Varieties of integration Rosentrater, C.Ray
Publication details: The Mathematical Association of America 2015 Washington D. C.Description: xv, 325 pISBN:- 9780883853597
- 515.43 R6V2
| Item type | Current library | Collection | Call number | Status | Date due | Barcode | Item holds | |
|---|---|---|---|---|---|---|---|---|
Book
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Ahmedabad | Non-fiction | 515.43 R6V2 (Browse shelf(Opens below)) | Available | 193298 |
Table of Contents
Preface
1. Historical Introduction
2. The Riemann Integral
3. The Darboux integral
4. A Functional zoo
5. Another Approach: Measure Theory
6. The Lebesgue Integral
7. The Gauge Integral
8. Stieltjes-type Integrals and Extensions
9. A Look Back
10. Afterword: Ls Spaces and Fourier Series
Appendices: A Compendium of Definition and Results
Index
About the Author
Varieties of Integration explores the critical contributions by Riemann, Darboux, Lebesgue, Henstock, Kurzweil, and Stieltjes to the theory of integration and provides a glimpse of more recent variations of the integral such as those involving operator-valued measures. By the first year of graduate school, a young mathematician will have encountered at least three separate definitions of the integral. The associated integrals are typically studied in isolation with little attention paid to the relationships between them or to the historical issues that motivated their definitions. Varieties of Integration redresses this situation by introducing the Riemann, Darboux, Lebesgue, and gauge integrals in a single volume using a common set of examples. This approach allows the reader to see how the definitions influence proof techniques and computational strategies. Then the properties of the integrals are compared in three major areas: the class of integrable functions, the convergence properties of the integral, and the best form of the Fundamental Theorems of Calculus.
http://www.maa.org/press/books/varieties-of-integration
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