Title :
A new numerical method on linear exterior boundary value problem in R2
Author :
Liyun Wu ; Zhengpeng Wu ; Tong Kang ; Guizhen Lu
Author_Institution :
Dept. of Appl. Math., Commun. Univ. of China, Beijing, China
Abstract :
In this paper, based on the boundary reduction advanced by Han, we present a new method for solving an exterior Dirichlet problem in the plane. The technique consists in coupling the boundary element with the mixed finite element method. An artifical boundary is introduced separating an interior region from an exterior one. From the theory of the boundary element in the exterior domain we deduce the connection which relates the solution and its normal derivative over the artificial boundary. These results are incorporated into the so-called mixed formulation of the problem in the interior region.
Keywords :
boundary-value problems; finite element analysis; artifical boundary; boundary element theory; boundary reduction; exterior Dirichlet problem; linear exterior boundary value problem; mixed finite element method; mixed formulation; normal derivative; numerical method; Boundary element methods; Boundary value problems; Couplings; Educational institutions; Equations; Integral equations;
Conference_Titel :
Advanced Computational Intelligence (ICACI), 2012 IEEE Fifth International Conference on
Conference_Location :
Nanjing
Print_ISBN :
978-1-4673-1743-6
DOI :
10.1109/ICACI.2012.6463275
