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Analytic Capacity, Rectifiability, Menger Curvature and Cauchy Integral

Based on a graduate course given by the author at Yale University this book deals with complex analysis (analytic capacity), geometric measure theory (rectifiable and uniformly rectifiable sets) and harmonic analysis (boundedness of singular integral operators on Ahlfors-regular sets). In particular...

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Bibliographic Details
Main Author: Pajot, Hervé M.
Format: eBook
Language:English
Published: Berlin, Heidelberg Springer Berlin Heidelberg 2002, 2002
Edition:1st ed. 2002
Series:Lecture Notes in Mathematics
Subjects:
Measure Theory
Fourier Analysis
Measure And Integration
Functions Of Complex Variables
Mathematical Analysis
Analysis
Geometry
Functions Of A Complex Variable
Analysis (mathematics)
Online Access:
Collection: Springer Book Archives -2004 - Collection details see MPG.ReNa
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245 0 0 |a Analytic Capacity, Rectifiability, Menger Curvature and Cauchy Integral  |h Elektronische Ressource  |c by Hervé M. Pajot 
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300 |a VIII, 119 p  |b online resource 
505 0 |a Preface -- Notations and conventions -- Some geometric measures theory -- Jones' traveling salesman theorem -- Menger curvature -- The Cauchy singular integral operator on Ahlfors-regular sets -- Analytic capacity and the Painlevé Problem -- The Denjoy and Vitushkin conjectures -- The capacity $gamma (+)$ and the Painlevé Problem -- Bibliography -- Index 
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653 |a Fourier Analysis 
653 |a Measure and Integration 
653 |a Functions of complex variables 
653 |a Mathematical analysis 
653 |a Analysis 
653 |a Geometry 
653 |a Functions of a Complex Variable 
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653 |a Geometry 
653 |a Fourier analysis 
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490 0 |a Lecture Notes in Mathematics 
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082 0 |a 515 
520 |a Based on a graduate course given by the author at Yale University this book deals with complex analysis (analytic capacity), geometric measure theory (rectifiable and uniformly rectifiable sets) and harmonic analysis (boundedness of singular integral operators on Ahlfors-regular sets). In particular, these notes contain a description of Peter Jones' geometric traveling salesman theorem, the proof of the equivalence between uniform rectifiability and boundedness of the Cauchy operator on Ahlfors-regular sets, the complete proofs of the Denjoy conjecture and the Vitushkin conjecture (for the latter, only the Ahlfors-regular case) and a discussion of X. Tolsa's solution of the Painlevé problem 

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