ANALYSIS AND APPROXIMATIONS OF THE EVOLUTIONARY STOKES EQUATIONS WITH INHOMOGENEOUS BOUNDARY AND DIVERGENCE DATA USING A PARABOLIC SADDLE POINT FORMULATION

Chrysafinos Konstantinos; Hou L. Steven

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ANALYSIS AND APPROXIMATIONS OF THE EVOLUTIONARY STOKES EQUATIONS WITH INHOMOGENEOUS BOUNDARY AND DIVERGENCE DATA USING A PARABOLIC SADDLE POINT FORMULATION

机译：使用抛物面鞍点配方的进一步边界和发散数据的进化斯托克斯方程的分析与近似

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This work concerns the analysis and finite element approximations of the evolutionary Stokes equations, with inhomogeneous boundary and divergence data. The proposed weak formulation can be viewed as an attempt to develop the parabolic analog of the well known saddle point theory for elliptic problems. Several results concerning the analysis and finite element approximations are presented. The key feature of the weak formulation under consideration is the treatment of Dirichlet boundary conditions within the Lagrange multiplier framework.

机译：这项工作涉及进化斯托克斯方程的分析和有限元近似，具有不均匀的边界和发散数据。可以观察所提出的弱配方作为发展众所周知的鞍座点理论的抛物线模拟以进行椭圆问题。提出了有关分析和有限元近似的几个结果。正在考虑的弱配方的关键特征是在拉格朗日乘法器框架内处理Dirichlet边界条件。

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《ESAIM. Mathematical modelling and numerical analysis》 |2017年第4期|共26页
作者
Chrysafinos Konstantinos; Hou L. Steven;
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作者单位

Natl Tech Univ Athens Sch Appl Math &

Phys Sci Dept Math Zografou Campus Athens 15780 Greece;

Iowa State Univ Dept Math Ames IA 50011 USA;

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原文格式 PDF
正文语种 eng
中图分类模型理论;数值分析;
关键词
Evolutionary stokes equations; inhomogeneous boundary and divergence data; error estimates; finite element approximations; lagrange multipliers; saddle point formulations;

机译：进化的斯托克斯方程;不均匀的边界和发散数据;错误估计;有限元近似;拉格朗日乘法器;马鞍点配方;

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专利

1. ANALYSIS AND APPROXIMATIONS OF THE EVOLUTIONARY STOKES EQUATIONS WITH INHOMOGENEOUS BOUNDARY AND DIVERGENCE DATA USING A PARABOLIC SADDLE POINT FORMULATION [J] . Chrysafinos Konstantinos, Hou L. Steven ESAIM. Mathematical modelling and numerical analysis . 2017,第4期

机译：使用抛物面鞍点配方的进一步边界和发散数据的进化斯托克斯方程的分析与近似
2. Global existence and blow-up phenomena for nonlinear divergence form parabolic equations with inhomogeneous Neumann boundary conditions [J] . Li F., Li J. Journal of Mathematical Analysis and Applications . 2012,第2期

机译：非线性散度的整体存在和爆破现象形成了具有非均匀Neumann边界条件的抛物线方程
3. Global existence and blow-up phenomena for nonlinear divergence form parabolic equations with inhomogeneous Neumann boundary conditions [J] . Li F., Li J. Journal of Mathematical Analysis and Applications . 2012,第2期

机译：非线性散度的整体存在和爆破现象形成了具有非均匀Neumann边界条件的抛物线方程
4. Adjoint Formulation Using Auxiliary Boundary Equations (ABEs) Demonstrated on the Stokes Equations [C] . International conference on numerical methods in fluid dynamics . 1998

机译：使用辅助边界方程（eBES）在Stokes方程上伴随公式
5. Analysis and finite element approximations of parabolic saddle point problems with applications to optimal control. [D] . Chrysafinos, Konstantinos. 2002

机译：抛物线鞍点问题的分析和有限元逼近，并应用于最优控制。
6. Linear Parabolic Differential Equations of Arbitrary Order; General Boundary-Value Problems for Elliptic Equations [O] . Felix E. Browder 1953

机译：任意阶线性抛物线方程椭圆方程的一般边值问题
7. Analysis of a robust finite element approximation for a parabolic equation with rough boundary data [O] . Donald A. French, J. Thomas King 1993

机译：具有粗边界数据的抛物线方程的稳健有限元近似分析
8. Probabilistic Methods for Finite Difference Approximations to Degenerate Elliptic and Parabolic Equations with Neumann and Dirichlet Boundary Conditions [R] . H. J. Kushner 1974

机译：具有Neumann和Dirichlet边界条件的退化椭圆和抛物型方程有限差分逼近的概率方法

ANALYSIS AND APPROXIMATIONS OF THE EVOLUTIONARY STOKES EQUATIONS WITH INHOMOGENEOUS BOUNDARY AND DIVERGENCE DATA USING A PARABOLIC SADDLE POINT FORMULATION

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