Wave Factorization of Elliptic Symbols: Theory and Applications [electronic resource] : Introduction to the Theory of Boundary Value Problems in Non-Smooth Domains /

Wave Factorization of Elliptic Symbols: Theory and Applications [electronic resource] : Introduction to the Theory of Boundary Value Problems in Non-Smooth Domains /

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To summarize briefly, this book is devoted to an exposition of the foundations of pseudo differential equations theory in non-smooth domains. The elements of such a theory already exist in the literature and can be found in such papers and monographs as [90,95,96,109,115,131,132,134,135,136,146, 163,165,169,170,182,184,214-218]. In this book, we will employ a theory that is based on quite different principles than those used previously. However, precisely one of the standard principles is left without change, the "freezing of coefficients" principle. The first main difference in our exposition begins at the point when the "model problem" appears. Such a model problem for differential equations and differential boundary conditions was first studied in a fundamental paper of V. A. Kondrat'ev [134]. Here also the second main difference appears, in that we consider an already given boundary value problem. In some transformations this boundary value problem was reduced to a boundary value problem with a parameter . -\ in a domain with smooth boundary, followed by application of the earlier results of M. S. Agranovich and M. I. Vishik. In this context some operator-function R('-\) appears, and its poles prevent invertibility; iffor differential operators the function is a polynomial on A, then for pseudo differential operators this dependence on . -\ cannot be defined. Ongoing investigations of different model problems are being carried out with approximately this plan, both for differential and pseudodifferential boundary value problems.

