| 非定常Stokes方程的全离散稳定化有限元格式 |
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| 引用本文: | 赵智慧,李宏,方志朝.非定常Stokes方程的全离散稳定化有限元格式[J].计算数学,2014,36(1):85-98. |
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| 作者姓名: | 赵智慧 李宏 方志朝 |
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| 作者单位: | 内蒙古大学数学科学学院, 呼和浩特 010021 |
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| 基金项目: | 国家自然科学基金(11061021,11361035),内蒙古自然科学基金(2012MS0106). |
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| 摘 要: | 本文研究二维非定常Stokes方程全离散稳定化有限元方法.首先给出关于时间向后一步Euler半离散格式,然后直接从该时间半离散格式出发,构造基于两局部高斯积分的稳定化全离散有限元格式,其中空间用P_1—P_1元逼近,证明有限元解的误差估计.本文的研究方法使得理论证明变得更加简便,也是处理非定常Stokes方程的一种新的途径.
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| 关 键 词: | 有限元方法 非定常Stokes方程 全离散稳定化格式 误差估计 |
| 收稿时间: | 2013-05-11; |
A FULLY DISCRETE STABILIZED FINITE ELEMENT FORMULATION FOR NON-STATIONARY STOKES EQUATION |
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| Zhao Zhihui,Li Hong,Fang Zhichao.A FULLY DISCRETE STABILIZED FINITE ELEMENT FORMULATION FOR NON-STATIONARY STOKES EQUATION[J].Mathematica Numerica Sinica,2014,36(1):85-98. |
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| Authors: | Zhao Zhihui Li Hong Fang Zhichao |
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| Institution: | School of Mathematical sciences, Inner Mongolia University, Hohhot 010021, China |
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| Abstract: | A fully discrete stabilized finite element method is studied for the two-dimensional Stokes equation. The Euler backward semi-discrete formulation in time for non-stationary Stokes equation is established firstly. And then a fully discrete stabilized finit e element formulation based on two local Gauss integrals for non-stationary Stokes equation is directly established from time semi-discrete formulation. The spatial discretization is based on the P1 - P1 triangular element for the approximation of the velocity and pressure. And the error estimates for the fully discrete finite element approximate solutions are derived. The approaches studied here could make theoretical argumentation simper and more convenient. And it is a new pathway for non-stationary equations. |
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| Keywords: | Finite element method non-stationary Stokes equation fully stabilized discrete formulation error estimate |
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