Softcover ISBN: | 978-0-8218-4862-3 |
Product Code: | STML/48 |
List Price: | $59.00 |
Individual Price: | $47.20 |
eBook ISBN: | 978-1-4704-1219-7 |
Product Code: | STML/48.E |
List Price: | $49.00 |
Individual Price: | $39.20 |
Softcover ISBN: | 978-0-8218-4862-3 |
eBook: ISBN: | 978-1-4704-1219-7 |
Product Code: | STML/48.B |
List Price: | $108.00 $83.50 |
Softcover ISBN: | 978-0-8218-4862-3 |
Product Code: | STML/48 |
List Price: | $59.00 |
Individual Price: | $47.20 |
eBook ISBN: | 978-1-4704-1219-7 |
Product Code: | STML/48.E |
List Price: | $49.00 |
Individual Price: | $39.20 |
Softcover ISBN: | 978-0-8218-4862-3 |
eBook ISBN: | 978-1-4704-1219-7 |
Product Code: | STML/48.B |
List Price: | $108.00 $83.50 |
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Book DetailsStudent Mathematical LibraryVolume: 48; 2009; 202 ppMSC: Primary 28; 42
This book provides a student's first encounter with the concepts of measure theory and functional analysis. Its structure and content reflect the belief that difficult concepts should be introduced in their simplest and most concrete forms.
Despite the use of the word “terse” in the title, this text might also have been called A (Gentle) Introduction to Lebesgue Integration. It is terse in the sense that it treats only a subset of those concepts typically found in a substantial graduate-level analysis course. The book emphasizes the motivation of these concepts and attempts to treat them simply and concretely. In particular, little mention is made of general measures other than Lebesgue until the final chapter and attention is limited to \(R\) as opposed to \(R^n\).
After establishing the primary ideas and results, the text moves on to some applications. Chapter 6 discusses classical real and complex Fourier series for \(L^2\) functions on the interval and shows that the Fourier series of an \(L^2\) function converges in \(L^2\) to that function. Chapter 7 introduces some concepts from measurable dynamics. The Birkhoff ergodic theorem is stated without proof and results on Fourier series from Chapter 6 are used to prove that an irrational rotation of the circle is ergodic and that the squaring map on the complex numbers of modulus 1 is ergodic.
This book is suitable for an advanced undergraduate course or for the start of a graduate course. The text presupposes that the student has had a standard undergraduate course in real analysis.
ReadershipUndergraduate and graduate students interested in analysis or its applications to other areas of mathematics.
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Table of Contents
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Chapters
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Chapter 1. The regulated and Riemann integrals
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Chapter 2. Lebesgue measure
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Chapter 3. The Lebesgue integral
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Chapter 4. The integral of unbounded functions
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Chapter 5. The Hilbert space $L^2$
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Chapter 6. Classical Fourier series
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Chapter 7. Two ergodic transformations
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Appendix A. Background and foundations
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Appendix B. Lebesgue measure
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Appendix C. A non-measurable set
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Additional Material
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Reviews
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The book is suitable for an advanced undergraduate course or for the start of a graduate course. Each chapter contains a suitable number of exercises.
Mathematical Reviews
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RequestsReview Copy – for publishers of book reviewsDesk Copy – for instructors who have adopted an AMS textbook for a courseExamination Copy – for faculty considering an AMS textbook for a coursePermission – for use of book, eBook, or Journal contentAccessibility – to request an alternate format of an AMS title
- Book Details
- Table of Contents
- Additional Material
- Reviews
- Requests
This book provides a student's first encounter with the concepts of measure theory and functional analysis. Its structure and content reflect the belief that difficult concepts should be introduced in their simplest and most concrete forms.
Despite the use of the word “terse” in the title, this text might also have been called A (Gentle) Introduction to Lebesgue Integration. It is terse in the sense that it treats only a subset of those concepts typically found in a substantial graduate-level analysis course. The book emphasizes the motivation of these concepts and attempts to treat them simply and concretely. In particular, little mention is made of general measures other than Lebesgue until the final chapter and attention is limited to \(R\) as opposed to \(R^n\).
After establishing the primary ideas and results, the text moves on to some applications. Chapter 6 discusses classical real and complex Fourier series for \(L^2\) functions on the interval and shows that the Fourier series of an \(L^2\) function converges in \(L^2\) to that function. Chapter 7 introduces some concepts from measurable dynamics. The Birkhoff ergodic theorem is stated without proof and results on Fourier series from Chapter 6 are used to prove that an irrational rotation of the circle is ergodic and that the squaring map on the complex numbers of modulus 1 is ergodic.
This book is suitable for an advanced undergraduate course or for the start of a graduate course. The text presupposes that the student has had a standard undergraduate course in real analysis.
Undergraduate and graduate students interested in analysis or its applications to other areas of mathematics.
-
Chapters
-
Chapter 1. The regulated and Riemann integrals
-
Chapter 2. Lebesgue measure
-
Chapter 3. The Lebesgue integral
-
Chapter 4. The integral of unbounded functions
-
Chapter 5. The Hilbert space $L^2$
-
Chapter 6. Classical Fourier series
-
Chapter 7. Two ergodic transformations
-
Appendix A. Background and foundations
-
Appendix B. Lebesgue measure
-
Appendix C. A non-measurable set
-
The book is suitable for an advanced undergraduate course or for the start of a graduate course. Each chapter contains a suitable number of exercises.
Mathematical Reviews