A short course on Banach space theory
著者
書誌事項
A short course on Banach space theory
(London Mathematical Society student texts, 64)
Cambridge University Press, 2005
- : hard
- : pbk
並立書誌 全1件
大学図書館所蔵 件 / 全40件
-
該当する所蔵館はありません
- すべての絞り込み条件を解除する
注記
Bibliography: p.173-179
Includes index
内容説明・目次
内容説明
This is a short course on Banach space theory with special emphasis on certain aspects of the classical theory. In particular, the course focuses on three major topics: the elementary theory of Schauder bases, an introduction to Lp spaces, and an introduction to C(K) spaces. While these topics can be traced back to Banach himself, our primary interest is in the postwar renaissance of Banach space theory brought about by James, Lindenstrauss, Mazur, Namioka, Pelczynski, and others. Their elegant and insightful results are useful in many contemporary research endeavors and deserve greater publicity. By way of prerequisites, the reader will need an elementary understanding of functional analysis and at least a passing familiarity with abstract measure theory. An introductory course in topology would also be helpful; however, the text includes a brief appendix on the topology needed for the course.
目次
- Preface
- 1. Classical Banach spaces
- 2. Preliminaries
- 3. Bases in Banach spaces
- 4. Bases in Banach spaces II
- 5. Bases in Banach spaces III
- 6. Special properties of C0, l1, and l
- 7. Bases and duality
- 8. Lp spaces
- 9. Lp spaces II
- 10. Lp spaces III
- 11. Convexity
- 12. C(K) Spaces
- 13. Weak compactness in L1
- 14. The Dunford-Pettis property
- 15. C(K) Spaces II
- 16. C(K) Spaces III
- A. Topology review.
「Nielsen BookData」 より
