A BEM ANALYSIS FOR TRANSIENT CONDUCTION-CONVECTION PROBLEMS

被引:7
|
作者
Lim, J. [1 ]
Chan, C. L. [1 ]
Chandra, A. [1 ]
机构
[1] Univ Arizona, Dept Aerosp & Mech Engn, Tucson, AZ 85721 USA
来源
INTERNATIONAL JOURNAL OF NUMERICAL METHODS FOR HEAT & FLUID FLOW | 1994年 / 4卷 / 01期
基金
美国国家科学基金会;
关键词
BEM; Conduction; Transient analysis; Moving sources;
D O I
10.1108/EUM0000000004029
中图分类号
O414.1 [热力学];
学科分类号
摘要
A boundary element method (BEM) formulation for the solution of transient conduction-convection problems is developed in this paper. A time-dependent fundamental solution for moving heat source problems is utilized for this purpose. This reduces the governing parabolic partial differential equations to a boundary-only form and obviates the need for any internal discretization. Such a formulation is also expected to be stable at high Peclet numbers. Numerical examples are included to establish the validity of the approach and to demonstrate the salient features of the BEM algorithm.
引用
收藏
页码:31 / 45
页数:15
相关论文
共 50 条
  • [11] Optimal Error Estimate of the Penalty FEM for the Stationary Conduction-Convection Problems
    Lei, Yanfang
    Wang, Hongtao
    Si, Zhiyong
    ADVANCES IN APPLIED MATHEMATICS AND MECHANICS, 2018, 10 (03) : 767 - 784
  • [12] Radial integration BEM for transient heat conduction problems
    Yang, Kai
    Gao, Xiao-Wei
    ENGINEERING ANALYSIS WITH BOUNDARY ELEMENTS, 2010, 34 (06) : 557 - 563
  • [13] A Stabilized Finite Element Method for Non-Stationary Conduction-Convection Problems
    Zhao, Ke
    He, Yinnian
    Zhang, Tong
    ADVANCES IN APPLIED MATHEMATICS AND MECHANICS, 2011, 3 (02) : 239 - 258
  • [14] An optimizing reduced PLSMFE formulation for non-stationary conduction-convection problems
    Luo, Zhendong
    Chen, Jing
    Navon, I. M.
    Zhu, Jiang
    INTERNATIONAL JOURNAL FOR NUMERICAL METHODS IN FLUIDS, 2009, 60 (04) : 409 - 436
  • [15] Boundary element method analysis for the transient conduction-convection in 2-D with spatially variable convective velocity
    DeSilva, SJ
    Chan, CL
    Chandra, A
    Lim, JH
    APPLIED MATHEMATICAL MODELLING, 1998, 22 (1-2) : 81 - 112
  • [16] A Newton iterative mixed finite element method for stationary conduction-convection problems
    Si, Zhiyong
    Zhang, Tong
    Wang, Kun
    INTERNATIONAL JOURNAL OF COMPUTATIONAL FLUID DYNAMICS, 2010, 24 (3-4) : 135 - 141
  • [17] A conduction-convection design for liquid flow sensing
    Castaner, L
    Jimenez, V
    Dominguez, M
    Masana, F
    Rodriguez, A
    SENSORS AND ACTUATORS A-PHYSICAL, 1998, 66 (1-3) : 131 - 137
  • [18] Coupled conduction-convection problem for a cylinder in an enclosure
    Liu, Y
    PhanThien, N
    Kemp, R
    COMPUTATIONAL MECHANICS, 1996, 18 (06) : 429 - 443
  • [19] A defect-correction method for unsteady conduction-convection problems II: Time discretization
    Si, Zhiyong
    He, Yinnian
    Zhang, Tong
    JOURNAL OF COMPUTATIONAL AND APPLIED MATHEMATICS, 2012, 236 (09) : 2553 - 2573
  • [20] A REDUCED MFE FORMULATION BASED ON POD FOR THE NON-STATIONARY CONDUCTION-CONVECTION PROBLEMS
    Luo Zhendong
    Xie Zhenghui
    Chen Jing
    ACTA MATHEMATICA SCIENTIA, 2011, 31 (05) : 1765 - 1785
12345