|Title:||Construction of Green's function using null-field integral approach for Laplace problems with circular boundaries||Authors:||Jeng-Tzong Chen
|Keywords:||degenerate kernel;Fourier series;Green's function;null-field approach;Poisson integral formula||Issue Date:||Feb-2009||Publisher:||Tech Science Press||Journal Volume:||9||Journal Issue:||2||Start page/Pages:||93-110||Source:||Computers, Materials & Continua||Abstract:||
A null-field approach is employed to derive the Green's function for boundary value problems stated for the Laplace equation with circular boundaries. The kernel function and boundary density are expanded by using the degenerate kernel and Fourier series, respectively. Series-form Green's function for interior and exterior problems of circular boundary are derived and plotted in a good agreement with the closed-form solution. The Poisson integral formula is extended to an annular case from a circle. Not only an eccentric ring but also a half-plane problem with an aperture are demonstrated to see the validity of the present approach. Besides, a half-plane problem with a circular hole subject to Dirichlet and Robin boundary conditions and a half-plane problem with a circular hole and a semi-circular inclusion are solved. Good agreement is made after comparing with the Melnikov's results.
|Appears in Collections:||河海工程學系|
Items in DSpace are protected by copyright, with all rights reserved, unless otherwise indicated.