Many students acquire knowledge of a large number of theorems and methods of calculus without being able to say how they work together. This book provides those students with the coherent account that they need. A Companion to Analysis explains the problems that must be resolved in order to procure a rigorous development of the calculus and shows the student how to deal with those problems.
Starting with the real line, the book moves on to finite-dimensional spaces and then to metric spaces. Readers who work through this text will be ready for courses such as measure theory, functional analysis, complex analysis, and differential geometry. Moreover, they will be well on the road that leads from mathematics student to mathematician.
With this book, well-known author Thomas Körner provides able and hard-working students a great text for independent study or for an advanced undergraduate or first-level graduate course. It includes many stimulating exercises. An appendix contains a large number of accessible but non-routine problems that will help students advance their knowledge and improve their technique.
Readership
Advanced undergraduates, graduate students and research mathematicians interested in analysis.
Reviews
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This review should be thought of as a companion to Steve Krantz's review of the same book in the October 2004 issue of the Monthly. Krantz loves the book because Körner is a superb author and his love of analysis shows throughout the book. The author's style is delightful and his British humour shows through. After telling us about several problems with Riemann integration, he gives us the good news: "Fortunately all these difficulties vanish like early morning mist in the sunlight of Lebesgue's theory." But Krantz acknowledges that the book would be a difficult book to use as a text, because of its idiosyncrasies, including its unusual organization. Krantz also rues the absence of some basic ideas in analysis such as the Baire category theorem. Readers of this review might want to print this review now and then go read Krantz's review first.
I'll give a more parochial review and try to answer the question: Who, among American students and mathematicians, is the book really for? The author says: "Although I hope this book may be useful to others, I wrote it for students to read either before or after attending the appropriate lectures." I agree that it's not for most classrooms. For example, there are no answers to the exercises, though the website http://www.dpmms.cam.ac.uk/~twk/ has some answers for the many exercises in Appendix K. In spite of the confusing subtitle of the book, in a footnote on page 62 the author himself claims that this "is a second course in analysis." I believe that in Britain a "first course in analysis" must be a calculus course done more rigorously than in the U.S.
This book is rich and meaty, and Körner wants readers to fall in love with analysis. It will help if they are start out at least infatuated. It dwells on the nuances and subtleties. As he notes in his Preface, "I have not tried to strip the subject down to its bare bones. A skeleton is meaningless unless one has some idea of the being it supports." I found the author's comments in the Preface about other books interesting. I too cut my teeth on Hardy's Pure Mathematics. I can understand why he keeps Karl Stromberg's book Introduction to Classical Real Analysis on his desk. My friend Karl also loved analysis and this shows in his book. I love analysis too, but many students do not. This is why my little book, Elementary Analysis: The Theory of Calculus, just provides what the students must know to survive future analysis courses.
The textual part of the book breaks very roughly into three parts. The first five chapters cover the core material in a first course on real analysis in the U.S. The next five chapters cover calculus of several variables. The remaining four chapters focus on metric space ideas with applications to functions of several variables and related topics.
In the first part, the author emphasizes that algebra can just as well be done in the setting of the field of rationals, Q, as on the field of real numbers, R. Real analysis is the mathematics that can be done on R, but not on Q. He is very careful to indicate which results are analysis (are true on R but not on Q) and which are not. It is interesting that the Fundamental Theorem of Algebra (all non-constant complex polynomials have roots) is analysis, not algebra. For example, the equation z² = 2 has a solution in R + iR but not in Q + iQ (pages 109-110). A related theme throughout the book is the emphasis on various generalizations of R, or Q if you prefer, both in the algebraic realm (fields, etc.) and the analytic realm (normed linear spaces, etc.).
In the second part, I especially liked the treatment of Riemann integrals in Chapter 8, and Chapter 9 includes a nice expository introduction to the ideas of the Lebesgue integral.
I return to the issue of the book's organization. There are too many appendices including the giant Appendix K with 345 exercises. Appendix K starts out with 11 codes for the exercises. Many of the exercises are very interesting and some of them are quite challenging. Many of them dip into more advanced topics providing bare-bones glimpes that may or may not be illuminating, depending on the reader's knowledge and sophistication.
The organization of the book may be the organization of the future as people become completely comfortable with non-linear reading and studying, hopping from website to website and so on. As a linear reader, I was dismayed to find relevant items in Appendix K that would have been illuminating earlier. Sometimes the author mentions the relevant exercises, sometimes not. It would have helped, as Krantz noted, if these exercises had been at the ends of the appropriate chapters. It also would have helped if there had been a tree of guidance at the beginning of the book suggesting avenues for readers. Finally, frequently Examples, Exercises and even Definitions are inserted between two paragraphs that are clearly intended to be read sequentially.
Several minor corrections are provided on the website cited above. In addition, I found the footnote on page 39 puzzling, since I expected it to be about Weierstrass.
Kenneth A. Ross
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This book not only provides a lot of solid information about real analysis, it also answers those questions which students want to ask but cannot figure how to formulate. To read this book is to spend time with one of the modern masters in the subject.
