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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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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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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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
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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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
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An origami determines a Riemann surface and even a surface with a translation structure. Page 2. 2. Frank Herrlich. • The translation structure can be
Contemporary Mathematics p-adic Origamis. Frank Herrlich. Abstract. An origami is a finite covering of a torus which is ramified over only one point.
Teichmüller curves defined by characteristic origamis. Frank Herrlich. Abstract. We study translation surfaces with Veech group SL2(Z). They all.
Keywords: Dessins d'enfants action of the absolute Galois group
10 avr. 2007 II.7 The Moduli Space and the Teichmüller Space . ... tions of my two supervisors Gabi Schmithüsen and Frank Herrlich as well.
embedded complex unit disk (or upper half plane) in Teichmüller space. They naturally [H] F. Herrlich: Introduction to origamis in Teichmüller space.
Frank Herrlich ? Gabriela Schmithüsen † of the upper half plane into the Teichmüller space Tg
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
5 déc. 2011 I am grateful to Frank Herrlich and Pascal Hubert for accepting to be ... workshop Dynamics in the Teichmüller space Roscoff
Frank Herrlich ? Gabriela Schmithüsen † We give an overview how the boundaries of Schottky space
Introduction to Origamis in Teichmüller Space Frank Herrlich Institut für Algebra und Geometrie Karlsruhe Institue of Technology (KIT)
18 jan 2012 · Frank Herrlich Karlsruhe Institute of Technology Germany Introduction to origamis in Teichmüller space cover Download Chapter PDF
18 jan 2012 · Introduction to origamis in Teichmüller space Contemporary Mathematics p-adic Origamis Frank Herrlich PDF Add to Library
[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)
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
Herrlich: Introduction to origamis in Teichmüller space Strasbourg Master Class on Geometry (ed A Papadopoulos) EMS 2012 pp 233 253 [HS] F
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
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
Digital: text file; PDF; Imprint: Zuerich Switzerland : European Mathematical Society Introduction to origamis in Teichmüller space / Frank Herrlich
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