group is an extended Kleinian group whose orientation-preserving half is a Schottky group. The collection of uniformizations of either a closed Riemann surface or a compact Klein surface is partially ordered. In the case of closed Riemann surfaces, the lowest uniformizations are provided by Schottky groups. In this paper we provide simple arguments to see that the lowest uniformizations of compact Klein surfaces are exactly those produced by extended Schottky groups.
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