Problems and proofs in real analysis : theory of measure and integration / J. Yeh.
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TextPublication details: New Jersey : World Scientific, 2014.Description: viii, 491 p. ; 23 cmISBN: - 9789814578509 (softcover : alk. paper)
- 515.8 23 Y43
| Item type | Current library | Call number | Status | Date due | Barcode | Item holds | |
|---|---|---|---|---|---|---|---|
| Books | ISI Library, Kolkata | 515.8 Y43 (Browse shelf(Opens below)) | Available | 136048 |
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| 515.8 Un61 Fourfold way in real analysis | 515.8 V188 Elements of Cantor sets - with applications / | 515.8 W582 Real analysis | 515.8 Y43 Problems and proofs in real analysis : theory of measure and integration / | 515.8 Z22 Convex analysis in general vector spaces | 515.8 Z66 Modern real analysis / | 515.83 An613 q-fractional calculus and equations |
Intended as a self-study volume.
1. Measure on a ? algebra of sets--
2. Outer measures--
3. Lebesgue measure on R--
4. Measurable functions--
5. Completion of measure space--
6. Convergence a.e. and convergence in measure--
7. Integration of bounded functions on sets of finite measure--
8. Integration of nonegative functions--
9. Integration of measurable functions--
10. Signed measures--
11. Absolute continuity of a measure--
12. Monotone functions and functions of bounded variation--
13. Absolutely continuous functions--
14. The Lp spaces--
15. Relation among the Lp spaces--
16. Bonded linear functionals on the Lp spaces--
17. Lebesgue-stieltijes measure spaces--
18. Product measure spaces--
19. Lebesgue measure space on the Euclidean space--
20. Differentiation on the Euclidean space.
This volume consists of the proofs of 391 problems in Real Analysis: Theory of Measure and Integration. Most of the problems in Real Analysis are not mere applications of theorems proved in the book but rather extensions of the proven theorems or related theorems. Proving these problems tests the depth of understanding of the theorems in the main text. This volume will be especially helpful to those who read Real Analysis in self-study and have no easy access to an instructor or an advisor.
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