user

Methods of moving boundary based on artificial boundary in heat conduction direct problem

被引:0
|
作者
Zhang, Xueyan [1 ]
Li, Qian [1 ]
Gu, Daquan [1 ]
Hou, Taiping [1 ]
机构
[1] PLA Univ Sci Tech, Inst Meteorol, Nanjing 211101, Jiangsu, Peoples R China
来源
MECHATRONICS AND INTELLIGENT MATERIALS II, PTS 1-6 | 2012年 / 490-495卷
关键词
parabolic equation; artificial boundary; potential theory; difference; numerics; REGULARIZATION; EQUATION;
D O I
10.4028/www.scientific.net/AMR.490-495.2282
中图分类号
TP [自动化技术、计算机技术];
学科分类号
0812 ;
摘要
The initial boundary value problem for parabolic equation with Neumann boundary condition is a kind of classical problem in partial differential equations. In this paper we use the artificial boundary to solve the moving boundary problem. Potential theory and difference method are discussed. Numerical results are given to support the proposed schemes and to give the compare of the two methods.
引用
收藏
页码:2282 / 2285
页数:4
相关论文
共 50 条
  • [1] MOVING BOUNDARY PROBLEM IN HYPERBOLIC HEAT CONDUCTION.
    De Socio, L.M.
    Misici, L.
    [J]. Revue roumaine des sciences techniques. Serie de mecanique appliquee, 1987, 32 (02): : 177 - 187
  • [2] DIRECT AND INDIRECT BOUNDARY ELEMENT METHODS FOR SOLVING THE HEAT-CONDUCTION PROBLEM
    ATHANASIADIS, G
    [J]. COMPUTER METHODS IN APPLIED MECHANICS AND ENGINEERING, 1985, 49 (01) : 37 - 54
  • [3] Identification of a moving boundary for a heat conduction problem in a multilayer medium
    Y. S. Li
    T. Wei
    [J]. Heat and Mass Transfer, 2010, 46 : 779 - 789
  • [4] Identification of a moving boundary for a heat conduction problem in a multilayer medium
    Li, Y. S.
    Wei, T.
    [J]. HEAT AND MASS TRANSFER, 2010, 46 (07) : 779 - 789
  • [5] NONSTATIONARY PROBLEM OF HEAT CONDUCTION WITH ARBITRARY MOVING BOUNDARY.
    Barvinok, V.A.
    Bogdanovich, V.I.
    [J]. Power engineering New York, 1982, 20 (06): : 101 - 108
  • [6] DIRECT METHODS IN THE PARAMETRIC MOVING BOUNDARY VARIATIONAL PROBLEM
    Demyanov, V. F.
    Tamasyan, G. Sh
    [J]. NUMERICAL FUNCTIONAL ANALYSIS AND OPTIMIZATION, 2014, 35 (7-9) : 932 - 961
  • [7] HEAT FLUX ESTIMATION IN A NONLINEAR INVERSE HEAT CONDUCTION PROBLEM WITH MOVING BOUNDARY
    Molavi, Hosein
    Hakkaki-Fard, Ali
    Pourshaghaghy, Alireza
    Molavi, Mehdi
    Rahmani, Ramin K.
    [J]. HT2009: PROCEEDINGS OF THE ASME SUMMER HEAT TRANSFER CONFERENCE 2009, VOL 2, 2009, : 929 - 941
  • [8] Heat Flux Estimation in a Nonlinear Inverse Heat Conduction Problem With Moving Boundary
    Molavi, Hosein
    Rahmani, Ramin K.
    Pourshaghaghy, Alireza
    Tashnizi, Ebrahim Sharifi
    Hakkaki-Fard, Ali
    [J]. JOURNAL OF HEAT TRANSFER-TRANSACTIONS OF THE ASME, 2010, 132 (08): : 1 - 10
  • [9] Uniqueness of moving boundary for a heat conduction problem with nonlinear interface conditions
    Wei, T.
    [J]. APPLIED MATHEMATICS LETTERS, 2010, 23 (05) : 600 - 604
  • [10] The reconstruction of heat flux in moving boundary in 1-dimensional heat conduction problem
    Zhang, Xueyan
    Huang, Feng
    [J]. ADVANCED MANUFACTURING TECHNOLOGY, PTS 1, 2, 2011, 156-157 : 237 - 240
12345