An Effective Boundary-Element Analysis of Three-Dimensional Unsteady Convective Diffusion Equation Using Kernel Approximation

Yasuhiro TANAKA; Toshihisa HONMA

An Effective Boundary-Element Analysis of Three-Dimensional Unsteady Convective Diffusion Equation Using Kernel Approximation

Yasuhiro TANAKA, Toshihisa HONMA

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In order to effectively solve a three-dimensional unsteady convective diffusion equation, kernel approximation is introduced into the boundary integral procedure in the boundary-element method. It is shown that the present method gives a good approximate solution of the convective diffusion equation in case of not a dominant convection. Also, we find that very fast numerical integration can be carried out on supercomputers.

Publication: IEICE TRANSACTIONS on transactions Vol.E71-E No.4 pp.309-311

Publication Date: 1988/04/25

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Type of Manuscript: Special Section LETTER (Special Issue: Papers from 1988 Spring Convention IEICE)

Category: Electromagnetic Theory and Microwave Circuits

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Yasuhiro TANAKA
Toshihisa HONMA

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Yasuhiro TANAKA, Toshihisa HONMA, "An Effective Boundary-Element Analysis of Three-Dimensional Unsteady Convective Diffusion Equation Using Kernel Approximation" in IEICE TRANSACTIONS on transactions, vol. E71-E, no. 4, pp. 309-311, April 1988, doi: .
Abstract: In order to effectively solve a three-dimensional unsteady convective diffusion equation, kernel approximation is introduced into the boundary integral procedure in the boundary-element method. It is shown that the present method gives a good approximate solution of the convective diffusion equation in case of not a dominant convection. Also, we find that very fast numerical integration can be carried out on supercomputers.
URL: https://globals.ieice.org/en_transactions/transactions/10.1587/e71-e_4_309/_p

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@ARTICLE{e71-e_4_309,
author={Yasuhiro TANAKA, Toshihisa HONMA, },
journal={IEICE TRANSACTIONS on transactions},
title={An Effective Boundary-Element Analysis of Three-Dimensional Unsteady Convective Diffusion Equation Using Kernel Approximation},
year={1988},
volume={E71-E},
number={4},
pages={309-311},
abstract={In order to effectively solve a three-dimensional unsteady convective diffusion equation, kernel approximation is introduced into the boundary integral procedure in the boundary-element method. It is shown that the present method gives a good approximate solution of the convective diffusion equation in case of not a dominant convection. Also, we find that very fast numerical integration can be carried out on supercomputers.},
keywords={},
doi={},
ISSN={},
month={April},}

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TY - JOUR
TI - An Effective Boundary-Element Analysis of Three-Dimensional Unsteady Convective Diffusion Equation Using Kernel Approximation
T2 - IEICE TRANSACTIONS on transactions
SP - 309
EP - 311
AU - Yasuhiro TANAKA
AU - Toshihisa HONMA
PY - 1988
DO -
JO - IEICE TRANSACTIONS on transactions
SN -
VL - E71-E
IS - 4
JA - IEICE TRANSACTIONS on transactions
Y1 - April 1988
AB - In order to effectively solve a three-dimensional unsteady convective diffusion equation, kernel approximation is introduced into the boundary integral procedure in the boundary-element method. It is shown that the present method gives a good approximate solution of the convective diffusion equation in case of not a dominant convection. Also, we find that very fast numerical integration can be carried out on supercomputers.
ER -