期刊文献+
任意字段
题名或关键词
题名
关键词
文摘
作者
第一作者
机构
刊名
分类号
参考文献
作者简介
基金资助
栏目信息

二维稳态对流扩散问题的直接边界元方法 被引量:2

A Direct Boundary Element Methods for Two Dimensional Steady-State Convection-Diffusion Problems
在线阅读 下载PDF
导出
摘要 讨论了基于指数变量变换的二维稳态对流扩散方程的直接边界元解法,把对流扩散方程转化为与之等价的修正Helmholtz方程,利用其基本解和G reen公式得到相应的直接边界积分方程和解的积分表达式.然后,通过逆变换推导出对流扩散方程的直接边界积分方程和解的积分表达式,并采用常单元来离散边界积分方程,完成对流扩散方程的求解.最后,通过数值算例验证方法的有效性. A direct boundary element methods based on exponential variable transformation for solving two-dimensional steady-state convection-diffusion problems is described in this paper first. Second, use of the exponential variable transformation, the convection-diffusion equation is converted into a modified Helmholz equation. The fundamental solution of Helmholz equation and Green formula were used to obtain the direct boundary integral equation. And then, the direct boundary integral equation of convection-diffusion was obtained by using inverse transformation, which is a discrete by using constant elements. Finally, the whole course of solving convection-diffusion is completed and validity of the methods is discussed by test example.
作者 陈永光
机构地区 重庆大学数理学院
出处 《海南大学学报(自然科学版)》 CAS 2006年第1期17-21,共5页 Natural Science Journal of Hainan University
关键词 对流扩散 边界元 常单元 convection-diffusion boundary elements constant boundary elements
分类号 O241.82 [理学—计算数学]
  • 相关文献

参考文献9

  • 1何文平,封国林,董文杰,李建平.求解对流扩散方程的四种差分格式的比较[J].物理学报,2004,53(10):3258-3264. 被引量:17
  • 2陈则民.对流扩散方程的有限元方法[J].天津轻工业学院学报,1995,10(2):49-51. 被引量:4
  • 3哈什姆,胡健伟,王庆晟.非线性对流扩散方程的迎风有限元格式(英文)[J].南开大学学报(自然科学版),2002,35(2):51-55. 被引量:2
  • 4任宗修,杨明波.对流扩散问题的特征拟谱方法[J].河南师范大学学报(自然科学版),2004,32(1):17-20. 被引量:3
  • 5FRANK Penzel.A boundary integral method applied to a convection-diffusion problem[J].Journal of Computational and Applied Mathematics,1999,111:217-226.
  • 6KRISHNA M S,MASATAKA Tanaka.Analytical integration of weakly singular integrals in boundary element analysis of Helmholtz and advection-diffusion equations[J].Comput Methods Appl Mech Engrg,2000,189:625 -640.
  • 7TELLES J.Self-adaptive co-ordinate transformation for efficient numerical evaluation of general boundary element integrals[J].International Journal of Numerical Methods in Engineering,1987,24:959-973.
  • 8DOBLARE M,GARCIA L.On non-linear transformation for the integrals of weakly singular and Cauchy principal value integrals[J].International Journal of Numerical Methods in Engineering,1997,40:3325-3358.
  • 9KRISHNA M S,MASATAKA Tanaka.On exponential variable transformation based boundary element formulation for advection-diffusion problems[J].Engineering Analysis with Boundary Elements,2000,24:225 -235.

二级参考文献19

  • 1林振山,史芳斌。王辉.天津局地气候的反演建模及其研究[J].气象学报,1995,53(1):115-121. 被引量:36
  • 2秦学志,年四洪,刘慧,罗远诠.抛物型偏微分方程的变步长显式差分解法[J].大连理工大学学报,1996,36(6):651-656. 被引量:1
  • 3[1]Tabata M. Some application of the upwind finite element method [J]. Theoretical and Applied Mechanics,1979,27:277~282
  • 4[2]Angermann L. Error estimates for the finite element solution of an elliptic singularly perturbed problem [J]. IMA,J of Numerical Analysis,1995,15:161~196
  • 5[3]Baba K, Tabara M. On a conservation upwind finite element scheme for convection-diffution equation [J]. R A I R O, Numerical Analysis 1981,15(1):3~25
  • 6[4]Ikeda T. Maximum Principle Finite Element Models for Convection-Diffution Phenomena [M]. Amsterdam:North Holland 1983
  • 7[6]Feistaure M, Jiri Felcrnan. On the convergence of a combined finite volume-finite elemtet for nonlinear convection diffution problems [J]. Numerical Method Partial Differential Equation Numer,1997,13:163~190
  • 8[7]Sardella M. On a coupled finite element-finite volume method for convection-diffution problems [J]. IMA, J of Numerical Analysis, 2000,20:281~301, 265~374
  • 9[8]Ciarlet P G. The Fnite Element Method for Elliptic Problem [M]. Amsterdam: North Holland, 1978
  • 10[9]Thomee V. Galerkin Finite Element for Parabolic Problem [M]. Berlin: Springer Verlag, 1984

共引文献20

同被引文献8

  • 1丁方允,吕涛涛.具非线性边值条件的二维Helmholtz方程的边界元分析[J].兰州大学学报(自然科学版),1994,30(3):25-30. 被引量:12
  • 2祝家麟.椭圆边值问题的边界元分析[M].北京:科学出版社,1993.
  • 3ERLANGGA Y A. A Robust and Efficient Iterative Method for the Numerical Solution of the Helmholtz Equation [D ]. Delft: Technisehe Universiteit Delft, 2005.
  • 4王竹溪,郭敦仁.函数论.特殊函数概论[M].北京:国防工业出版社,1983.
  • 5WANG Hui, QIN Qing-hua. A mesh less method for generalized linear or nonlinear possion-type problems[J]. Engineering Analysis with Boundary Elements, 2006, 30(3): 515-521.
  • 6申光宪,肖宏,陈一鸣.边界元法[M].北京:机械工业出版社,1997.
  • 7李瑞遐.边界是光滑开弧Helmholtz方程的边界积分法[J].华东理工大学学报(自然科学版),1999,25(4):410-412. 被引量:5
  • 8张耀明,孙焕纯,杨家新.虚边界元法的理论分析[J].计算力学学报,2000,17(1):56-62. 被引量:24

引证文献2

海南大学学报(自然科学版)
2006年 第1期

相关作者

内容加载中请稍等...

相关机构

内容加载中请稍等...

相关主题

内容加载中请稍等...

浏览历史

内容加载中请稍等...
;
使用帮助 返回顶部