The Theory of Measures and Integration (Wiley Series in Probability and Statistics) [Hardcover]

Eric M. Vestrup (Author)

Book Description

Publication Date: September 18, 2003 | ISBN-10: 0471249777 | ISBN-13: 978-0471249771 | Edition: 1

An accessible, clearly organized survey of the basic topics of measure theory for students and researchers in mathematics, statistics, and physics
In order to fully understand and appreciate advanced probability, analysis, and advanced mathematical statistics, a rudimentary knowledge of measure theory and like subjects must first be obtained. The Theory of Measures and Integration illuminates the fundamental ideas of the subject-fascinating in their own right-for both students and researchers, providing a useful theoretical background as well as a solid foundation for further inquiry.
Eric Vestrup's patient and measured text presents the major results of classical measure and integration theory in a clear and rigorous fashion. Besides offering the mainstream fare, the author also offers detailed discussions of extensions, the structure of Borel and Lebesgue sets, set-theoretic considerations, the Riesz representation theorem, and the Hardy-Littlewood theorem, among other topics, employing a clear presentation style that is both evenly paced and user-friendly. Chapters include:
* Measurable Functions
* The Lp Spaces
* The Radon-Nikodym Theorem
* Products of Two Measure Spaces
* Arbitrary Products of Measure Spaces
Sections conclude with exercises that range in difficulty between easy "finger exercises"and substantial and independent points of interest. These more difficult exercises are accompanied by detailed hints and outlines. They demonstrate optional side paths in the subject as well as alternative ways of presenting the mainstream topics.
In writing his proofs and notation, Vestrup targets the person who wants all of the details shown up front. Ideal for graduate students in mathematics, statistics, and physics, as well as strong undergraduates in these disciplines and practicing researchers, The Theory of Measures and Integration proves both an able primary text for a real analysis sequence with a focus on measure theory and a helpful background text for advanced courses in probability and statistics.

Editorial Reviews

Review

"…an excellent read…I was impressed with the wealth of information and the amount of flawless detail." (Journal of the American Statistical Association, March 2006)

“…contains many really good exercises…the style is clear and the notation appropriate…” (Zentralbaltt MATH, May 2005)

From the Back Cover

An accessible, clearly organized survey of the basic topics of measure theory for students and researchers in mathematics, statistics, and physics

In order to fully understand and appreciate advanced probability, analysis, and advanced mathematical statistics, a rudimentary knowledge of measure theory and like subjects must first be obtained. The Theory of Measures and Integration illuminates the fundamental ideas of the subject–fascinating in their own right–for both students and researchers, providing a useful theoretical background as well as a solid foundation for further inquiry.

Eric Vestrup’s patient and measured text presents the major results of classical measure and integration theory in a clear and rigorous fashion. Besides offering the mainstream fare, the author also offers detailed discussions of extensions, the structure of Borel and Lebesgue sets, set-theoretic considerations, the Riesz representation theorem, and the Hardy-Littlewood theorem, among other topics, employing a clear presentation style that is both evenly paced and user-friendly. Chapters include:

• Measurable Functions
• The Lp Spaces
• The Radon-Nikodym Theorem
• Products of Two Measure Spaces
• Arbitrary Products of Measure Spaces

Sections conclude with exercises that range in difficulty between easy "finger exercises"and substantial and independent points of interest. These more difficult exercises are accompanied by detailed hints and outlines. They demonstrate optional side paths in the subject as well as alternative ways of presenting the mainstream topics.

In writing his proofs and notation, Vestrup targets the person who wants all of the details shown up front. Ideal for graduate students in mathematics, statistics, and physics, as well as strong undergraduates in these disciplines and practicing researchers, The Theory of Measures and Integration proves both an able primary text for a real analysis sequence with a focus on measure theory and a helpful background text for advanced courses in probability and statistics.

See all Editorial Reviews

Product Details

• Hardcover: 594 pages
• Publisher: Wiley-Interscience; 1 edition (September 18, 2003)
• Language: English
• ISBN-10: 0471249777
• ISBN-13: 978-0471249771
• Product Dimensions: 9.4 x 6.4 x 1.3 inches
• Shipping Weight: 2.2 pounds (View shipping rates and policies)
• Average Customer Review: 5.0 out of 5 stars  See all reviews (2 customer reviews)
• Amazon Best Sellers Rank: #861,627 in Books (See Top 100 in Books)

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Customer Reviews

Most Helpful Customer Reviews

26 of 26 people found the following review helpful:

5.0 out of 5 stars The New Standard for Measure Theory Books, July 13, 2004

By 

K. Hamidieh "azeri" (Ann Arbor, Michigan, USA) - See all my reviews
(REAL NAME)   

This review is from: The Theory of Measures and Integration (Wiley Series in Probability and Statistics) (Hardcover)

This is a fantastic book on measure theory. The focus is on measure theory on its own right and not on probability. I was lucky to come across this book while canvassing the measure theory books at our library. I looked at the books by Billingsley, Halmos, Chung, Resnick, Rao, Rudin, Pollard, Dudley, Nielson, Stroock, Williams, Pitt, and many others. Hand-down, Vestrup is the best.

I believe after scrutinizing so many books, I have a very good baseline to judge Vestrup's work. Here are a few specific reasons:

(1) If you don't like detail and revel in banging your head against the walls to figure out the skipped details in Billingsley, this is not the book for you. But If you are a first timer to measure theory, this is as good as it will get; All the major results of measure theory are presented in detailed and clear manner with few skipped details and few not-so-obvious "it is obvious" remarks.

(2) Vestrup has a lot of exercises with lots of helpful hints. Some problems at first appear to be long and intimidating till you look closely and discover that Vestrup leads you through the problems with his hints.

(3) Certain topics central to understanding of measure theory were given cursory coverage by most of the books mentioned above. Not Vestrup. For example, Vestrup devotes a whole chapter to extensions. This is just one example of many central ideas Vestrup develops meticulously and painstakingly.

This book is fairly new and I think its popularity will grow as more students and professionals discover it. I suppose the only criticism I have is that the typesetting can be improved (second edition maybe?)

There are a few other good books (Ash, Bartle, and Royden) that are out there that you may consider but again Vestrup trumps them all. Whatever you decide on, I strongly warn against using Billingsley.

5.0 out of 5 stars This will be a classic, September 2, 2011

By 

Ramesh Kadambi "kadambi" (Connecticut) - See all my reviews
(REAL NAME)   

Amazon Verified Purchase

This review is from: The Theory of Measures and Integration (Wiley Series in Probability and Statistics) (Hardcover)

I am using Vestrup as a reference while I am using Bartles book as the main book for self study. I have to say, this book is great for self study. The author as indicated in his preface makes it accessible for most readers with some basic knowledge of analysis. The books is self contained and exhaustive with elaborate sections explaining hard to grasp topics.