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A First Course in Sobolev Spaces: Second Edition
 
Giovanni Leoni Carnegie Mellon University, Pittsburgh, PA
A First Course in Sobolev Spaces
Softcover ISBN:  978-1-4704-7702-8
Product Code:  GSM/181.S
List Price: $89.00
MAA Member Price: $80.10
AMS Member Price: $71.20
eBook ISBN:  978-1-4704-4226-2
Product Code:  GSM/181.E
List Price: $85.00
MAA Member Price: $76.50
AMS Member Price: $68.00
Softcover ISBN:  978-1-4704-7702-8
eBook: ISBN:  978-1-4704-4226-2
Product Code:  GSM/181.S.B
List Price: $174.00 $131.50
MAA Member Price: $156.60 $118.35
AMS Member Price: $139.20 $105.20
A First Course in Sobolev Spaces
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A First Course in Sobolev Spaces: Second Edition
Giovanni Leoni Carnegie Mellon University, Pittsburgh, PA
Softcover ISBN:  978-1-4704-7702-8
Product Code:  GSM/181.S
List Price: $89.00
MAA Member Price: $80.10
AMS Member Price: $71.20
eBook ISBN:  978-1-4704-4226-2
Product Code:  GSM/181.E
List Price: $85.00
MAA Member Price: $76.50
AMS Member Price: $68.00
Softcover ISBN:  978-1-4704-7702-8
eBook ISBN:  978-1-4704-4226-2
Product Code:  GSM/181.S.B
List Price: $174.00 $131.50
MAA Member Price: $156.60 $118.35
AMS Member Price: $139.20 $105.20
  • Book Details
     
     
    Graduate Studies in Mathematics
    Volume: 1812017; 734 pp
    MSC: Primary 46; Secondary 26; 30

    This book is about differentiation of functions. It is divided into two parts, which can be used as different textbooks, one for an advanced undergraduate course in functions of one variable and one for a graduate course on Sobolev functions. The first part develops the theory of monotone, absolutely continuous, and bounded variation functions of one variable and their relationship with Lebesgue–Stieltjes measures and Sobolev functions. It also studies decreasing rearrangement and curves. The second edition includes a chapter on functions mapping time into Banach spaces.

    The second part of the book studies functions of several variables. It begins with an overview of classical results such as Rademacher's and Stepanoff's differentiability theorems, Whitney's extension theorem, Brouwer's fixed point theorem, and the divergence theorem for Lipschitz domains. It then moves to distributions, Fourier transforms and tempered distributions.

    The remaining chapters are a treatise on Sobolev functions. The second edition focuses more on higher order derivatives and it includes the interpolation theorems of Gagliardo and Nirenberg. It studies embedding theorems, extension domains, chain rule, superposition, Poincaré's inequalities and traces.

    A major change compared to the first edition is the chapter on Besov spaces, which are now treated using interpolation theory.

    Readership

    Graduate students and researchers interested in Sobolev spaces, particularly their applications to PDEs.

  • Table of Contents
     
     
    • Part 1. Functions of one variable
    • Monotone functions
    • Functions of bounded pointwise variation
    • Absolutely continuous functions
    • Decreasing rearrangement
    • Curves
    • Lebesgue–Stieltjes measures
    • Functions of bounded variation and Sobolev functions
    • The infinite-dimensional case
    • Part 2. Functions of several variables
    • Change of variables and the divergence theorem
    • Distributions
    • Sobolev spaces
    • Sobolev spaces: Embeddings
    • Sobolev spaces: Further properties
    • Functions of bounded variation
    • Sobolev spaces: Symmetrization
    • Interpolation of Banach spaces
    • Besov spaces
    • Sobolev spaces: Traces
    • Appendix A. Functional analysis
    • Appendix B. Measures
    • Appendix C. The Lebesgue and Hausdorff measures
    • Appendix D. Notes
    • Appendix E. Notation and list of symbols
  • Requests
     
     
    Review Copy – for publishers of book reviews
    Desk Copy – for instructors who have adopted an AMS textbook for a course
    Examination Copy – for faculty considering an AMS textbook for a course
    Permission – for use of book, eBook, or Journal content
    Accessibility – to request an alternate format of an AMS title
Volume: 1812017; 734 pp
MSC: Primary 46; Secondary 26; 30

This book is about differentiation of functions. It is divided into two parts, which can be used as different textbooks, one for an advanced undergraduate course in functions of one variable and one for a graduate course on Sobolev functions. The first part develops the theory of monotone, absolutely continuous, and bounded variation functions of one variable and their relationship with Lebesgue–Stieltjes measures and Sobolev functions. It also studies decreasing rearrangement and curves. The second edition includes a chapter on functions mapping time into Banach spaces.

The second part of the book studies functions of several variables. It begins with an overview of classical results such as Rademacher's and Stepanoff's differentiability theorems, Whitney's extension theorem, Brouwer's fixed point theorem, and the divergence theorem for Lipschitz domains. It then moves to distributions, Fourier transforms and tempered distributions.

The remaining chapters are a treatise on Sobolev functions. The second edition focuses more on higher order derivatives and it includes the interpolation theorems of Gagliardo and Nirenberg. It studies embedding theorems, extension domains, chain rule, superposition, Poincaré's inequalities and traces.

A major change compared to the first edition is the chapter on Besov spaces, which are now treated using interpolation theory.

Readership

Graduate students and researchers interested in Sobolev spaces, particularly their applications to PDEs.

  • Part 1. Functions of one variable
  • Monotone functions
  • Functions of bounded pointwise variation
  • Absolutely continuous functions
  • Decreasing rearrangement
  • Curves
  • Lebesgue–Stieltjes measures
  • Functions of bounded variation and Sobolev functions
  • The infinite-dimensional case
  • Part 2. Functions of several variables
  • Change of variables and the divergence theorem
  • Distributions
  • Sobolev spaces
  • Sobolev spaces: Embeddings
  • Sobolev spaces: Further properties
  • Functions of bounded variation
  • Sobolev spaces: Symmetrization
  • Interpolation of Banach spaces
  • Besov spaces
  • Sobolev spaces: Traces
  • Appendix A. Functional analysis
  • Appendix B. Measures
  • Appendix C. The Lebesgue and Hausdorff measures
  • Appendix D. Notes
  • Appendix E. Notation and list of symbols
Review Copy – for publishers of book reviews
Desk Copy – for instructors who have adopted an AMS textbook for a course
Examination Copy – for faculty considering an AMS textbook for a course
Permission – for use of book, eBook, or Journal content
Accessibility – to request an alternate format of an AMS title
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