The Geometry of Möbius Transformations John Olsen

First Page		Document Content
Date: 2010-05-10 21:33:10 Spheres Riemann surfaces Cartographic projections Complex numbers Stereographic projection Möbius transformation Riemann sphere Inversive geometry Complex plane Geometry Mathematical analysis Projective geometry		The Geometry of Möbius Transformations John Olsen Add to Reading List Source URL: www.johno.dk Download Document from Source Website File Size: 287,12 KB Share Document on Facebook

	THE ARGAND DIAGRAM 5 minute review. Review the argand diagram (aka argand plane, aka complex plane), the modulus and argument and the polar form of a complex number as z = r(cos θ + i sin θ). Also cover the geometric DocID: 1tB8n - View Document
	Cutting-Plane Training of Structural SVMs Thorsten Joachims, Thomas Finley, and Chun-Nam John Yu Abstract Discriminative training approaches like structural SVMs have shown much promise for building highly complex and ac DocID: 1tmuJ - View Document
	Creative Blocking Faculty Advisor: Bruce Reznick∗† Project Leader: Ilkyoo Choi∗‡ IGL Scholars: Jeremy DeJournett∗‡ , Daniel Hirsbrunner∗‡ , Moon Hwan Lee∗‡ , Maxim Sigalov∗‡ May 14, 2013 DocID: 1qEDx - View Document
	COMPLEX NUMBERS AND DIFFERENTIAL EQUATIONS Based on notes courtesy of Julia Yeomans Comments and corrections to Michael Barnes OUTLINE I. COMPLEX NUMBERS DocID: 1qoq8 - View Document
	The Pendulum, Elliptic Functions and Imaginary Time Math 241 Homework John Baez The sine and cosine functions are analytic on the entire complex plane, and also periodic in one direction. It’s interesting to look for n DocID: 1pvn1 - View Document