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The Hardy Space H1 with Non-doubling Measures and Their Applications

The present book offers an essential but accessible introduction to the discoveries first made in the 1990s that the doubling condition is superfluous for most results for function spaces and the boundedness of operators. It shows the methods behind these discoveries, their consequences and some of...

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Bibliographic Details
Main Authors: Yang, Dachun, Yang, Dongyong (Author), Hu, Guoen (Author)
Format: eBook
Language:English
Published: Cham Springer International Publishing 2013, 2013
Edition:1st ed. 2013
Series:Lecture Notes in Mathematics
Subjects:
Functional Analysis
Fourier Analysis
Operator Theory
Online Access:
Collection: Springer eBooks 2005- - Collection details see MPG.ReNa
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245 0 0 |a The Hardy Space H1 with Non-doubling Measures and Their Applications  |h Elektronische Ressource  |c by Dachun Yang, Dongyong Yang, Guoen Hu 
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260 |a Cham  |b Springer International Publishing  |c 2013, 2013 
300 |a XIII, 653 p  |b online resource 
505 0 |a Preliminaries -- Approximations of the Identity -- The Hardy Space H1(μ) -- The Local Atomic Hardy Space h1(μ) -- Boundedness of Operators over (RD, μ) -- Littlewood-Paley Operators and Maximal Operators Related to Approximations of the Identity -- The Hardy Space H1 (χ, υ)and Its Dual Space RBMO (χ, υ) -- Boundedness of Operators over((χ, υ) -- Bibliography -- Index -- Abstract 
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653 |a Fourier Analysis 
653 |a Operator theory 
653 |a Operator Theory 
653 |a Fourier analysis 
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700 1 |a Hu, Guoen  |e [author] 
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082 0 |a 515.2433 
520 |a The present book offers an essential but accessible introduction to the discoveries first made in the 1990s that the doubling condition is superfluous for most results for function spaces and the boundedness of operators. It shows the methods behind these discoveries, their consequences and some of their applications. It also provides detailed and comprehensive arguments, many typical and easy-to-follow examples, and interesting unsolved problems. The theory of the Hardy space is a fundamental tool for Fourier analysis, with applications for and connections to complex analysis, partial differential equations, functional analysis and geometrical analysis. It also extends to settings where the doubling condition of the underlying measures may fail 

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