Ordinary and fractional approximation by non-additive integrals : Choquet, Shilkret and Sugeno integral approximators

Bibliographic Information

Ordinary and fractional approximation by non-additive integrals : Choquet, Shilkret and Sugeno integral approximators

George A. Anastassiou

(Studies in systems, decision and control / series editor Janusz Kacprzyk, v. 190)

Springer, c2019

Available at  / 2 libraries

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Includes bibliographical references

Description and Table of Contents

Description

Ordinary and fractional approximations by non-additive integrals, especially by integral approximators of Choquet, Silkret and Sugeno types, are a new trend in approximation theory. These integrals are only subadditive and only the first two are positive linear, and they produce very fast and flexible approximations based on limited data. The author presents both the univariate and multivariate cases. The involved set functions are much weaker forms of the Lebesgue measure and they were conceived to fulfill the needs of economic theory and other applied sciences. The approaches presented here are original, and all chapters are self-contained and can be read independently. Moreover, the book's findings are sure to find application in many areas of pure and applied mathematics, especially in approximation theory, numerical analysis and mathematical economics (both ordinary and fractional). Accordingly, it offers a unique resource for researchers, graduate students, and for coursework in the above-mentioned fields, and belongs in all science and engineering libraries.

Table of Contents

Approximation with rates by Kantorovich-Choquet quasi-interpolation neural network operators.- Approximation with rates by Perturbed Kantorovich-Choquet Neural Network Operators.- Approximation with rates by Shift Invariant Univariate Sublinear-Choquet Operators.- Approximation with rates by Shift Invariant Multivariate Sublinear-Choquet Operators.- Hardy type inequalities for Choquet integrals.- Quantitative Approximation by Choquet integrals.- Conformable Fractional Approximation by Choquet integrals.- Multivariate and Convex Quantitative Approximation by Choquet integrals.- Caputo and Canavati fractional Quantitative Approximation by Choquet integrals.- Mixed Conformable and Iterated fractional Quantitative Approximation by Choquet integrals.

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Details

  • NCID
    BB27726697
  • ISBN
    • 9783030042868
  • LCCN
    2018961216
  • Country Code
    sz
  • Title Language Code
    eng
  • Text Language Code
    eng
  • Place of Publication
    Cham
  • Pages/Volumes
    xiv, 347 p.
  • Size
    25 cm
  • Parent Bibliography ID
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