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This is a sequel to Dr Weir's undergraduate textbook on Lebesgue Integration and Measure (CUP. 1973) in which he provided a concrete approach to the Lebesgue integral in terms of step functions and went on from there to deduce the abstract concept of Lebesgue measure. In this second volume, the treatment of the Lebesgue integral is generalised to give the Daniell integral and the related general theory of measure. This approach via integration of elementary functions is particularly well adapted to the proof of Riesz's famous theorems about linear functionals on the classical spaces C (X) and LP and also to the study of topological notions such as Borel measure. This book will be used for final year honours courses in pure mathematics and for graduate courses in functional analysis and measure theory.
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- Date Published: August 1979
- format: Paperback
- isbn: 9780521297158
- length: 312 pages
- dimensions: 229 x 152 x 18 mm
- weight: 0.46kg
- availability: Available
Table of Contents
8. General Integration
9. Lebesgue-Stieltjes integrals and measures
10. The Riesz representation theorem
11. General measures
12. The classical approach
13. Uniqueness and approximation theorems
14. Product measures
15. Borel measures
16. Real and complex measures
17. The Radon-Nikodym theorem
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