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Measure and Integral

Volume 1

  • Textbook
  • © 1988

Overview

Authors:
  1. John L. Kelley

    1. Department of Mathematics, University of California, Berkeley, USA

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  2. T. P. Srinivasan

    1. Department of Mathematics, The University of Kansas, Lawrence, USA

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    You can also search for this author in PubMed   Google Scholar

Part of the book series: Graduate Texts in Mathematics (GTM, volume 116)

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Table of contents (11 chapters)

  1. Front Matter

    Pages i-x
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  2. Preliminaries

    • John L. Kelley, T. P. Srinivasan
    Pages 1-7

  3. Pre-Measures

    • John L. Kelley, T. P. Srinivasan
    Pages 8-20

  4. Pre-Measure to Pre-Integral

    • John L. Kelley, T. P. Srinivasan
    Pages 21-31

  5. Pre-Integral to Integral

    • John L. Kelley, T. P. Srinivasan
    Pages 32-41

  6. Integral to Measure

    • John L. Kelley, T. P. Srinivasan
    Pages 42-53

  7. Measurability and σ-Simplicity

    • John L. Kelley, T. P. Srinivasan
    Pages 54-64

  8. The Integral I μ on L 1 (μ)

    • John L. Kelley, T. P. Srinivasan
    Pages 65-79

  9. Integrals* and Products

    • John L. Kelley, T. P. Srinivasan
    Pages 80-90

  10. Measures* and Mappings

    • John L. Kelley, T. P. Srinivasan
    Pages 91-107

  11. Signed Measures and Indefinite Integrals

    • John L. Kelley, T. P. Srinivasan
    Pages 108-120

  12. Banach Spaces

    • John L. Kelley, T. P. Srinivasan
    Pages 121-139

  13. Back Matter

    Pages 140-150
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Keywords

About this book

This is a systematic exposition of the basic part of the theory of mea­ sure and integration. The book is intended to be a usable text for students with no previous knowledge of measure theory or Lebesgue integration, but it is also intended to include the results most com­ monly used in functional analysis. Our two intentions are some what conflicting, and we have attempted a resolution as follows. The main body of the text requires only a first course in analysis as background. It is a study of abstract measures and integrals, and comprises a reasonably complete account of Borel measures and in­ tegration for R Each chapter is generally followed by one or more supplements. These, comprising over a third of the book, require some­ what more mathematical background and maturity than the body of the text (in particular, some knowledge of general topology is assumed) and the presentation is a little more brisk and informal. The material presented includes the theory of Borel measures and integration for ~n, the general theory of integration for locally compact Hausdorff spaces, and the first dozen results about invariant measures for groups. Most of the results expounded here are conventional in general character, if not in detail, but the methods are less so. The following brief overview may clarify this assertion.

Authors and Affiliations

  • Department of Mathematics, University of California, Berkeley, USA

    John L. Kelley

  • Department of Mathematics, The University of Kansas, Lawrence, USA

    T. P. Srinivasan

Bibliographic Information

  • Book Title: Measure and Integral

  • Book Subtitle: Volume 1

  • Authors: John L. Kelley, T. P. Srinivasan

  • Series Title: Graduate Texts in Mathematics

  • DOI: https://doi.org/10.1007/978-1-4612-4570-4

  • Publisher: Springer New York, NY

  • eBook Packages: Springer Book Archive

  • Copyright Information: Springer-Verlag New York Inc. 1988

  • Hardcover ISBN: 978-0-387-96633-5Published: 17 December 1987

  • Softcover ISBN: 978-1-4612-8928-9Published: 05 October 2011

  • eBook ISBN: 978-1-4612-4570-4Published: 06 December 2012

  • Series ISSN: 0072-5285

  • Series E-ISSN: 2197-5612

  • Edition Number: 1

  • Number of Pages: X, 150

  • Topics: Analysis

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