Multidomain finite elements for advection-diffusion equations

被引：0

作者：

Universita degli Studi di Trento, Trento, Italy ^{[1
]}

机构：

来源：

Appl Numer Math | / 1卷 / 91-118期

关键词：

The application of domain decomposition methods to this family of partial differential equations; shows various interesting aspects. Such methods allow a simplification of the geometry and a reduction of the size of the problems; and the use of different physical models and numerical methods on different subdomains. Furthermore domain decomposition methods are easily parallelizable and allow * This research was carried out while the author was visiting the Group of Applied Mathematics and Simulation of CRS4; and was supported by Sardinian Regional Authorities;

D O I：

暂无

中图分类号：

学科分类号：

摘要：

引用

共 50 条

[1] Multidomain finite elements for advection-diffusion equations
Trotta, RL
APPLIED NUMERICAL MATHEMATICS, 1996, 21 (01) : 91 - 118
[2] FINITE-ELEMENTS AND CHARACTERISTICS APPLIED TO ADVECTION-DIFFUSION EQUATIONS
HASBANI, Y
LIVNE, E
BERCOVIER, M
COMPUTERS & FLUIDS, 1983, 11 (02) : 71 - 83
[3] MULTISCALE FINITE ELEMENTS FOR TRANSIENT ADVECTION-DIFFUSION EQUATIONS THROUGH ADVECTION-INDUCED COORDINATES
Simon, Konrad
Behrens, Joern
MULTISCALE MODELING & SIMULATION, 2020, 18 (02): : 543 - 571
[4] Application of nonconforming finite elements to solving advection-diffusion problems
Kuzin V.I.
Kravtchenko V.V.
Numerical Analysis and Applications, 2010, 3 (01) : 39 - 51
[5] On the stability of explicit finite difference methods for advection-diffusion equations
Zeng, Xianyi
Hasan, Md Mahmudul
NUMERICAL METHODS FOR PARTIAL DIFFERENTIAL EQUATIONS, 2023, 39 (01) : 421 - 446
[6] A stabilized finite element method for advection-diffusion equations on surfaces
Olshanskii, Maxim A.
Reusken, Arnold
Xu, Xianmin
IMA JOURNAL OF NUMERICAL ANALYSIS, 2014, 34 (02) : 732 - 758
[7] A priori and a posteriori analysis of non-conforming finite elements with face penalty for advection-diffusion equations
El Alaoui, L.
Ern, A.
Burman, E.
IMA JOURNAL OF NUMERICAL ANALYSIS, 2007, 27 (01) : 151 - 171
[8] A NEW STABILIZED FINITE ELEMENT METHOD FOR SOLVING THE ADVECTION-DIFFUSION EQUATIONS
Huo-yuan Duan (Institute of Mathematics
Journal of Computational Mathematics, 2002, (01) : 57 - 64
[9] Discrete advection-diffusion equations on graphs: Maximum principle and finite volumes
Hosek, Radim
Volek, Jonas
APPLIED MATHEMATICS AND COMPUTATION, 2019, 361 : 630 - 644
[10] A multiscale control volume finite element method for advection-diffusion equations
Bochev, Pavel
Peterson, Kara
Perego, Mauro
INTERNATIONAL JOURNAL FOR NUMERICAL METHODS IN FLUIDS, 2015, 77 (11) : 641 - 667

← 1 2 3 4 5 →