Fast iteration algorithm for integral equations of the first kind arising in 2D diffraction by soft obstacles

A Scalia; V Popuzin; MARZIO ALFIO PENNISI

doi:10.1142/S0218396X13500070

Fast iteration algorithm for integral equations of the first kind arising in 2D diffraction by soft obstacles

A Scalia
, V Popuzin
, MARZIO ALFIO PENNISI

Department of Science and Technological Innovation

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

Abstract

We propose a new iteration numerical algorithm to solve boundary integral equations of the first kind arising in the 2D scattering by soft obstacles. The main idea is to operate on each iteration step with an integral equation, which has a convolution kernel, by changing the full kernel with a special averaging procedure. The practical convergence of the algorithm is demonstrated by some examples for three different geometries. If M is the number of iterations then the computational cost of the algorithm is MNlog(N).

Original language	English
Number of pages	10
Journal	Journal of Computational Acoustics
Volume	21
Issue number	3
DOIs	https://doi.org/10.1142/S0218396X13500070
Publication status	Published - 2013

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10.1142/S0218396X13500070

http://hdl.handle.net/11579/118136

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title = "Fast iteration algorithm for integral equations of the first kind arising in 2D diffraction by soft obstacles",

abstract = "We propose a new iteration numerical algorithm to solve boundary integral equations of the first kind arising in the 2D scattering by soft obstacles. The main idea is to operate on each iteration step with an integral equation, which has a convolution kernel, by changing the full kernel with a special averaging procedure. The practical convergence of the algorithm is demonstrated by some examples for three different geometries. If M is the number of iterations then the computational cost of the algorithm is MNlog(N).",

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AU - Scalia, A

AU - Popuzin, V

AU - PENNISI, MARZIO ALFIO

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Y1 - 2013

N2 - We propose a new iteration numerical algorithm to solve boundary integral equations of the first kind arising in the 2D scattering by soft obstacles. The main idea is to operate on each iteration step with an integral equation, which has a convolution kernel, by changing the full kernel with a special averaging procedure. The practical convergence of the algorithm is demonstrated by some examples for three different geometries. If M is the number of iterations then the computational cost of the algorithm is MNlog(N).

AB - We propose a new iteration numerical algorithm to solve boundary integral equations of the first kind arising in the 2D scattering by soft obstacles. The main idea is to operate on each iteration step with an integral equation, which has a convolution kernel, by changing the full kernel with a special averaging procedure. The practical convergence of the algorithm is demonstrated by some examples for three different geometries. If M is the number of iterations then the computational cost of the algorithm is MNlog(N).

UR - https://iris.uniupo.it/handle/11579/118136

U2 - 10.1142/S0218396X13500070

DO - 10.1142/S0218396X13500070

M3 - Article

SN - 0218-396X

VL - 21

JO - Journal of Computational Acoustics

JF - Journal of Computational Acoustics

IS - 3

ER -

Fast iteration algorithm for integral equations of the first kind arising in 2D diffraction by soft obstacles

Abstract

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