Steven G. Krantz, Washington University, St. Louis
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T. W. Körner's A Companion to Analysis is a welcome addition to the literature on undergraduate-level rigorous analysis. It is written with great care with regard to both mathematical correctness and pedagogical soundness. Körner shows good taste in deciding what to explain in detail and what to leave to the reader in the exercises scattered throughout the text. And the enormous collection of supplementary exercises in Appendix K, which comprises almost one-third of the whole book, is a valuable resource for both teachers and students.
One of the major assets of the book is Körner's very personal writing style. By keeping his own engagement with the material continually in view, he invites the reader to a similarly high level of involvement. And the witty and erudite asides that are sprinkled throughout the book are a real pleasure.
Gerald Folland, University of Washington, Seattle
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This is a remarkable book. It provides deep and invaluable insight into many parts of analysis, presented by an accomplished analysist. Körner covers all of the important aspects of an advanced calculus course along with a discussion of other interesting topics.
Paul Sally, University of Chicago
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The book is a very useful companion to standard analysis textbooks. It stands out in virtue of the author's style of writing, characterized by a pleasant mixture of various erudite reflections.
MAA Reviews
Author(s): T. W. Korner
Series: Graduate Studies in Mathematics
Edition: 1
Publisher: American Mathematical Society
Year: 2003
Language: English
Pages: 1014
City: Providence, Rhode Island
Tags: Mathematical Analysis
A Companion to Analysis
Title Page
Contents
Introduction
Chapter 1. The Real Line
§1.1. Why do we bother?
§1.2. Limits
§1.3. Continuity
§1.4. The fundamental axiom
§1.5. The axiom of Archimedes
§1.6. Lion hunting
§1.7. The mean value inequality
§1.8. Full circle
§1.9. Are the real numbers unique?
Chapter 2. A First Philosophical Interlude
§2.1. Is the intermediate value theorem obvious?
Chapter 3. Other Versions of the Fundamental Axiom
§3.1. The supremum
§3.2. The Bolzano—Weierstrass theorem
§3.3. Some general remarks
Chapter 4. Higher Dimensions
§4.1. Bolzano-Weierstrass in Higher Dimensions
§4.2. Open and closed sets
§4.3. A central theorem of analysis
§4.4. The mean value theorem
§4.5. Uniform continuity
§4.6. The general principle of convergence
Chapter 5. Sums and Suchlike
§5.1. Comparison tests
§5.2. Conditional convergence
§5.3. Interchanging limits
§5.4. The exponential function
§5.5. The trigonometric functions
§5.6. The logarithm
§5.7. Powers
§5.8. The fundamental theorem of algebra
Chapter 6. Differentiation
§6.1. Preliminaries
§6.2. The operator norm and the chain rule
§6.3. The mean value inequality in higher dimensions
Chapter 7. Local Taylor Theorems
§7.1. Some one-dimensional Taylor theorems
§7.2. Some many-dimensional local Taylor theorems
§7.3. Critical points
Chapter 8. The Riemann Integral
§8.1. Where is the problem ?
§8.2. Riemann integration
§8.3. Integrals of continuous functions
§8.4. First steps in the calculus of variations
§8.5. Vector-valued integrals
Chapter 9. Developments and Limitations of the Riemann Integral
§9.1. Why go further?
§9.2. Improper integrals
§9.3. Integrals over areas
§9.4. The Riemann- Stieltjes integral
§9.5. How long is a piece of string?
Chapter 10. Metric Spaces
§10.1. Sphere packing
§10.2. Shannon's theorem
§10.3. Metric spaces
§10.4. Norms and the interaction of algebra and analysis
§10.5. Geodesics
Chapter 11. Complete Metric Spaces
§11.1. Completeness
§11.2. The Bolzano-Weierstrass property
§11.3. The uniform norm
§11.4. Uniform convergence
§11.5. Power series
§11.6. Fourier series
Chapter 12. Contraction Mappings and Differential Equations
§12.1. Banach's contraction mapping theorem
§12.2. Existence of solutions of differential equations
§12.3. Local to global
§12.4. Green's function solutions
Chapter 13. Inverse and Implicit Functions
§13.1. The inverse function theorem
§13.2. The implicit function theorem
§13.3. Lagrange multipliers
Chapter 14. Completion
§14.1. What is the correct question?
§14.2. The solution
§14.3. Why do we construct the reals?
§14.4. How do we construct the reals?
§14.5. Paradise lost?
Appendix A. Ordered Fields
Appendix B. Countability
Appendix C. The Care and Treatment of Counterexamples
Appendix D. A More General View of Limits
Appendix E. Traditional Partial Derivatives
Appendix F. Another Approach to the Inverse Function Theorem
Appendix G. Completing Ordered Fields
Appendix H. Constructive Analysis
Appendix I. Miscellany
Appendix J. Executive Summary
Appendix K. Exercises
Bibliography
Index
Back Cover
Partial Solutions for Questions in Appendix K