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Variational approximation of flux in conforming finite element methods for elliptic partial differential equations: a model problem

机译：椭圆型偏微分方程的有限元方法的通量变分近似：一个模型问题

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We consider the approximation of elliptic boundary value problems by conforming finite element methods. A model problem, the Poisson equation with Dirichlet boundary conditions, is used to examine the convergence behavior of flux defined on an internal boundary which splits the domain in two. A variational definition of flux, designed to satisfy local conservation laws, is shown to lead to improved rates of convergence.

机译：我们通过采用有限元方法考虑椭圆形边值问题的逼近。模型问题（具有Dirichlet边界条件的Poisson方程）用于检查内部边界上定义的通量的收敛行为，该内部边界将域一分为二。为了满足局部守恒定律，通量的变化定义表明可以提高收敛速度。

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Brezzi Franco; Hughes T. J. R.; Suli Endre;
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年度 2001
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3. COMPUTABLE ERROR ESTIMATES FOR FINITE ELEMENT APPROXIMATIONS OF ELLIPTIC PARTIAL DIFFERENTIAL EQUATIONS WITH ROUGH STOCHASTIC DATA [J] . Hall Eric Joseph, Hoel Hakon, Sandberg Mattias, SIAM Journal on Scientific Computing . 2016,第6期

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4. Kernel-Based Collocation Methods Versus Galerkin Finite Element Methods for Approximating Elliptic Stochastic Partial Differential Equations [C] . Gregory E. Fasshauer, Qi Ye International workshop on meshfree methods for partial differential equations . 2013

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5. Analysis and finite element approximations of stochastic optimal control problems constrained by stochastic elliptic partial differential equations [D] . Lee, Jangwoon 2008

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6. High accuracy finite difference approximation to solutions of elliptic partial differential equations [O] . Robert E. Lynch, John R. Rice 1978

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7. Finite Element Approximations of Conformal Mappings (Numerical Solution of Partial Differential Equations and Related Topics) [O] . Tsuchiya Takaya 2000

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Variational approximation of flux in conforming finite element methods for elliptic partial differential equations: a model problem

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