基于加权残量法的多变量等参元简明列式及其应用

A concise formulation of multivariable isoparametric elements based on weighted residual approach and its applications

下载PDF

导出

摘要根据作者提出的建立多变量有限元模型的系统化方法[11],应用加权残量法的基本原理,给出了建立多变量等参元模型的简明列式。然后应用该列式,构造了简明有效的平面四结点多变量等参元MQ4和MQ5,前者不含内部自由度,后者含有内部自由度。文中结合若干典型算例对所构造的单元性能进行了考核,并与若干典型协调与非协调等参元的数值结果进行了比较。数值结果表明,无论是在规则网格还是在不规则网格情况下,本文构造的多变量等参元,不仅能通过分片检验的要求,而且表现出了良好的性能。 The research on isoparametric elements make significant sense in the development of finite element method. A concise formulation of multivariable isoparametric elements was present based on the rational principle of residual approach and the systematic method of constructing multivariable finite elements suggested by Shi Baojun. Then two concise and efficient plane four-node multivariable isoparametric elements MQ-4 and MQ-5 were constructed by this formulation. The former one, i.e. element MQ-4, does not contain internal degree of freedom. The later one, i.e. element MQ-5, contains one internal degree of freedom. The elements performances were examined by some typical numerical examples. Their numerical results were compared with those of other typical conforming and nonconforming isoparametric elements. The numerical results show that the multivariable isoparametric elements present in this paper can pass the patch test requirements and also possess high performance either in the case of regular mesh or that of irregular mesh.

作者史宝军袁明武孟王旬宋传增

机构地区山东建筑工程学院计算力学研究所北京大学力学与工程科学系

出处《计算力学学报》 CAS CSCD 北大核心 2004年第4期481-486,共6页 Chinese Journal of Computational Mechanics

基金山东省自然科学基金(Y2002A04)资助项目.

关键词加权残量法等参元多变量等参元内部自由度 weighted residual approach isoparametric elements multivariable isoparametric element internal degree of freedom

分类号 O242.21 [理学—计算数学]

引文网络
相关文献

参考文献9

1[1]Wilson E L, Taylor R L, Doherty W P, et al.Incompatible Displacement Models[A]. Numerical and Computer Methods in Structural Mechanics [M]. New York: Academic Press, 1973: 43-57.
2[2]Taylor R L, Beresford P L, Wilson E L. A nonconforming element for stress analysis [J]. Int J Num Meth Engng, 1976,10(6): 1211-1219.
3[3]Wachspress E L. Incompatible quadrilateral basis functions[J]. Int J Num Meth Engng, 1978, 12(4) :589-595.
4[6]Pian T H H, Wu C C. General Formulation of Incompatible Shape Function and an Incompatible Isoparametric Element[A]. Proc of the Invitational China: American Workshop on FEM [C],Chengde, 1986:159-165.
5[9]Cheung Y K, Chen Wanji. Refined hybrid method for plane isoparametric element using an orthogonal approach [J]. Comput & Struct, 1992,42(5): 683-694. (in Chinese))
6[10]Engel G, Garikipati K, Hughes T J R, et al.Continuous/discontinuous finite element approximations of fourth-order elliptic problems in structural and continuum mechanics with applications to thin beams and plates, and strain gradient elasticity[J].Comput Methods Appl Mech Engng , 2002,191: 3669-3750.
7[11]Shi Baojun, Lu Xiaoyang, Xu Huanran. A new and unified approach for the formulation of multivariable finite elements[J]. Commun Numer Methods Engng ,1999,15 (9): 661-667.
8[14]Pian T H H. Derivation of element stiffness matrices by assumed stress distributions[J]. AIAA J, 1964,2(2):1333-1336.
9[15]Pian T H H,Chen D P,Kang D. A new formulation of hybrid/mixed finite element[J]. Comput &Struct,1983,16:81-87.

1夏永旭.加权残量法在我国的最新进展[J].力学进展,1996,26(3):407-415. 被引量：5
2史宝军,袁明武,等.平面四结点多变量非协调等参元[J].工程力学,2001,18(A01):307-311.
3何吉欢.关于“非线性Duffing方程的高精度近似解”一文的商榷[J].力学与实践,2000,22(4):67-68.
4史宝军,鹿晓阳.加权残量法在建立多变量有限元模型中的应用[J].固体力学学报,2000,21(1):40-48.
5焦兆平,盛勇,吴长春.内参型非协调元合理位移场的研究[J].工程力学,1998,15(2):1-10. 被引量：6
6史宝军,鹿晓阳,孟王旬,汲淑丽,韩善灵,杨乐宇.简明有效的四结点多变量协调等参元[J].山东建筑工程学院学报,1999,14(3):65-70.
7赵金土.量子力学中的复哈密顿量[J].大学物理,1984,0(7):47-48.
8张雄,胡炜,潘小飞,陆明万.加权最小二乘无网格法[J].力学学报,2003,35(4):425-431. 被引量：40
9史宝军,鹿晓阳,许焕然.建立杂交/混合元模型的一种简明列式方法及其在薄板弯曲问题中的应用[J].工程力学,1999,16(5):113-118.
10张鹏花,周德亮.一维无网格局部Petrov-Galerkin法[J].科技信息,2011(35):475-476.

计算力学学报

2004年第4期

浏览历史

内容加载中请稍等...

基于加权残量法的多变量等参元简明列式及其应用

参考文献9

相关作者

相关机构

相关主题

浏览历史