Carleson measure

Results: 7



#Item
1THE HILBERT TRANSFORM OF A MEASURE ALEXEI POLTORATSKI1,2 , BARRY SIMON3,4 , AND MAXIM ZINCHENKO3 Abstract. Let e be a homogeneous subset of R in the sense of Carleson. Let µ be a finite positive measure on R and Hµ (x)

THE HILBERT TRANSFORM OF A MEASURE ALEXEI POLTORATSKI1,2 , BARRY SIMON3,4 , AND MAXIM ZINCHENKO3 Abstract. Let e be a homogeneous subset of R in the sense of Carleson. Let µ be a finite positive measure on R and Hµ (x)

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Source URL: www.math.tamu.edu

Language: English - Date: 2008-11-12 13:36:49
2arXiv:math.PR[removed]v1 12 Feb 2002

arXiv:math.PR[removed]v1 12 Feb 2002

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Source URL: adatbank.transindex.ro

Language: English - Date: 2007-10-08 12:16:30
3IJMMS 2003:52, 3299–3313 PII. S0161171203301048 http://ijmms.hindawi.com © Hindawi Publishing Corp. SELF-SIMILAR RANDOM FRACTAL MEASURES USING

IJMMS 2003:52, 3299–3313 PII. S0161171203301048 http://ijmms.hindawi.com © Hindawi Publishing Corp. SELF-SIMILAR RANDOM FRACTAL MEASURES USING

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Source URL: adatbank.transindex.ro

Language: English - Date: 2007-10-08 12:14:12
4Tutorial 3: Stieltjes-Lebesgue Measure 1

Tutorial 3: Stieltjes-Lebesgue Measure 1

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Source URL: www.probability.net

Language: English - Date: 2006-10-29 01:19:31
5Tutorial 13: Regular Measure 1

Tutorial 13: Regular Measure 1

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Source URL: www.probability.net

Language: English - Date: 2006-10-29 01:19:15
6

PDF Document

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Source URL: www.ams.org

Language: English - Date: 2007-01-02 13:24:44
7

PDF Document

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Source URL: mathstat.helsinki.fi

Language: English - Date: 2005-10-19 04:34:33