On the theoretical justification of Pocklington's equation

Xavier Claeys

doi:10.1142/S0218202509003802

On the theoretical justification of Pocklington's equation

Research output: Contribution to journal › Article › peer-review

Abstract

Pocklington's model consists in a one-dimensional integral equation relating the current at the surface of a straight finite wire to the tangential trace of an incident electromagnetic field. It is a simplification of the more usual single layer potential equation posed on a two-dimensional surface. We are interested in estimating the error between the solution of the exact integral equation and the solution of Pocklington's model. We address this problem for the model case of acoustics in a smooth geometry using results of asymptotic analysis.

Original language	English
Pages (from-to)	1325-1355
Number of pages	31
Journal	Mathematical Models and Methods in Applied Sciences
Volume	19
Issue number	8
DOIs	https://doi.org/10.1142/S0218202509003802
Publication status	Published - 1 Aug 2009

Keywords

Asymptotic models
Ellipsoidal coordinates
Helmholtz
Integral equation
Matched asymptotics
Thin wire

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10.1142/S0218202509003802

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abstract = "Pocklington's model consists in a one-dimensional integral equation relating the current at the surface of a straight finite wire to the tangential trace of an incident electromagnetic field. It is a simplification of the more usual single layer potential equation posed on a two-dimensional surface. We are interested in estimating the error between the solution of the exact integral equation and the solution of Pocklington's model. We address this problem for the model case of acoustics in a smooth geometry using results of asymptotic analysis.",

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AB - Pocklington's model consists in a one-dimensional integral equation relating the current at the surface of a straight finite wire to the tangential trace of an incident electromagnetic field. It is a simplification of the more usual single layer potential equation posed on a two-dimensional surface. We are interested in estimating the error between the solution of the exact integral equation and the solution of Pocklington's model. We address this problem for the model case of acoustics in a smooth geometry using results of asymptotic analysis.

KW - Asymptotic models

KW - Ellipsoidal coordinates

KW - Helmholtz

KW - Integral equation

KW - Matched asymptotics

KW - Thin wire

U2 - 10.1142/S0218202509003802

DO - 10.1142/S0218202509003802

M3 - Article

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EP - 1355

JO - Mathematical Models and Methods in Applied Sciences

JF - Mathematical Models and Methods in Applied Sciences

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ER -

On the theoretical justification of Pocklington's equation

Abstract

Keywords

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