Introduction to Origamis in Teichmüller Space Frank Herrlich
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Introduction to Origamis in Teichmüller Space Frank Herrlich
An origami determines a Riemann surface and even a surface with a translation structure. Page 2. 2. Frank Herrlich. • The translation structure can be |
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P-adic Origamis
Contemporary Mathematics p-adic Origamis. Frank Herrlich. Abstract. An origami is a finite covering of a torus which is ramified over only one point. |
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Teichmüller curves defined by characteristic origamis
Teichmüller curves defined by characteristic origamis. Frank Herrlich. Abstract. We study translation surfaces with Veech group SL2(Z). They all. |
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Dessins denfants and Origami curves Frank Herrlich and Gabriela
Keywords: Dessins d'enfants action of the absolute Galois group |
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On the Equation of an Origami of Genus two with two Cusps
10 avr. 2007 II.7 The Moduli Space and the Teichmüller Space . ... tions of my two supervisors Gabi Schmithüsen and Frank Herrlich as well. |
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Schottky space and Teichmüller disks
embedded complex unit disk (or upper half plane) in Teichmüller space. They naturally [H] F. Herrlich: Introduction to origamis in Teichmüller space. |
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An extraordinary origami curve
Frank Herrlich ? Gabriela Schmithüsen † of the upper half plane into the Teichmüller space Tg |
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Examples for Veech groups of origamis 1 Introduction 2 Veech
space Mg (g ? 2) there is a Teichmüller curve defined by an origami that is Acknowledgements: I would like to thank Frank Herrlich my supervisor |
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Origamis and permutation groups
5 déc. 2011 I am grateful to Frank Herrlich and Pascal Hubert for accepting to be ... workshop Dynamics in the Teichmüller space Roscoff |
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On the boundary of Teichmüller disks in Teichmüller and in Schottky
Frank Herrlich ? Gabriela Schmithüsen † We give an overview how the boundaries of Schottky space |
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Introduction to Origamis in Teichmüller Space Frank Herrlich
Introduction to Origamis in Teichmüller Space Frank Herrlich Institut für Algebra und Geometrie Karlsruhe Institue of Technology (KIT) |
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Introduction to origamis in Teichmüller space - EMS Press
18 jan 2012 · Frank Herrlich Karlsruhe Institute of Technology Germany Introduction to origamis in Teichmüller space cover Download Chapter PDF |
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Introduction to origamis in Teichmüller space - Semantic Scholar
18 jan 2012 · Introduction to origamis in Teichmüller space Contemporary Mathematics p-adic Origamis Frank Herrlich PDF Add to Library |
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The Galois action on M-Origamis and their Teichmüller curves - arXiv
[HS07a] Frank Herrlich and Gabriela Schmithüsen “A comb of origami curves in the moduli space M3 with three dimensional closure” In: Geom Dedicata 124 (2007) |
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An extraordinary origami curve - arXiv
8 sept 2005 · Frank Herrlich ? Gabriela Schmithüsen † of the upper half plane into the Teichmüller space Tgn (where g is the genus of X and |
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Schottky space and Teichmüller disks - http:/ /wwwitscaltechedu
Herrlich: Introduction to origamis in Teichmüller space Strasbourg Master Class on Geometry (ed A Papadopoulos) EMS 2012 pp 233 253 [HS] F |
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Origamis et groupes de permutation
I am grateful to Frank Herrlich and Pascal Hubert for accepting to be the talk at the workshop Dynamics in the Teichmüller space Roscoff France June |
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On the boundary of Teichmüller disks in Teichmüller and in Schottky
27 fév 2023 · We give an overview how the boundaries of Schottky space Teichmüller space and moduli space match together and how the actions of the |
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Strasbourg Master Class on Geometry [electronic resource] in
Digital: text file; PDF; Imprint: Zuerich Switzerland : European Mathematical Society Introduction to origamis in Teichmüller space / Frank Herrlich |
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Introduction to Origamis in Teichmüller Space Frank Herrlich
The image of the embedded upper half plane in the moduli space of Riemann surfaces is an affine algebraic curve, possibly with singularities; it is called the |
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Teichmüller curves defined by characteristic origamis
Frank Herrlich Abstract We study Introduction An origami is a Teichmüller curves, origamis, Veech groups, characteristic subgroups to an algebraic curve C(O) in the moduli space Mg of curves of genus g, called the origami curve |
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Dessins denfants and Origami curves Frank Herrlich and Gabriela
The study of dessins d'enfants leads to the Grothendieck-Teichmüller group in Section 5 gives an introduction to origamis and explains how they define curves in the moduli space Mg of smooth algebraic curves of genus g We call them |
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Monodromy Representations and Lyapunov Exponents of Origamis
In Chapter 2 we give an overview of the basic concepts lation surfaces, Teichmüller curves, moduli spaces, and origamis This Dr Frank Herrlich and Prof |
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An Algorithm for Finding the Veech Group of an Origami
We study the Veech group of an origami, i e , of a translation surface, tessellated by Teichmüller space Tg,n, where g is the genus of S This construction is 1For a more detailled overview see e g , [Leli`evre 02] by Frank Herrlich ) Hence |
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SHIMURA- AND TEICHM¨ULLER CURVES Introduction A
A Teichmüller curve is an algebraic curve C → Mg in the moduli space of curves, which is the image of The author thanks Frank Herrlich, Gabi Schmitthüsen and Eckart Viehweg for many They are called square-tiled coverings or origamis |
