Superconvergence of Finite Element Approximations to Parabolic and Hyperbolic Integro-Differential Equations

1 IntroductionRecently, considerable attention has been devoted to the finite element analysis fOr par-tiaJ illtegro-differential equations, see, fOr example, Yanik and Ftweatherl1], Cannon andLin[2'3] 5 Chen and Shih[4], Lin, Thomee and Wahlbi.I5l ? Thomee and Zhang[6] and ZhangI7j8J.The main tool used for this kind of equations is the mtz-Voterra projection [5'7] as againstttitz projection fOr parabolic equation. In this paPer, we are concerned primarily with theanalysis of knot supe…     

二次有限元解的渐近展开与外推

在Poisson方程的求解域Ω存在一致的三角剖分,并且相邻两初始单元构成平行四边形的假设下,证明了若Poisson方程的解u属于H6(Ω),那么二次有限元的误差有h4的渐近展开.基于误差的渐近展开,可以利用h4-Richardson外推进一步提高数值解的精度阶,并且能够得到一个后验误差估计.最后,一个数值算例验证了理论分析.     

Finite Volume Methods for Eigenvalue Problems

Based on a linear finite element space, in this paper, two symmetric finite volume schemes are proposed for self-adjoint elliptic boundary eigenvalue problems. Both convergence and superconvergence are discussed.This revised version was published online in October 2005 with corrections to the Cover Date.     

非线性sine-Gordon方程的双线性元分析及外推

研究双线性元对一类非线性sine-Gordon方程的有限元逼近.利用该元的高精度结果和对时间t的导数转移技巧,得到了H~1模意义下的超逼近性.进一步地,通过运用插值后处理技术,给出了H~1模意义下的超收敛结果.与此同时,通过构造一个新的外推格式,导出了与线性问题情形相同的三阶外推解.最后给出了一种全离散逼近格式下的最优误差估计.     

非对称不定问题双线性元的超收敛和外推

本文主要讨论非对称不定问题的双线性有限元逼近.在不需要引入Ritz投影的前提下直接利用单元上的插值并借助于该元已有的高精度分析和平均值技巧,得到在H1模意义下O(h2 )阶的超逼近和整体超收敛结果.同时给出两个新的误差渐近展开式,导出比传统有限元误差高两阶的O(h3)阶的外推解.     

各向异性双二次元的自然超收敛性结果

The paper studies the convergence and the superconvergence of the biquadratic finite element for Poisson' problem on anisotropic meshes.By detailed analysis,it shows that the biquadratic finite element is anisotropically superconvergent at four Gauss points in the element.     

特征值问题的三角形二次元的展开式及其外推

我们考虑利用三角形二次元来求解特征值问题,并给出特征值的误差展开式,以此为基础进行外推获得高精度.     

抛物方程初边值问题连续有限元的超收敛性

研究了一类一维抛物方程初边值问题的连续有限元方法.在空间上进行任意m次有限元半离散,在时间方向上进行二次连续有限元后,获得了一个稳定的全离散计算格式.利用单元分析法校正技术的新思想进行理论分析,连续有限元解在剖分网格节点上具有超收敛性.     

Biquartic Finite Volume Element Metho d Based on Lobatto-Guass Structure

In this paper, a biquartic finite volume element method based on LobattoGuass structure is presented for variable coefficient elliptic equation on rectangular partition. Not only the optimal H1 and L2 error estimates but also some superconvergent properties are available and could be proved for this method. The numerical results obtained by this finite volume element scheme confirm the validity of the theoretical analysis and the effectiveness of this method.     

Anisotropic Superconvergence Analysis for the Wilson Nonconforming Element

1 Introduction The Wilson nonconforming element has been widely used in computational mechanics and struc- tural engineering because of its good convergence. In many practical cases, it seems better than the bilinear conforming finite element. This phenomenon causes the great interest of many people who study finite elements. Some papers about the Wilson element have been published which deal with superconvergence. In [6], the superclose property and the global superconvergence are obtained …     

Extrapolation of Mixed Finite Element Approximations for the Maxwell Eigenvalue Problem

In this paper,a general method to derive asymptotic error expansion formulas for the mixed finite element approximations of the Maxwell eigenvalue problem is established.Abstract lemmas for the error of the eigenvalue approximations are obtained.Based on the asymptotic error expansion formulas,the Richardson extrapolation method is employed to improve the accuracy of the approximations for the eigenvalues of the Maxwell system from θ(h2) to θ(h4) when applying the lowest order Nédé1ec mixed finite element and a nonconforming mixed finite element.To our best knowledge,this is the first superconvergence result of the Maxwell eigenvalue problem by the extrapolation of the mixed finite element approximation.Numerical experiments are provided to demonstrate the theoretical results.     

