共查询到18条相似文献,搜索用时 93 毫秒
1.
二阶问题的一个类Wilson非协调元 总被引:8,自引:0,他引:8
§1.引言 Wilson元是工程计算中常用的一种非协调元,数值计算效果很好,但是Wilson元对于任意四边形网格却不能收敛.石钟慈在[1]中限制四边形单元剖分,要求四边形单元满足对角线中点距离d_K=o(h_K~2),而[2]—[3]则修改了双线性形式,即在刚度矩阵元素的计算中采用某种数值积分,这两种方法均使得Wilson元达到收敛.另外,通过改变形状函数,[4]—[5]提出了一个六参数非协调四边形单元QP6,它是推广的Wilson元.此元对任意四边形网格能够收敛,但其单元上的形状函数非常依赖单元本身. 相似文献
2.
一类改进的Wilson任意四边形单元 总被引:24,自引:0,他引:24
Wilson元是工程计算中数值效果很好的一种非协调元,但对任意四边形网格却不能收敛。石钟慈要求四边形单元满足对角线中点距离d_k=O(h_k~2),[2]、[3]提出了一个六参数非协调四边形单元。它对任意四边形网格收敛,但其单元上的形状函数非常依赖单元本 相似文献
3.
非正则条件下类Wilson元的构造及其应用 总被引:3,自引:1,他引:2
本文在非正则性条件下,研究了窄四边形上的类Wilson元。通过参考元上类Wilson元的构造,证明了由此产生的有限元对任意窄四边形剖分通过Irons分片检查,得到了二阶问题的误差估计。结果表明,该单元的收敛性质与Wilson元的类似。 相似文献
4.
二阶问题的一个类Wilson非协调元 总被引:9,自引:0,他引:9
§1.引言 Wilson元是工程计算中常用的一种非协调元,数值计算效果很好,但是Wilson元对于任意四边形网格却不能收敛.石钟慈在[1]中限制四边形单元剖分,要求四边形单元满足对角线中点距离d_K=o(h_K~2),而[2]—[3]则修改了双线性形式,即在刚度矩阵元素的计算中采用某种数值积分,这两种方法均使得Wilson元达到收敛.另外,通过改变形状函数,[4]—[5]提出了一个六参数非协调四边形单元QP6,它是推广的Wilson元.此元对任意四边形网格能够收敛,但其单元上的形状函数非常依赖单元本身. 相似文献
5.
基于参考元的构造和双线性变换 ,本文给出了一个任意窄四边形类Wilson元 .利用窄四边形等参有限元的插值定理和有关方法 ,当正则性条件 ρK/hK ≥σ0 >0不满足时 ,得到了任意窄四边形类Wilson元的插值误差 ,其中hK 为单元K的直径 ,ρK 为K中内切圆的直径 .如果被插函数属于H2 (K) ,在L2 (K)模下的插值误差为O(h2 K) ,在H1 (K)模下的误差为O(hK)。 相似文献
6.
7.
通过对Q4元增加一个非协调高阶项.构造了一类新的非协调四边形单元,并证明由此产生的单元对任意四边形网格通过Irons分片检查和广义分片检查,且形状函敷不依赖于单元本身.QM5是其中的一个特例.数值结果表明,该类单元有很好的收敛效果. 相似文献
8.
电报方程H~1-Galerkin非协调混合有限元分析 总被引:5,自引:3,他引:2
主要研究一类电报方程的H~1-Galerkin非协调混合有限元方法,在任意四边形网格剖分下,其逼近空间分别取为类Wilson元与双线性Q_1元,在不需要满足LBB相容性条件及不采用传统的Ritz投影的情况下,得到了与常规有限元方法相同的L~2-模和H~1-模的误差估计,进一步拓展了H~1-Galerkin混合有限元和类Wilson元的应用范围. 相似文献
9.
利用分析specht元的技巧,构造了一类新的非协调四边形单元,并证明由此产生的有限元对任意四边形网格收敛且效果同Wilson元.QP6元是其中的特例 相似文献
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11.
