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二维弹性问题边界元法中边界层效应问题的变换法 被引量:6

A transformation algorithm applied to boundary layer effect in BEM for elastic plane problems
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摘要 基于间接规则化边界积分方程,有效估计奇异边界积分,准确求得边界量,为场变量的计算奠定了基础。在计算场变量时,针对二维弹性力学边界元法中出现的几乎奇异积分,本文采用一类非线性变量替换法,有效地改善了被积函数的震荡特性,从而消除了核积分的几乎奇异性;在不增加计算量的情况下,极大地改进了几乎奇异积分计算的精度,成功地求解了弹性体近边界点上的力学参量,避免了边界层效应。此外,本文引入一种精确几何单元逼近,对于圆弧边界,这样的插值逼近几乎是精确的,提高了计算精度。数值算例表明,本文算法稳定,效率高,并可达到很高的计算精度,即使场点非常靠近边界,如场点到积分单元的距离小到纳米级,仍可避免边界层效应现象。 To begin with,a regularized boundary integral equation with indirect formulation is adopted to deal with the singular integrals and the boundary unknown quantities can be calculated accurately.When it comes to the physical quantities at the interior points,an efficient non-linear transformation is utilized to evaluate the nearly singular integrals occurring in two-dimensional(2D)elastic problems.The proposed transformation can remove or damp out the near singularity efficiently and can improve the accuracy of numerical results of nearly singular integrals greatly without increasing other computational efforts.Moreover,an exact geometrical representation,named"arc element",was introduced to remove the errors caused by representing arc geometries using polynomial shape functions,and therefore the computational accuracy can be improved efficiently.Numerical examples show the high efficiency and stability of the present approach,and the"boundary layer effect"can be avoided efficiently even when the internal point is very close to the boundary,i.e.,when the distance of the computed point to the boundary as small as 10-9.
作者 张耀明 刘召颜 谷岩 李功胜
机构地区 山东理工大学理学院应用数学所
出处 《计算力学学报》 EI CAS CSCD 北大核心 2010年第5期775-780,共6页 Chinese Journal of Computational Mechanics
基金 国家自然科学基金(10571110 11071148) 山东省自然科学基金重点(ZR2010AZ003)资助项目
关键词 弹性问题 边界元法 边界层效应 几乎奇异积分 变换法 elastic problems BEM boundary layer effect nearly singular integrals transformation
分类号 O342 [理学—固体力学]
  • 相关文献

参考文献15

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二级参考文献8

共引文献51

同被引文献41

  • 1牛忠荣,王左辉,胡宗军,周焕林.二维边界元法中几乎奇异积分的解析法[J].工程力学,2004,21(6):113-117. 被引量:15
  • 2周焕林,牛忠荣,王秀喜,程长征.正交各向异性位势问题边界元法中几乎奇异积分的解析算法[J].应用力学学报,2005,22(2):193-197. 被引量:8
  • 3周焕林,牛忠荣,王秀喜.三维位势问题边界元法中几乎奇异积分的正则化[J].计算物理,2005,22(6):501-506. 被引量:11
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  • 9Johnston P R, Johnston B M, Elliott D. Using the iterated sinh transformation to evaluate two dimensional nearly singular boundary element integrals[J]. Engineering Analysis With Boundary Elements, 2013, 37(4) : 708-718.
  • 10Gu Y, Chen W, Zhang C Z. The sinh transformation for evaluating nearly singular boundary el- ement integrals over high-order geometry elements[J]. Engineering Analysis With BoundaryE/ements, 2013, 37(2): 301-308.

引证文献6

二级引证文献13

计算力学学报
2010年 第5期

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