Two-grid Methods for Finite Volume Element Approximations of Nonlinear Sobolev Equations

In this article, two-grid methods are studied for solving nonlinear Sobolev equation using the finite volume element method. The methods are based on one coarse grid space and one fine grid space. The nonsymmetric and nonlinear iterations are only executed on the coarse grid (with grid size H), and the fine grid solution (with grid size h) can be obtained in a single symmetric and linear step. The optimal H¹ error estimates are presented for the proposed methods, which show that the two-grid methods achieve optimal approximation as long as the mesh sizes satisfy h = 𝒪(H³|ln H|). As a result, solving such a large class of nonlinear Sobolev equations will not be much more difficult than solving one linearized equation.     

非线性双相滞热传导方程的新混合元超收敛分析

针对非线性双相滞热传导方程,建立了一种自由度少且自然满足B-B条件的新混合元逼近格式.在半离散格式下,基于双线性元的高精度结果,分别导出了原始变量的H~1模及中间变量的L~2模的超逼近性质,进而,借助于插值后处理算子,得到了原始及中间变量比传统误差高一阶的整体超收敛结果.     

一个低阶各向异性有限元的超收敛分析

针对二阶椭圆问题,在各向异性网格上得到了由Park和Sheen提出的一个低阶非协调单元的收敛性分析,并给出了相应的误差估计．进一步利用插值后处理技巧,得到了后处理后的离散解与真解本身的整体超收敛性质．最后的数值试验验证了理论的可靠性．     

Stokes特征值问题Q_1元的展开式及其外推

考虑利用Q1元来求解Stokes特征值问题的误差渐进展开式,并以此为基础进行外推获得高精度.     

Stokes问题非协调混合有限元超收敛分析

本文通过引入全新的技巧,研究了Stokes问题的非协调混合有限元方法,得到了关于速度与压力的超逼近性质.进一步地通过构造一个恰当的插值后处理算子,还得到了关于速度的整体超收敛结果.     

Superconvergence and gradient recovery for a finite volume element method for solving convection‐diffusion equations

We study the superconvergence of the finite volume element (FVE) method for solving convection‐diffusion equations using bilinear trial functions. We first establish a superclose weak estimate for the bilinear form of FVE method. Based on this estimate, we obtain the H¹‐superconvergence result: . Then, we present a gradient recovery formula and prove that the recovery gradient possesses the ‐order superconvergence. Moreover, an asymptotically exact a posteriori error estimate is also given for the gradient error of FVE solution.Copyright © 2014 Wiley Periodicals, Inc. Numer Methods Partial Differential Eq 30: 1152–1168, 2014     

二阶双曲方程一个新的非协调混合元超收敛性分析

研究了一类二阶双曲型方程在新混合元格式下的非协调混合有限元方法.在抛弃传统有限元分析的必要工具-Ritz投影算子的前提下,直接利用单元的插值性质,运用高精度分析和对时间t的导数转移技巧,借助于插值后处理技术,分别导出了关于原始变量u的H~1-模和通量=-▽u在L~2-模下的O(h~2)阶超逼近性质和整体超收敛结果.进一步,给出了一些数值算例验证了理论分析的正确性.     

二阶方程Dirichlet边值问题混合元的超收敛

我们考虑二阶方程Dirichlet边值问题混合元的超收敛。在正则矩形网格上,采用一阶Raviart-Thomas混合元空间,对有限元解经后处理后,其收敛于精确解的速度从二阶提高到四阶。     

Mortar Finite Volume Method with Adini Element for Biharmonic Problem

In this paper, we construct and analyse a mortar finite volume method for the discretization for the biharmonic problem in R2. This method is based on the mortar-type Adini nonconforming finite element spaces. The optimal order H2-seminorm error estimate between the exact solution and the mortar Adini finite volume solution of the biharmonic equation is established.