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Date: 2006-12-03 02:10:20 Riemann sphere Spheres Complex number Stereographic projection Möbius transformation Golden ratio Julia set Golden ratio base Geometry Projective geometry Riemann surfaces		Add to Reading List Source URL: www.math.nsysu.edu.tw Download Document from Source Website File Size: 320,85 KB Share Document on Facebook

	Can you turn a polynomial equation into a three-dimensional shape? The shape in purple is a polygonal approximation of the filled Julia set of the polynomial equation f(x)=x2+¼. The shape in blue is the “cap” that, DocID: 1tul2 - View Document
	COMPLEX NUMBERS AND DIFFERENTIAL EQUATIONS PROBLEM SET 2 Problems and solutions courtesy Julia Yeomans Comments and corrections to Michael Barnes 1. Explain carefully: DocID: 1sfhL - View Document
	COMPLEX NUMBERS AND DIFFERENTIAL EQUATIONS PROBLEM SET 1 Problems and solutions courtesy Julia Yeomans Comments and corrections to Michael Barnes 1. Change to polar form DocID: 1rKwK - View Document
	V-Measure: A conditional entropy-based external cluster evaluation measure Andrew Rosenberg and Julia Hirschberg Department of Computer Science Columbia University New York, NY 10027 DocID: 1rtvl - View Document
	AMOEBAS OF GENUS AT MOST ONE THORSTEN THEOBALD AND TIMO DE WOLFF Abstract. The amoeba of a Laurent polynomial f ∈ C[z1±1 , . . . , zn±1 ] is the image of its zero set V(f ) under the log-absolute-value map. Understan DocID: 1q0f7 - View Document