Analysis of the vanishing moment method and its finite element approximations for second-order linear elliptic PDEs in non-divergence form

IF 0.6 Q4 MATHEMATICS, APPLIED
Xiaobing H. Feng, T. Lewis, Stefan Schnake
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引用次数: 1

Abstract

This paper is concerned with continuous and discrete approximations of $W^{2,p}$ strong solutions of second-order linear elliptic partial differential equations (PDEs) in non-divergence form. The continuous approximation of these equations is achieved through the Vanishing Moment Method (VMM) which adds a small biharmonic term to the PDE. The structure of the new fourth-order PDE is a natural fit for Galerkin-type methods unlike the original second order equation since the highest order term is in divergence form. The well-posedness of the weak form of the perturbed fourth order equation is shown as well as error estimates for approximating the strong solution of the original second-order PDE. A $C^1$ finite element method is then proposed for the fourth order equation, and its existence and uniqueness of solutions as well as optimal error estimates in the $H^2$ norm are shown. Lastly, numerical tests are given to show the validity of the method.
非发散形式二阶线性椭圆偏微分方程的消失矩法及其有限元逼近分析
本文研究了二阶线性椭圆型偏微分方程(PDE)非发散形式的$W^{2,p}$强解的连续和离散逼近,通过在PDE中加入一个小的双调和项的消失矩法(VMM)实现了这些方程的连续逼近。与原来的二阶方程不同,新的四阶PDE的结构是Galerkin型方法的自然拟合,因为最高阶项是发散形式。给出了扰动四阶方程弱形式的适定性,以及逼近原来二阶PDE强解的误差估计。然后,对四阶方程提出了一种$C^1$有限元方法,并证明了其解的存在性、唯一性以及在$H^2$范数中的最优误差估计。最后通过数值试验验证了该方法的有效性。
本文章由计算机程序翻译,如有差异,请以英文原文为准。
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来源期刊
Methods and applications of analysis
Methods and applications of analysis MATHEMATICS, APPLIED-
自引率
33.30%
发文量
3
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