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Some Error Estimates for Numerical Solutions of Boundary Integral Equations

Chen, Goong / Zhou, Jianxin

Abstract Boundary integral equations can be numerically approximated by various methods. Let 10.1 $$Au(x) = g(x),\quad x\in\partial\Omega$$ be a boundary integral equation on the boundary ∂Ω of a domain Ω. Let {Vh}h be a family of finite-element spaces on ∂Ω. We can think of the Galerkin method for approximating (10.1).

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Some Error Estimates for Numerical Solutions of Boundary Integral Equations

Chen, Goong / Zhou, Jianxin

Abstract Boundary integral equations can be numerically approximated by various methods. Let 10.1 $$Au(x) = g(x),\quad x\in\partial\Omega$$ be a boundary integral equation on the boundary ∂Ω of a domain Ω. Let {Vh}h be a family of finite-element spaces on ∂Ω. We can think of the Galerkin method for approximating (10.1).

Some Error Estimates for Numerical Solutions of Boundary Integral Equations

Chen, Goong / Zhou, Jianxin

Abstract Boundary integral equations can be numerically approximated by various methods. Let 10.1 $$Au(x) = g(x),\quad x\in\partial\Omega$$ be a boundary integral equation on the boundary ∂Ω of a domain Ω. Let {Vh}h be a family of finite-element spaces on ∂Ω. We can think of the Galerkin method for approximating (10.1).

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Titel:

Some Error Estimates for Numerical Solutions of Boundary Integral Equations

Beteiligte:

Chen, Goong (Autor:in) / Zhou, Jianxin (Autor:in)

Erschienen in:

Boundary Element Methods with Applications to Nonlinear Problems ; 507-544

Atlantis Studies in Mathematics for Engineering and Science ; 7

Erscheinungsdatum:

01.01.2010

Format / Umfang:

38 pages

ISBN:

978-94-91216-27-5

ISSN:

DOI:

https://doi.org/10.2991/978-94-91216-27-5_10

Medientyp:

Aufsatz/Kapitel (Buch)

Format:

Elektronische Ressource

Sprache:

Englisch

Schlagwörter:

Error Estimate , Galerkin Method , Boundary Element Method , Boundary Integral Equation , Pseudodifferential Operator Mathematics , Operator Theory , Numerical Analysis

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