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    Pseudodifferential Operators and Their Fredholm Properties

    New search for: Chen, Goong
    New search for: Zhou, Jianxin

    Abstract Pseudodifferential operators are a natural extension of linear integral and partial differential operators. The theory of such operators grew out of the study of singular integral operators by Giraud, Mikhlin, Calderón and Zygmund, among others. It developed rapidly after 1965 with the systematic studies of Kohn and Nirenberg [114], Hörmander, and other researchers. This theory has found many fields of application. In particular, all the boundary integral operators corresponding to the elliptic boundary value problems studied in this book are such operators. By using such a theory, the analysis of boundary integral equations and boundary element methods can be either greatly simplified or presented in a more general and elegant form.

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    Pseudodifferential Operators and Their Fredholm Properties

    New search for: Chen, Goong
    New search for: Zhou, Jianxin

    Abstract Pseudodifferential operators are a natural extension of linear integral and partial differential operators. The theory of such operators grew out of the study of singular integral operators by Giraud, Mikhlin, Calderón and Zygmund, among others. It developed rapidly after 1965 with the systematic studies of Kohn and Nirenberg [114], Hörmander, and other researchers. This theory has found many fields of application. In particular, all the boundary integral operators corresponding to the elliptic boundary value problems studied in this book are such operators. By using such a theory, the analysis of boundary integral equations and boundary element methods can be either greatly simplified or presented in a more general and elegant form.

    Access

    Check access
    Check availability in my library
    Order at Subito €

    Pseudodifferential Operators and Their Fredholm Properties

    New search for: Chen, Goong
    New search for: Zhou, Jianxin

    Abstract Pseudodifferential operators are a natural extension of linear integral and partial differential operators. The theory of such operators grew out of the study of singular integral operators by Giraud, Mikhlin, Calderón and Zygmund, among others. It developed rapidly after 1965 with the systematic studies of Kohn and Nirenberg [114], Hörmander, and other researchers. This theory has found many fields of application. In particular, all the boundary integral operators corresponding to the elliptic boundary value problems studied in this book are such operators. By using such a theory, the analysis of boundary integral equations and boundary element methods can be either greatly simplified or presented in a more general and elegant form.

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    Title:

    Pseudodifferential Operators and Their Fredholm Properties

    Contributors:

    Chen, Goong (author) / Zhou, Jianxin (author)

    Published in:

    Boundary Element Methods with Applications to Nonlinear Problems ; 63-122

    Atlantis Studies in Mathematics for Engineering and Science ; 7

    Publication date:

    2010-01-01

    Size:

    60 pages

    ISBN:

    978-94-91216-27-5

    ISSN:

    1875-7642

    DOI:

    https://doi.org/10.2991/978-94-91216-27-5_4

    Type of media:

    Article/Chapter (Book)

    Type of material:

    Electronic Resource

    Language:

    English

    Keywords:

    Banach Space , Nonlinear Problem , Boundary Element Method , Compatibility Condition , Boundary Integral Equation Mathematics , Operator Theory , Numerical Analysis

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