HAUSDORFF DIMENSION OF METRIC SPACES AND LIPSCHITZ MAPS ONTO CUBES ´ KELETI, ANDRAS ´ MATH ´ ´ AND ONDREJ

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Date: 2012-03-09 12:05:47 Metric geometry Lipschitz continuity Hausdorff dimension Metric space Hausdorff measure Separable space Doubling space Continuous function Topological manifold Complete metric space Borel measure Compact space		HAUSDORFF DIMENSION OF METRIC SPACES AND LIPSCHITZ MAPS ONTO CUBES ´ KELETI, ANDRAS ´ MATH ´ ´ AND ONDREJ Add to Reading List Source URL: homepages.warwick.ac.uk Download Document from Source Website File Size: 305,02 KB Share Document on Facebook

	Fractal Working Group 1 Coordinators: Gerald Edgar, Larry Lindsay Notes LaTeX-ed in real-time by Steven Miller Participants: Bruce Adcock, Youri Dimitrov, Gerald Edgar, Dean Eiger, Charles Estill, Larry Lindsay, Steven M DocID: 1q1gs - View Document
	Covering the real line with translates of a zero dimensional compact set Andr´as M´ath´e∗ Abstract We construct a compact set C of Hausdorff dimension zero so that cof (N ) many translates of C cover the real line. DocID: 1pPxL - View Document
	HAUSDORFF DIMENSION OF METRIC SPACES AND LIPSCHITZ MAPS ONTO CUBES ´ KELETI, ANDRAS ´ MATH ´ ´ AND ONDREJ DocID: 1pBxS - View Document
	Measurable functions are of bounded variation on a set of dimension 1/2 Andr´as M´ath´e∗ Abstract We show that for every Lebesgue measurable function f : [0, 1] → R there exists a compact set C DocID: 1oFMU - View Document
	APPROXIMATING COMPACT RECTIFIABLE SURFACES IN HAUSDORFF MEASURE AND IN HAUSDORFF DISTANCE BY LOCALLY ACYCLIC SURFACES HAVING THE SAME BOUNDARY THIERRY DE PAUW Abstract. Given a compact 2-rectifiable set X ⊆ R3 whose bo DocID: 1flU2 - View Document