Parallel algorithm combined with mixed element procedure for compressible miscible displacement problem

被引:1
作者
Zhang, Jiansong [1 ]
Yang, Danping [2 ]
Guo, Hui [3 ]
Qu, Yan [4 ]
机构
[1] China Univ Petr, Dept Appl Math, Qingdao 266580, Peoples R China
[2] China Normal Univ, Dept Math, 3663 Zhongshan North Rd, Shanghai 200062, Peoples R China
[3] China Univ Petr, Dept Computat Math, Qingdao 266580, Peoples R China
[4] China Univ Petr, Coll Chem Engn, Qingdao 266580, Peoples R China
来源
NUMERICAL ALGORITHMS | 2017年 / 76卷 / 04期
关键词
Parallel subspace correction; Mixed finite element; Splitting system; Compressible miscible displacement; DOMAIN DECOMPOSITION PROCEDURES; 2-PHASE INCOMPRESSIBLE-FLOW; FINITE-ELEMENT; ITERATIVE METHODS; APPROXIMATION;
D O I
10.1007/s11075-017-0294-0
中图分类号
O29 [应用数学];
学科分类号
070104 ;
摘要
Based on overlapping domain decomposition, we construct a parallel mixed finite element algorithm for solving the compressible miscible displacement problem in porous media. The algorithm is fully parallel. We consider the relation between the convergence rate and discretization parameters, including the overlapping degree of the subspaces. We give the corresponding error estimate, which tells us that only two iterations are needed to reach to given accuracy at each time level. Numerical results are presented to confirm our theoretical analysis.
引用
收藏
页码:993 / 1019
页数:27
相关论文
共 50 条
[21]   Highly efficient numerical algorithm for compressible miscible displacement problem involving dispersion term [J].
Hu, Hanzhang ;
Liu, Ying .
INTERNATIONAL JOURNAL OF NUMERICAL METHODS FOR HEAT & FLUID FLOW, 2025, 35 (04) :1335-1359
[22]   Superconvergence of a combined mixed finite element and discontinuous Galerkin approximation for an incompressible miscible displacement problem [J].
Yang, Jiming ;
Chen, Yanping .
APPLIED MATHEMATICAL MODELLING, 2012, 36 (03) :1106-1113
[23]   A mixed element method for Darcy-Forchheimer incompressible miscible displacement problem [J].
Pan, Hao ;
Rui, Hongxing .
COMPUTER METHODS IN APPLIED MECHANICS AND ENGINEERING, 2013, 264 :1-11
[24]   Two-grid method for compressible miscible displacement problem by mixed finite element methods and expanded mixed finite element method of characteristics [J].
Hanzhang Hu .
Numerical Algorithms, 2022, 89 :611-636
[25]   A priori error estimates of a combined mixed finite element and local discontinuous Galerkin method for an incompressible miscible displacement problem [J].
Yang, Jiming ;
Chen, Yanping ;
Huang, Yunqing .
APPLIED MATHEMATICS AND COMPUTATION, 2018, 334 :141-151
[26]   A combined discontinuous Galerkin finite element method for miscible displacement problem [J].
Zhang, Jiansong ;
Zhu, Jiang ;
Zhang, Rongpei ;
Yang, Danping ;
Loula, Abimael F. D. .
JOURNAL OF COMPUTATIONAL AND APPLIED MATHEMATICS, 2017, 309 :44-55
[27]   A Two-Grid Combined Mixed Finite Element and Discontinuous Galerkin Method for an Incompressible Miscible Displacement Problem in Porous Media [J].
Yang, Jiming ;
Su, Yifan .
JOURNAL OF SCIENTIFIC COMPUTING, 2021, 88 (03)
[28]   A splitting positive definite mixed element method for miscible displacement of compressible flow in porous media [J].
Yang, DP .
NUMERICAL METHODS FOR PARTIAL DIFFERENTIAL EQUATIONS, 2001, 17 (03) :229-249
[29]   Mixed Method for Compressible Miscible Displacement with Dispersion in Porous Media [J].
Chunguang Chen Department of Mathematics Ocean University of China Qingdao China .
Numerical Mathematics:A Journal of Chinese Universities(English Series), 2007, (01) :74-82
[30]   Hybrid mixed discontinuous Galerkin finite element method for incompressible miscible displacement problem [J].
Zhang, Jiansong ;
Yu, Yun ;
Zhu, Jiang ;
Jiang, Maosheng .
APPLIED NUMERICAL MATHEMATICS, 2024, 198 :122-137
12345