Set theoretical aspects of real analysis / Alexander B. Kharazishvili, Tbilisi State University, Georgia.
Material type: TextLanguage: English Series: Monographs and research notes in mathematicsPublisher: Boca Raton, Florida : CRC Press, Taylor & Francis Group, [2015]Copyright date: ©2015Description: xxii, 433 p. ; 24 cmContent type:- text
- unmediated
- volume
- 9781482242010 (alk. paper)
- 148224201X (alk. paper)
- 514/.7 23
- QA300 .K43 2015
Item type | Current library | Call number | Copy number | Status | Date due | Barcode | |
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წიგნი | ეროვნული სამეცნიერო ბიბლიოთეკა 1 საცავი. 1 კორპ. | 517 (Browse shelf(Opens below)) | 2E64000 | Available | 2021-8257 |
"A Chapman & Hall book."
Includes bibliographical references: p. 411-428 and index.
1. ZF theory and some point sets on the real line -- 2. Countable versions of AC and real analysis -- 3. Uncountable versions of AC and Lebesgue nonmeasurable sets -- 4. The Continuum Hypothesis and Lebesgue nonmeasurable sets -- 5. Measurability properties of sets and functions -- 6. Radon measures and nonmeasurable sets -- 7. Real-valued step functions with strange measurability properties -- 8. A partition of the real line into continuum many thick subsets -- 9. Measurability properties of Vitali sets -- 10. A relationship between the measurability and continuity of real-valued functions -- 11. A relationship between absolutely nonmeasurable functions and Sierpiński-Zygmund type functions -- 12. Sums of absolutely nonmeasurable injective functions -- 13. A large group of absolutely nonmeasurable additive functions -- 14. Additive properties of certain classes of pathological functions -- 15. Absolutely nonmeasurable homomorphisms of commutative groups -- 16. Measurable and nonmeasurable sets with homogeneous sections -- 17. A combinatorial problem on translation invariant extensions of the Lebesgue measure -- 18. Countable almost invariant partitions of G-spaces -- 19. Nonmeasurable unions of measure zero sections of plane sets -- 20. Measurability properties of well-orderings.
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