Direct Method Of Solution For General Boundary
Value Problem Of The Laplace Equation

K. Onishi; Y. Ohura

doi:10.2495/BE000201

Direct Method Of Solution For General Boundary Value Problem Of The Laplace Equation

Price

Free (open access)

Transaction

WIT Transactions on Modelling and Simulation

Volume

Pages

Published

2000

Size

448 kb

Paper DOI

10.2495/BE000201

WIT Press

Author(s)

K. Onishi & Y. Ohura

Abstract

Two-dimensional Laplace equation is considered in the domian enclosed by a smooth curve. The Dirichlet data are prescribed on a part of the bound- ary, while the Neumann data are prescribed on a part of the boundary. This problem is reformulated in terms of the variational problem, which is then recast into primary and dual boundary value problems of the Laplace equation. A direct method of solution using the BEM is presented. This proposes a unified treatment of conventional boundary value problem, the Cauchy problem, and under- or over-determined problems. 1 Introduction Let £1 be a simply connected bounded domain with its smooth boundary F in JR^ Let n be the exterior normal to the boundary. We consider the Laplace equation;

Keywords

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Code

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