CONVERGENT FINITE ELEMENT DISCRETIZATIONS OF THE NONSTATIONARY INCOMPRESSIBLE MAGNETOHYDRODYNAMICS SYSTEM

Prohl A

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CONVERGENT FINITE ELEMENT DISCRETIZATIONS OF THE NONSTATIONARY INCOMPRESSIBLE MAGNETOHYDRODYNAMICS SYSTEM

机译：非平稳不可压磁流体动力学系统的收敛有限元离散

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The incompressible MHD equations couple Navier-Stokes equations with Maxwell's equations to describe the flow of a viscous, incompressible, and electrically conducting fluid in a Lipschitz domain Omega subset of R-3. We verify convergence of iterates of different coupling and decoupling fully discrete schemes towards weak solutions for vanishing discretization parameters. Optimal first order of convergence is shown in the presence of strong solutions for a splitting scheme which decouples the computation of velocity field, pressure, and magnetic fields at every iteration step.

机译：不可压缩的MHD方程将Navier-Stokes方程与Maxwell方程耦合在一起，以描述R-3的Lipschitz域Omega子集中的粘性，不可压缩和导电流体的流动。我们验证了不同的耦合和解耦完全离散方案的迭代的收敛性，以消除离散化参数的弱解。在存在分裂方案的强解的情况下，显示了最优的一阶收敛性，该解方案使每个迭代步骤的速度场，压力和磁场的计算解耦。

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《RAIRO. Mathematical Modelling and Numerical Analysis. = Modelisation Mathematique et Analyse Numerique》 |2008年第6期|共23页
作者
Prohl A;
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正文语种 eng
中图分类数学分析;
关键词
Magneto-hydrodynamics; discretization; FEM; fixed-point scheme; splitting-method; NAVIER-STOKES EQUATIONS; WEIGHTED REGULARIZATION; MAGNETO-HYDRODYNAMICS; MAXWELL EQUATIONS; APPROXIMATION; MHD; STATIONARY; DOMAINS;

机译：磁流体动力学;离散化;有限元;定点方案;分解方法;Navier-Stokes方程;加权正则化;磁水动力学;Maxwell方程;近似;MHD;平稳;域;

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1. CONVERGENT FINITE ELEMENT DISCRETIZATIONS OF THE NONSTATIONARY INCOMPRESSIBLE MAGNETOHYDRODYNAMICS SYSTEM [J] . Prohl A RAIRO. Mathematical Modelling and Numerical Analysis. = Modelisation Mathematique et Analyse Numerique . 2008,第6期

机译：非平稳不可压磁流体动力学系统的收敛有限元离散
2. Error Estimate of a Fully Discrete Finite Element Method for Incompressible Vector Potential Magnetohydrodynamic System [J] . Ding Qianqian, Long Xiaonian, Mao Shipeng Journal of Scientific Computing . 2021,第3期

机译：不可压缩矢量电位磁力流体系统完全离散有限元方法的误差估计
3. Unconditionally stable operator splitting algorithms for the incompressible magnetohydrodynamics system discretized by a stabilized finite element formulation based on projections [J] . Badia S., Planas R., Gutiérrez-Santacreu J.V. International Journal for Numerical Methods in Engineering . 2013,第3期

机译：基于投影的稳定有限元公式离散化的不可压缩磁流体动力学系统的无条件稳定算子分解算法
4. Adaptive incompressible flow computations with linearly implicit time discretization and stabilized finite elements [C] . Jens Lang European Computational Fluid Dynamics Conference . 1998

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5. Balancing Domain Decomposition by Constraints Algorithms for Incompressible Stokes Equations with Nonconforming Finite Element Discretizations [D] . Wang, Bin. 2017

机译：具有非协调有限元离散化的不可压缩Stokes方程的约束算法平衡域分解
6. A displacement-based finite element formulation for incompressible and nearly-incompressible cardiac mechanics [O] . Myrianthi Hadjicharalambous, Jack Lee, Nicolas P. Smith, -1

机译：基于位移的有限元公式适用于不可压缩和几乎不可压缩的心脏力学
7. Convergent finite element discretizations of the nonstationary incompressible magnetohydrodynamics system [O] . Prohl Andreas 2008

机译：非平稳不可压缩磁流体动力学系统的收敛有限元离散化

CONVERGENT FINITE ELEMENT DISCRETIZATIONS OF THE NONSTATIONARY INCOMPRESSIBLE MAGNETOHYDRODYNAMICS SYSTEM

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