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对流占优问题的无网格稳定化方法 被引量:3

Stabilization Meshless Method for Convection Dominated Problems
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摘要 应用标准的无网格方法求解对流占优问题时会出现数值伪振荡.针对此问题,给出了无网格方法中消除非稳定数值解的4种技术,即节点加密、增大节点影响半径、完全迎风无网格稳定化方法、自适应无网格稳定化方法.并将这4种技术应用于径向点插值方法求解一维或二维对流扩散方程.数值结果表明这4种技术均能有效地消除对流占优时的数值伪振荡现象,且自适应迎风无网格稳定化方法是4种技术中最有效的. It is well known that the standard Galerkin is not ideally suited to deal with the spatial discretization of convection-dominated problems. Several techniques were proposed to overcome the instability issues in convection-dominated problems simulated by meshless method. These stable techniques included, the nodal refinement, the enlargement of nodal influence domain, the full upwind meshless technique and the adaptive upwind meshless technique. Meanwile, these stable techniques were applied to RPIM to solve one and two-dimensional convection-diffusion equations. Numerical results for example problems show that these techniques are effective to solve convection-dominated problems, and the adaptive upwind meshless technique is the most effective method of all.
作者 张小华 欧阳洁 王建瑜 鲁传敬
机构地区 西北工业大学应用数学系
出处 《应用数学和力学》 EI CSCD 北大核心 2008年第8期967-975,共9页 Applied Mathematics and Mechanics
基金 国家自然科学基金(重大)资助项目(10590353) 陕西省自然科学基金资助项目(2005A16)
关键词 无网格方法 对流扩散方程 稳定化方法 meshless method convection-diffusion problems stability methods
分类号 O35 [理学—流体力学] O241 [理学—计算数学]
  • 相关文献

参考文献11

  • 1Donea J, Huerta A. Finite Element Methods for Flow Problems [ M]. Chichester: Wiley, 2003.
  • 2Monaghan J J. An introduction to SPH[J]. Computer Physics Communications, 1988,48( 1 ):89-96.
  • 3Liu W K, Jun S, Zhang Y F. Reproducing kernel particle methods[ J ]. International Journal for Numerical Methods in Fluids , 1995,20(8/9) : 1081-1106.
  • 4Liu W K, Jun S, Sihling D T, et al. Muitiresolution reproducing kernel particle method for computational fluid dynamics[ J]. International Journal for Numerical Methods in Fluids , 1997,24( 12): 1391-1415.
  • 5Liu G R, Gu Y T.An Introduction to Meshfree Methods and Their Programming [ M]. Dordrecht: Springer, 2005.
  • 6Belytschko T, Lu Y Y, Gu L. Element-free Galerldn methods[ J]. International Journal for Numerical Methods in Engineering, 1994,37(2) :229-255.
  • 7Onate E, Idelsohn S, Zienkiewicz O C.A fmite point method in computational mechanics: Application to convections to transport and fluid flow[ J]. International Journal for Numerical Methods in Engineering, 1995,39(22) : 3839-3865.
  • 8Onate E, Idelsohn S, Zienkiewicz O C, et al.A stabilized fmite point method for analysis of fluid mechanics problems[ J ] . Computer Methods in Applied Mechanics and Engineering, 1996, 139(1/4) : 315-346.
  • 9Onate E,Idelsohn S.A mesh-free finite point method for advective-diffusive transport and fluid flow problems[ J ]. Computational Mechanics, 1998,21(4/5) : 283-292.
  • 10Lin H, Atluri S N. The meshless local Petrov-Galerldn (MLPG) method for convection-dynamics[ J]. Computer Modeling in Engineering and Sciences ,2000,1(2):45-60.

二级参考文献19

  • 1Donea J, Huerta A. Finite Element Methods for Flow Problems[M]. Chichester:Wiley, 2003
  • 2Codina R. Comparison of some finite element methods for solving the diffusion-convection-reaction equation [J]. Comput Methods Appl Mech Engrg, 1998,156:185 - 210.
  • 3Eduardo G D, Gustavo B A. A new stabilizsed finite element formulation for scalar convection-diffusion problems:The streamline and approximate upwind/Petrov-Galerkin method[J]. Comput Methods Appl Mech Engrg, 2004 ,192 : 3379 - 3396.
  • 4Monaghan J J. An introduction to SPH[J]. Comput Phys Comm, 1988,48:89 - 96.
  • 5Stephen J V. The application of smoothed particle hydrodynamics to problem in fluid mechanics[D]. Ph D thesis, Carmegie Mellon University, 2000.
  • 6Nayroles B, Touzot G, Villon P. Generalizing the finite element method: Diffuse approximation and diffuse elements[J]. Comput Mech,1992,10:307-318.
  • 7Belytschko T, Lu Y Y, Gu L. Element-free Galerkin methods[J]. Int J Num Meth Engrg, 1994,37:229 - 256.
  • 8Belytschko T, Krongauz Y, Organ D. Fleming M, Krysl P. Meshless method: An overview and recent developments[J]. Comput Methods Appl Mech Engrg, 1996,139:3-47.
  • 9Onate E, Idelsohn S, Zienkiewica O C. A finite point method in computational mechanics: Application to convections to transport and fluid flow[J]. Int J Num Meth Engrg, 1996,39:3839 - 3866.
  • 10Liu W K, Sukky J, Zhang Y F. Repoducing kernel particle methods[J]. Int J Num Meth Fluids,1995,20: 1081 - 1106.

共引文献8

同被引文献32

  • 1张小华,欧阳洁.线性定常对流占优对流扩散问题的无网格解法[J].力学季刊,2006,27(2):220-226. 被引量:9
  • 2仇轶,由长福,祁海鹰,徐旭常.无网格方法中的背景积分方案及单颗粒下降过程的数值模拟[J].计算物理,2006,23(5):525-529. 被引量:3
  • 3Gu Y T, Liu R G. Meshless techniques for convection dominated problems [ J ]. Comput Mech, 2006,38 : 171- 182.
  • 4Lin H, Ahuri S N. Meshless local Petrov-Galerkin (MLPG) method for convection-diffusion problems [ J ].Computer Modeling in Engineering and Sciences,2000,1 (2) :45-60.
  • 5Donea J, Huerta A. Finite element methods for flow problems [ M]. Chiehester Wiley ,2003.
  • 6Lucy L B. A numerical approach to the testing of the fission hypothesis [ J ]. Astron J, 1977,8 : 1013-1024.
  • 7Nayroles B, Touzot G, Villon P. Generalizing the finite element method:diffuse approximation and diffuse elements [ J ]. Comput Mech, 1992,10 : 307-318.
  • 8Belytschko T, Lu Y Y, Gu L. Element-free Galerkin methods [ J]. Int J Numer Methods Eng, 1994,37:229-256.
  • 9Liu W,Jun S,Zhang Y. Reproducing kernel particle methods [J]. Int J Numer Methods Fluids, 1995,20:1 081- 1 106.
  • 10Aluru N R. A point collocation method based on reproducing kernel approximations [ J ]. Int J Num Meth Engng,2000,47 : 1083-1 121.

引证文献3

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应用数学和力学
2008年 第8期

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