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Date: 2009-08-18 10:59:55 Topology Topological spaces Curves Sierpinski triangle Sierpinski carpet Cantor set Function Mandelbrot set Fractals Mathematics Mathematical analysis		Add to Reading List Source URL: scimath.unl.edu Download Document from Source Website File Size: 318,82 KB Share Document on Facebook

	Nicholas A Scoville* (), Ursinus College, Math and CS, 601 E. Main Street, Collegeville, PAThe Cantor set before Cantor. Preliminary report. The Cantor set is the quintessential DocID: 1toZN - View Document
	Sufficient Conditions For A Group Of Homeomorphisms Of The Cantor Set To Be 2-Generated C. Bleak J. Hyde DocID: 1sccB - View Document
	Research Statement: Casey Donoven The Cantor space is the set of all infinite sequences over a finite alaphabet X, which is a both a topological and metric space. My research to date has focused on studying structures re DocID: 1puEv - View Document
	About a big mapping class group Juliette Bavard Universit´e Paris 6, France Abstract: The mapping class group of the complement of a Cantor set in the plane arises naturally in dynamics. More precisely, the study of thi DocID: 1pgvv - View Document
	CANTOR AND THE BURALI-FORTI PARADOX Introduction In studying the early history of mathematical logic and set theory one typically reads that Georg Cantor discovered the so-called Burali-Forti (BF) paradox sometime in 18 DocID: 1l4gH - View Document