Real Analysis
- Author: N. L. Carothers, Bowling Green State University, Ohio
- Date Published: August 2000
- availability: Available
- format: Paperback
- isbn: 9780521497565
Paperback
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This course in real analysis is directed at advanced undergraduates and beginning graduate students in mathematics and related fields. Presupposing only a modest background in real analysis or advanced calculus, the book offers something of value to specialists and nonspecialists alike. The text covers three major topics: metric and normed linear spaces, function spaces, and Lebesgue measure and integration on the line. In an informal, down-to-earth style, the author gives motivation and overview of new ideas, while still supplying full details and complete proofs. He provides a great many exercises and suggestions for further study.
Read more- Many more exercises than are commonly found at this level
- Historical commentary
- Many references to both original and secondary sources, including expository and survey articles which are accessible to students
Reviews & endorsements
'… extremely well written: very entertaining and motivating.' Adhemar Bultheel, Bulletin of the London Mathematical Society
See more reviews'The author writes lucidly in a friendly, readable style and he is strong at motivating, anticipating and reviewing the various themes that permeate the text … The overwhelming impression is that Real analysis was a labour of love for the author, written with a genuine reverence for both its beautiful subject matter and its creators, refiners and teachers down the ages. As such - and high praise indeed - it will sit very happily alongside classics such as Apostol's Mathematical analysis, Royden's Real analysis, Rudin's Real and complex analysis and Hewitt and Stromberg's Real and abstract analysis.' The Mathematical Gazette
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×Product details
- Date Published: August 2000
- format: Paperback
- isbn: 9780521497565
- length: 416 pages
- dimensions: 254 x 178 x 22 mm
- weight: 0.73kg
- contains: 45 b/w illus.
- availability: Available
Table of Contents
Preface
Part I. Metric Spaces:
1. Calculus review
2. Countable and uncountable sets
3. Metrics and norms
4. Open sets and closed sets
5. Continuity
6. Connected sets
7. Completeness
8. Compactness
9. Category
Part II. Function Spaces:
10. Sequences of functions
11. The space of continuous functions
12. The Stone-Weierstrass theorem
13. Functions of bounded variation
14. The Riemann-Stieltjes integral
15. Fourier series
Part III. Lebesgue Measure and Integration:
16. Lebesgue measure
17. Measurable functions
18. The Lebesgue integral
19. Additional topics
20. Differentiation
References
Index.
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