Separably injective Banach spaces / Antonio Aviles...[et al.].
Material type:
TextSeries: Lecture notes in mathematics ; 2132.Publication details: Switzerland : Springer, 2016.Description: xxii, 217 pages ; 24 cmISBN: - 9783319147406
- 515.732 23 Av958
| Item type | Current library | Call number | Status | Date due | Barcode | Item holds | |
|---|---|---|---|---|---|---|---|
| Books | ISI Library, Kolkata | 515.732 Av958 (Browse shelf(Opens below)) | Available | 137696 |
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| 515.732 Al335 Topics in banach space theory | 515.732 Al335 Topics in banach space theory | 515.732 Al335 Topics in Banach space theory / | 515.732 Av958 Separably injective Banach spaces / | 515.732 B133 Banach space C(S) | 515.732 B167 Banach spaces of analytic functions | 515.732 B212 Banach spaces,harmonic analysis and probability theory |
Includes bibliographical references and index.
1. A primer on injective Banach spaces.-
2. Separably injective Banach spaces.-
3. Spaces of universal disposition.-
4. Ultraproducts of type L .-
5. %-injectivity.-
6. Open Problems.-
Appendix.
This monograph contains a detailed exposition of the up-to-date theory of separably injective spaces: new and old results are put into perspective with concrete examples (such as l8/c0 and C(K) spaces, where K is a finite height compact space or an F-space, ultrapowers of L8 spaces and spaces of universal disposition). It is no exaggeration to say that the theory of separably injective Banach spaces is strikingly different from that of injective spaces. For instance, separably injective Banach spaces are not necessarily isometric to, or complemented subspaces of, spaces of continuous functions on a compact space. Moreover, in contrast to the scarcity of examples and general results concerning injective spaces, we know of many different types of separably injective spaces and there is a rich theory around them. The monograph is completed with a preparatory chapter on injective spaces, a chapter on higher cardinal versions of separable injectivity and a lively discussion of open problems and further lines of research.
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