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解弹性力学第二类边界积分方程的求积法与分裂外推
引用本文:黄晋,朱瑞,吕涛. 解弹性力学第二类边界积分方程的求积法与分裂外推[J]. 计算物理, 2006, 23(6): 706-712
作者姓名:黄晋  朱瑞  吕涛
作者单位:电子科技大学应用数学学院,四川,成都,610054;四川大学数学学院,四川,成都,610064
摘    要:利用Sidi奇异求积公式,提出了解曲边多角形域上线性弹性力学第二类边界积分方程的求积法,即离散矩阵的每个元素的生成只需赋值不需计算任何奇异积分.通过估计离散矩阵的特征值和利用Anselone聚紧收敛理论,证明了近似解的收敛性;同时得到了误差的多参数渐近展开式;通过并行地解粗网格上的离散方程,利用分裂外推获得了高精度近似解和后验误差.

关 键 词:线性弹性力学  奇异积分方程  求积法  分裂外推  后验误差  多角形域
文章编号:1001-246X(2006)06-0706-07
收稿时间:2005-07-04
修稿时间:2005-12-05

A Quadrature Method and Splitting Extrapolation for Second-kind Boundary Integral Equations in Elasticity Problems
HUANG Jin,ZHU Rui,L Tao. A Quadrature Method and Splitting Extrapolation for Second-kind Boundary Integral Equations in Elasticity Problems[J]. Chinese Journal of Computational Physics, 2006, 23(6): 706-712
Authors:HUANG Jin  ZHU Rui  L Tao
Affiliation:1. College of Applied Mathematics, University of Electronic & Science Technology of China, Chengdu 610054, China;2. Mathematical College, Sichuan University, Chengdu 610064, China
Abstract:With singular quadrature rules, a quadrature method for the second-kind boundary integral equations in linear elasticity problems on polygonal domains is proposed. The discrete matrix can be obtained with no Cauchy singular integral. With the collectively compact convergent theory, we establish a convergence theorem of approximation and get multivariate asymptotic expansions of error. Solving the discrete equations with coarse meshed partitions in paralle, high accurary approximations are obtained by the splitting extrapolation. A posterior error is derived.
Keywords:linear elasticity problem   singular integral equation   splitting extrapolation   quadrature method   a posteriori error   polygonal region
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