1.IntroductionShiZhongci[']hasshownthattheWilsonelementonarbitraryquadrilateralmesheswasconvergelltunderacertainconditionwithoutmodificationsofthevariationalformulation.P.LesaintandM.Zlamal[2]gaveamathematicalanalysisoftheconvergenceofthemodifiedWilsonelemeflt.Withtheseideas,thispapergivestwosimplevariationalformulationsforthequadrilateralWilsonelementandshowstheirconvergencewiththenewvariationalformulations.Usingthenewvariationalformulations,wecanreduceourcomputationalcostsbecausetwotermsa… 相似文献
12.
给出了一族轴对称问题的改进Wilson元,利用强分片检验证明了其收敛性,讨论了单元函数结构·从而给出了一种构造收敛的轴对称非协调元方法· 相似文献
13.
Zhangxin Chen 《Numerical Methods for Partial Differential Equations》2002,18(2):203-217
In this article we prove uniform convergence estimates for the recently developed Galerkin‐multigrid methods for nonconforming finite elements for second‐order problems with less than full elliptic regularity. These multigrid methods are defined in terms of the “Galerkin approach,” where quadratic forms over coarse grids are constructed using the quadratic form on the finest grid and iterated coarse‐to‐fine intergrid transfer operators. Previously, uniform estimates were obtained for problems with full elliptic regularity, whereas these estimates are derived with less than full elliptic regularity here. Applications to the nonconforming P1, rotated Q1, and Wilson finite elements are analyzed. The result applies to the mixed method based on finite elements that are equivalent to these nonconforming elements. © 2002 Wiley Periodicals, Inc. Numer Methods Partial Differential Eq 18: 203–217, 2002; DOI 10.1002/num.10004 相似文献
14.
Shaochun Chen Huixia Sun Shipeng Mao 《高等学校计算数学学报(英文版)》2006,15(2):180-192
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 … 相似文献
15.
本文利用带约束非协调旋转Q_1元逼近Reissner-Mindlin板问题中旋度的两个分量.并分别选择Wilson元、双线性元和带约束非协调旋转Q_1元逼近挠度,相应地选取不连续的矢量值分片线性函数空间、最低阶旋转Raviart-Thomas元空间和矢量值分片常数函数空间为离散的剪应力空间,在矩形网格上构造了三个板元.通过证明一个离散的Korn不等式,并借助MITC4元的解构造了旋度、挠度和剪应力一个具有某种特殊且关键的可交换性的插值.再利用Helmholtz分解分析相容性误差.我们证明了这三个矩形元在能量范数意义下与板厚无关的一致最优收敛性.数值算例验证了我们的理论结果. 相似文献
16.
It is well known that it is comparatively difcult to design nonconforming fnite elements on quadrilateral meshes by using Gauss-Legendre points on each edge of triangulations.One reason lies in that these degrees of freedom associated with these Gauss-Legendre points are not all linearly independent for usual expected polynomial spaces,which explains why only several lower order nonconforming quadrilateral fnite elements can be found in literature.The present paper proposes two families of nonconforming fnite elements of any odd order and one family of nonconforming fnite elements of any even order on quadrilateral meshes.Degrees of freedom are given for these elements,which are proved to be well-defned for their corresponding shape function spaces in a unifying way.These elements generalize three lower order nonconforming fnite elements on quadrilaterals to any order.In addition,these nonconforming fnite element spaces are shown to be full spaces which is somehow not discussed for nonconforming fnite elements in literature before. 相似文献
17.
Sobolev型方程Wilson元解的高精度分析 总被引:1,自引:0,他引:1
本文利用积分恒等式和插值后处理等技术对 Sobolev型方程 Wilson非协调有限元解进行了高精度算法分析 ,获得了解的超逼近性质和插值有限元解的整体超收敛 .在此基础上 ,运用外推与校正方法进一步获得了具有更高精度的近似解及后验误差估计 . 相似文献
18.
Summary A modified variational formulation, recently introduced by Taylor, Beresford and Wilson for solving second order problems, using the nonconforming Wilson element is here analysed. It is shown that the Patch Test is satisfied and that stresses and displacements are respectively first and second order accurate for arbitrary quadrilateral meshes. 相似文献