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Main Authors: Vasil’ev, Vladimir B. author., SpringerLink (Online service)
Format: Texto biblioteca
Language:eng
Published: Dordrecht : Springer Netherlands : Imprint: Springer, 2000
Subjects:Mathematics., Mathematical analysis., Analysis (Mathematics)., Functional analysis., Integral equations., Operator theory., Partial differential equations., Mechanics., Partial Differential Equations., Functional Analysis., Analysis., Integral Equations., Operator Theory.,
Online Access:http://dx.doi.org/10.1007/978-94-015-9448-6
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id KOHA-OAI-TEST:180873
record_format koha
institution COLPOS
collection Koha
country México
countrycode MX
component Bibliográfico
access En linea
En linea
databasecode cat-colpos
tag biblioteca
region America del Norte
libraryname Departamento de documentación y biblioteca de COLPOS
language eng
topic Mathematics.
Mathematical analysis.
Analysis (Mathematics).
Functional analysis.
Integral equations.
Operator theory.
Partial differential equations.
Mechanics.
Mathematics.
Partial Differential Equations.
Functional Analysis.
Analysis.
Integral Equations.
Operator Theory.
Mechanics.
Mathematics.
Mathematical analysis.
Analysis (Mathematics).
Functional analysis.
Integral equations.
Operator theory.
Partial differential equations.
Mechanics.
Mathematics.
Partial Differential Equations.
Functional Analysis.
Analysis.
Integral Equations.
Operator Theory.
Mechanics.
spellingShingle Mathematics.
Mathematical analysis.
Analysis (Mathematics).
Functional analysis.
Integral equations.
Operator theory.
Partial differential equations.
Mechanics.
Mathematics.
Partial Differential Equations.
Functional Analysis.
Analysis.
Integral Equations.
Operator Theory.
Mechanics.
Mathematics.
Mathematical analysis.
Analysis (Mathematics).
Functional analysis.
Integral equations.
Operator theory.
Partial differential equations.
Mechanics.
Mathematics.
Partial Differential Equations.
Functional Analysis.
Analysis.
Integral Equations.
Operator Theory.
Mechanics.
Vasil’ev, Vladimir B. author.
SpringerLink (Online service)
Wave Factorization of Elliptic Symbols: Theory and Applications [electronic resource] : Introduction to the Theory of Boundary Value Problems in Non-Smooth Domains /
description To summarize briefly, this book is devoted to an exposition of the foundations of pseudo differential equations theory in non-smooth domains. The elements of such a theory already exist in the literature and can be found in such papers and monographs as [90,95,96,109,115,131,132,134,135,136,146, 163,165,169,170,182,184,214-218]. In this book, we will employ a theory that is based on quite different principles than those used previously. However, precisely one of the standard principles is left without change, the "freezing of coefficients" principle. The first main difference in our exposition begins at the point when the "model problem" appears. Such a model problem for differential equations and differential boundary conditions was first studied in a fundamental paper of V. A. Kondrat'ev [134]. Here also the second main difference appears, in that we consider an already given boundary value problem. In some transformations this boundary value problem was reduced to a boundary value problem with a parameter . -\ in a domain with smooth boundary, followed by application of the earlier results of M. S. Agranovich and M. I. Vishik. In this context some operator-function R('-\) appears, and its poles prevent invertibility; iffor differential operators the function is a polynomial on A, then for pseudo differential operators this dependence on . -\ cannot be defined. Ongoing investigations of different model problems are being carried out with approximately this plan, both for differential and pseudodifferential boundary value problems.
format Texto
topic_facet Mathematics.
Mathematical analysis.
Analysis (Mathematics).
Functional analysis.
Integral equations.
Operator theory.
Partial differential equations.
Mechanics.
Mathematics.
Partial Differential Equations.
Functional Analysis.
Analysis.
Integral Equations.
Operator Theory.
Mechanics.
author Vasil’ev, Vladimir B. author.
SpringerLink (Online service)
author_facet Vasil’ev, Vladimir B. author.
SpringerLink (Online service)
author_sort Vasil’ev, Vladimir B. author.
title Wave Factorization of Elliptic Symbols: Theory and Applications [electronic resource] : Introduction to the Theory of Boundary Value Problems in Non-Smooth Domains /
title_short Wave Factorization of Elliptic Symbols: Theory and Applications [electronic resource] : Introduction to the Theory of Boundary Value Problems in Non-Smooth Domains /
title_full Wave Factorization of Elliptic Symbols: Theory and Applications [electronic resource] : Introduction to the Theory of Boundary Value Problems in Non-Smooth Domains /
title_fullStr Wave Factorization of Elliptic Symbols: Theory and Applications [electronic resource] : Introduction to the Theory of Boundary Value Problems in Non-Smooth Domains /
title_full_unstemmed Wave Factorization of Elliptic Symbols: Theory and Applications [electronic resource] : Introduction to the Theory of Boundary Value Problems in Non-Smooth Domains /
title_sort wave factorization of elliptic symbols: theory and applications [electronic resource] : introduction to the theory of boundary value problems in non-smooth domains /
publisher Dordrecht : Springer Netherlands : Imprint: Springer,
publishDate 2000
url http://dx.doi.org/10.1007/978-94-015-9448-6
work_keys_str_mv AT vasilevvladimirbauthor wavefactorizationofellipticsymbolstheoryandapplicationselectronicresourceintroductiontothetheoryofboundaryvalueproblemsinnonsmoothdomains
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spelling KOHA-OAI-TEST:1808732018-07-30T23:00:59ZWave Factorization of Elliptic Symbols: Theory and Applications [electronic resource] : Introduction to the Theory of Boundary Value Problems in Non-Smooth Domains / Vasil’ev, Vladimir B. author. SpringerLink (Online service) textDordrecht : Springer Netherlands : Imprint: Springer,2000.engTo summarize briefly, this book is devoted to an exposition of the foundations of pseudo differential equations theory in non-smooth domains. The elements of such a theory already exist in the literature and can be found in such papers and monographs as [90,95,96,109,115,131,132,134,135,136,146, 163,165,169,170,182,184,214-218]. In this book, we will employ a theory that is based on quite different principles than those used previously. However, precisely one of the standard principles is left without change, the "freezing of coefficients" principle. The first main difference in our exposition begins at the point when the "model problem" appears. Such a model problem for differential equations and differential boundary conditions was first studied in a fundamental paper of V. A. Kondrat'ev [134]. Here also the second main difference appears, in that we consider an already given boundary value problem. In some transformations this boundary value problem was reduced to a boundary value problem with a parameter . -\ in a domain with smooth boundary, followed by application of the earlier results of M. S. Agranovich and M. I. Vishik. In this context some operator-function R('-\) appears, and its poles prevent invertibility; iffor differential operators the function is a polynomial on A, then for pseudo differential operators this dependence on . -\ cannot be defined. Ongoing investigations of different model problems are being carried out with approximately this plan, both for differential and pseudodifferential boundary value problems.1. Distributions and their Fourier transforms -- 2. Multidimensional complex analysis -- 3. Sobolev-Slobodetskii spaces -- 4. Pseudodifferential operators and equations in a half-space -- 5. Wave factorization -- 6. Diffraction on a quadrant -- 7. The problem of indentation of a wedge-shaped punch -- 8. Equations in an infinite plane angle -- 9. General boundary value problems -- 10. The Laplacian in a plane infinite angle -- 11. Problems with potentials -- Appendix 1: The multidimensional Riemann problem -- Appendix 2: Symbolic calculus, Noether property, index, regularization -- Appendix 3: The Mellin transform -- References.To summarize briefly, this book is devoted to an exposition of the foundations of pseudo differential equations theory in non-smooth domains. The elements of such a theory already exist in the literature and can be found in such papers and monographs as [90,95,96,109,115,131,132,134,135,136,146, 163,165,169,170,182,184,214-218]. In this book, we will employ a theory that is based on quite different principles than those used previously. However, precisely one of the standard principles is left without change, the "freezing of coefficients" principle. The first main difference in our exposition begins at the point when the "model problem" appears. Such a model problem for differential equations and differential boundary conditions was first studied in a fundamental paper of V. A. Kondrat'ev [134]. Here also the second main difference appears, in that we consider an already given boundary value problem. In some transformations this boundary value problem was reduced to a boundary value problem with a parameter . -\ in a domain with smooth boundary, followed by application of the earlier results of M. S. Agranovich and M. I. Vishik. In this context some operator-function R('-\) appears, and its poles prevent invertibility; iffor differential operators the function is a polynomial on A, then for pseudo differential operators this dependence on . -\ cannot be defined. Ongoing investigations of different model problems are being carried out with approximately this plan, both for differential and pseudodifferential boundary value problems.Mathematics.Mathematical analysis.Analysis (Mathematics).Functional analysis.Integral equations.Operator theory.Partial differential equations.Mechanics.Mathematics.Partial Differential Equations.Functional Analysis.Analysis.Integral Equations.Operator Theory.Mechanics.Springer eBookshttp://dx.doi.org/10.1007/978-94-015-9448-6URN:ISBN:9789401594486

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