<--- Back to Details
First PageDocument Content
Dynamical systems / Veech surface / Geometric topology / Conformal geometry / Torus / Polygon / SL2 / Computer representation of surfaces / Möbius transformation / Geometry / Surfaces / Riemann surfaces
Date: 2008-07-25 16:34:03
Dynamical systems
Veech surface
Geometric topology
Conformal geometry
Torus
Polygon
SL2
Computer representation of surfaces
Möbius transformation
Geometry
Surfaces
Riemann surfaces

Add to Reading List

Source URL: www.cmi.univ-mrs.fr

Download Document from Source Website

File Size: 269,94 KB

Share Document on Facebook

Similar Documents

COMPUTING REAL WEYL GROUPS DAVID A. VOGAN, JR. Let G be a complex connected reductive algebraic group defined over R. Let H denote a maximal algebraic torus in G. Write G for the real points of G and H for the real point

DocID: 1vnjS - View Document

JT-60SA Newsletter No.11, 30 November 2010 Virtual tour of rendering JT-60SA Movie 1 Flythrough of Torus Hall

DocID: 1v4Sx - View Document

TORUS ACTIONS AND TENSOR PRODUCTS OF INTERSECTION COHOMOLOGY ASILATA BAPAT ABSTRACT. Given certain intersection cohomology sheaves on a projective variety with a torus action, we relate the cohomology groups of their ten

DocID: 1uI7F - View Document

Outline Torus embeddings Hilbert modular varieties and their boundary components

DocID: 1urhF - View Document

Press: p: to change the print format (PS, EPS, PDF, ...) s: to save the images t: to alternate between teapot and torus v: to alternate between single and multiple viewport modes b: to change the blending mode (transpare

DocID: 1u9zU - View Document