Integration and Modern Analysis

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A paean to twentieth century analysis, this modern text has several important themes and key features which set it apart from others on the subject. A major thread throughout is the unifying influence of the concept of absolute continuity on differentiation and integration. This leads to fundamental results such as the Dieudonné–Grothendieck theorem and other intricate developments dealing with weak convergence of measures.

Key Features:

* Fascinating historical commentary interwoven into the exposition;

* Hundreds of problems from routine to challenging;

* Broad mathematical perspectives and material, e.g., in harmonic analysis and probability theory, for independent study projects;

* Two significant appendices on functional analysis and Fourier analysis.

Key Topics:

* In-depth development of measure theory and Lebesgue integration;

* Comprehensive treatment of connection between differentiation and integration, as well as complete proofs of state-of-the-art results;

* Classical real variables and introduction to the role of Cantor sets, later placed in the modern setting of self-similarity and fractals;

* Evolution of the Riesz representation theorem to Radon measures and distribution theory;

* Deep results in modern differentiation theory;

* Systematic development of weak sequential convergence inspired by theorems of Vitali, Nikodym, and Hahn–Saks;

* Thorough treatment of rearrangements and maximal functions;

* The relation between surface measure and Hausforff measure;

* Complete presentation of Besicovich coverings and differentiation of measures.

Integration and Modern Analysis will serve advanced undergraduates and graduate students, as well as professional mathematicians. It may be used in the classroom or self-study.

Author(s): John J. Benedetto, Wojciech Czaja (auth.)
Series: Birkhäuser Advanced Texts / Basler Lehrbücher
Edition: 1
Publisher: Birkhäuser Basel
Year: 2009

Language: English
Pages: 575
City: Boston
Tags: Analysis; Functions of a Complex Variable; Measure and Integration

Front Matter....Pages i-xix
Classical Real Variables....Pages 1-35
Lebesgue Measure and General Measure Theory....Pages 37-94
The Lebesgue Integral....Pages 95-164
The Relationship between Differentiation and Integration on $$ \mathbb{R}$$ ....Pages 165-218
Spaces of Measures and the Radon–Nikodym Theorem....Pages 219-276
Weak Convergence of Measures....Pages 277-320
Riesz Representation Theorem....Pages 321-357
Lebesgue Differentiation Theorem on $$ \mathbb{R}^d $$ ....Pages 359-406
Self-Similar Sets and Fractals....Pages 407-439
Functional Analysis....Pages 441-485
Fourier Analysis....Pages 487-528
Back Matter....Pages 529-575