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 - Bounded variation - Document - PDFSEARCH.IO

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Date: 2012-01-10 05:32:01 Dimension theory Fractals Hausdorff dimension Metric geometry Borel measure NC Peetre theorem Hlder condition		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 Add to Reading List Source URL: homepages.warwick.ac.uk Download Document from Source Website File Size: 165,81 KB Share Document on Facebook

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