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Integral, Measure, and Ordering

  • Book
  • © 1997

Overview

Authors:
  1. Beloslav Riečan

    1. Mathematical Institute, Slovak Academy of Sciences, Bratislava, Slovakia

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  2. Tibor Neubrunn
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Part of the book series: Mathematics and Its Applications (MAIA, volume 411)

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Table of contents (11 chapters)

  1. Front Matter

    Pages i-xiii
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  2. Sets and fuzzy sets

    • Beloslav Riečan, Tibor Neubrunn
    Pages 1-14

  3. Null sets and small systems

    • Beloslav Riečan, Tibor Neubrunn
    Pages 15-33

  4. Measures on ordered spaces

    • Beloslav Riečan, Tibor Neubrunn
    Pages 34-58

  5. Subadditive measures

    • Beloslav Riečan, Tibor Neubrunn
    Pages 59-69

  6. The Kurzweil integral in ordered spaces

    • Beloslav Riečan, Tibor Neubrunn
    Pages 70-102

  7. Quantum logics

    • Beloslav Riečan, Tibor Neubrunn
    Pages 103-126

  8. Fuzzy-quantum spaces

    • Beloslav Riečan, Tibor Neubrunn
    Pages 127-141

  9. Fuzzy quantum logics

    • Beloslav Riečan, Tibor Neubrunn
    Pages 142-182

  10. Probability on MV algebras

    • Beloslav Riečan, Tibor Neubrunn
    Pages 183-212

  11. The entropy of fuzzy dynamical systems

    • Beloslav Riečan, Tibor Neubrunn
    Pages 213-251

  12. Measurability and integrability of multifunctions

    • Beloslav Riečan, Tibor Neubrunn
    Pages 252-277

  13. Back Matter

    Pages 278-377
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Keywords

About this book

The present book is a monograph including some recent results of mea­ sure and integration theory. It concerns three main ideas. The first idea deals with some ordering structures such as Riesz spaces and lattice or­ dered groups, and their relation to measure and integration theory. The second is the idea of fuzzy sets, quite new in general, and in measure theory particularly. The third area concerns some models of quantum mechanical systems. We study mainly models based on fuzzy set theory. Some recent results are systematically presented along with our suggestions for further development. The first chapter has an introductory character, where we present basic definitions and notations. Simultaneously, this chapter can be regarded as an elementary introduction to fuzzy set theory. Chapter 2 contains an original approach to the convergence of sequences of measurable functions. While the notion of a null set can be determined uniquely, the notion of a set of "small" measure has a fuzzy character. It is interesting that the notion of fuzzy set and the notion of a set of small measure (described mathematically by so-called small systems) were introduced independently at almost the same time. Although the axiomatic systems in both theories mentioned are quite different, we show that the notion of a small system can be considered from the point of view of fuzzy sets.

Authors and Affiliations

  • Mathematical Institute, Slovak Academy of Sciences, Bratislava, Slovakia

    Beloslav Riečan

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