Paperback Language: English ISBN-10: 0821852159 ISBN-13: 978-0821852156

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ISBN 10: 0821852159
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**Book Description **Paperback. Book Condition: New. New Item, Fast Shipping. Ready in Stock., 472 Pages, BUY WITH CONFIDENCE, Note:***WE DO NOT ENTERTAIN BULK ORDERS.***. Bookseller Inventory # 471661

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**Book Description **Paperback. Book Condition: New. New Book, Ready to ship. Bookseller Inventory # 29973

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**Book Description **Book Condition: New. New. International edition. Different ISBN and Cover image but contents are same as US edition. Perfect condition. Customer satisfaction our priority. Bookseller Inventory # ABE-BOOK-62145

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(2010)

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ISBN 13: 9780821852156

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**Book Description **Orient BlackSwan/ Universities Press, 2010. Softcover. Book Condition: New. The theory of integration is one of the twin pillars on which analysis is built. The first version of integration that students see is the Riemann integral. Later, graduate students learn that the Lebesgue integral is ?better? because it removes some restrictions on the integrands and the domains over which we integrate. However, there are still drawbacks to Lebesgue integration, for instance, dealing with the Fundamental Theorem of Calculus, or with ?improper? integrals. This book is an introduction to a relatively new theory of the integral (called the ?generalized Riemann integral? or the ?Henstock-Kurzweil integral?) that corrects the defects in the classical Riemann theory and both simplifies and extends the Lebesgue theory of integration. Although this integral includes that of Lebesgue, its definition is very close to the Riemann integral that is familiar to students from calculus. One virtue of the new approach is that no measure theory and virtually no topology is required. Indeed, the book includes a study of measure theory as an application of the integral. Part 1 fully develops the theory of the integral of functions defined on a compact interval. This restriction on the domain is not necessary, but it is the case of most interest and does not exhibit some of the technical problems that can impede the reader``s understanding. Part 2 shows how this theory extends to functions defined on the whole real line. The theory of Lebesgue measure from the integral is then developed, and the author makes a connection with some of the traditional approaches to the Lebesgue integral. Thus, readers are given full exposure to the main classical results. The text is suitable for a first-year graduate course, although much of it can be readily mastered by advanced undergraduate students. Included are many examples and a very rich collection of exercises. There are partial solutions to approximately one-third of the exercises. A complete solutions manual is available separately. Printed Pages: 472. Bookseller Inventory # 20261

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Published by
Orient BlackSwan/ Universities Press
(2010)

ISBN 10: 0821852159
ISBN 13: 9780821852156

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Softcover
Quantity Available: > 20

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**Book Description **Orient BlackSwan/ Universities Press, 2010. Softcover. Book Condition: New. The theory of integration is one of the twin pillars on which analysis is built. The first version of integration that students see is the Riemann integral. Later, graduate students learn that the Lebesgue integral is â€śbetterâ€ť because it removes some restrictions on the integrands and the domains over which we integrate. However, there are still drawbacks to Lebesgue integration, for instance, dealing with the Fundamental Theorem of Calculus, or with â€śimproperâ€ť integrals. This book is an introduction to a relatively new theory of the integral (called the â€śgeneralized Riemann integralâ€ť or the â€śHenstock-Kurzweil integralâ€ť) that corrects the defects in the classical Riemann theory and both simplifies and extends the Lebesgue theory of integration. Although this integral includes that of Lebesgue, its definition is very close to the Riemann integral that is familiar to students from calculus. One virtue of the new approach is that no measure theory and virtually no topology is required. Indeed, the book includes a study of measure theory as an application of the integral. Part 1 fully develops the theory of the integral of functions defined on a compact interval. This restriction on the domain is not necessary, but it is the case of most interest and does not exhibit some of the technical problems that can impede the reader``s understanding. Part 2 shows how this theory extends to functions defined on the whole real line. The theory of Lebesgue measure from the integral is then developed, and the author makes a connection with some of the traditional approaches to the Lebesgue integral. Thus, readers are given full exposure to the main classical results. The text is suitable for a first-year graduate course, although much of it can be readily mastered by advanced undergraduate students. Included are many examples and a very rich collection of exercises. There are partial solutions to approximately one-third of the exercises. A complete solutions manual is available separately. Printed Pages: 472. Bookseller Inventory # 20261

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ISBN 10: 0821852159
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**Book Description **Book Condition: New. This is Brand NEW. Bookseller Inventory # adhya11217-12016

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