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二维圆域中Poisson方程反源问题的数值方法 被引量:2

A Numerical Method for Inverse Source Problem of Poisson Equation in 2D Disc Domains
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摘要 讨论二维圆域中Poisson方程的反源问题.根据边值问题解的复函数表示形式及Cauchy积分公式,导出了点源参数与边界条件的代数关系,从而构造了一种代数方法重构单极子源或偶极子源.该方法不需要求解正问题或进行任何迭代,因此更直接、计算量更小.数值结果表明,所给算法是有效的. This paper deals with an inverse source problem of the Poisson equation in a disc domain. Based on the complex expression of the solution to the boundary problem, an algebraic relation between the parameters of the point sources and the boundary conditions was deduced by means of the Cauchy integral formula. Then an algebraic numerical algorithm was proposed to reconstruct the dipoles or monopoles. Since the algorithm does not need solving the forward problem or any iterative procedure, it is direct and reduces the calculation amount. For the purpose of verifying the validity of the algorithm, numerical examples were provided.
作者 王红艳 马富明
机构地区 吉林大学数学研究所
出处 《吉林大学学报(理学版)》 CAS CSCD 北大核心 2010年第2期214-218,共5页 Journal of Jilin University:Science Edition
基金 国家重点基础研究发展计划973项目基金(批准号:2005CB321701)
关键词 反源问题 柯西积分公式 极点 支点 单极子源 偶极子源 inverse source problem Cauchy integral formula pole branch point monopole source dipole source
分类号 O241.82 [理学—计算数学]
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参考文献8

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同被引文献13

  • 1KIRSCH A. An introduction to the mathematical theory of inverse problems[ M]. New York:Springer, 1996.
  • 2MALEKNEJAD K, SOHRABI S. Numerical solution of Fredholm integral equations of the first kind by using Legendre wavelets [ J ]. Applied Mathematics and Computation, 2007,186 : 836 - 843.
  • 3MALEKNEJAD K, AGHAZADEH N, MOLLAPOURASL R. Numerical solution of Fredholm integral equationof the first kind with collocation method and estimation of error bound[ J]. Applied Mathematics and Computation, 2006,179:352- 359.
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  • 6FERAS M, FAQIH AL. Direct methods for the solution of singular integral equations with finite number of different zeros in pairwise [ J ]. Int J Open Problems CompMath, 2009, 2 ( 1 ) :152 - 158.
  • 7杨海东,肖宜,王卓民,邵东国,刘碧玉.突发性水污染事件溯源方法[J].水科学进展,2014,25(1):122-129. 被引量:50
  • 8吴自库,李福乐,DO Young Kwak.一维热传导方程热源反问题基于最小二乘法的正则化方法[J].计算物理,2016,33(1):49-56. 被引量:20
  • 9王世豪,杨红雨,李玉贞,刘洪,杨波.改进自适应微分进化算法求解全局优化问题[J].计算机应用研究,2016,33(12):3634-3637. 被引量:4
  • 10徐宗本,杨燕,孙剑.求解反问题的一个新方法:模型求解与范例学习结合[J].中国科学:数学,2017,47(10):1345-1354. 被引量:5

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吉林大学学报(理学版)
2010年 第2期

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