Finite element analysis for general elastic multi-structures 被引量：1

Finite element analysis for general elastic multi-structures

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摘要 A finite element method is introduced to solve the general elastic multi-structure problem, in which the displacements on bodies, the longitudinal displacements on plates and the longitudinal displacements on beams are discretized using conforming linear elements, the rotational angles on beams are discretized using conforming elements of second order, the transverse displacements on plates and beams are discretized by the Morley elements and the Hermite elements of third order, respectively. The generalized Korn's inequality is established on related nonconforming element spaces, which implies the unique solvability of the finite element method. Finally, the optimal error estimate in the energy norm is derived for the method. A finite element method is introduced to solve the general elastic multi-structure problem, in which the displacements on bodies, the longitudinal displacements on plates and the longitudinal displacements on beams are discretized using conforming linear elements, the rotational angles on beams are discretized using conforming elements of second order, the transverse displacements on plates and beams are discretized by the Morley elements and the Hermite elements of third order, respectively. The generalized Korn's inequality is established on related nonconforming element spaces, which implies the unique solvability of the finite element method. Finally, the optimal error estimate in the energy norm is derived for the method.

作者 HUANG Jianguo, SHI Zhongci & XU Yifeng Department of Mathematics, Shanghai Jiao long University, Shanghai 200240, China Division of Computational Science, E-lnstitute of Shanghai Universities, Shanghai Normal University, Shanghai 200234, China Institute of Computational Mathematics, Academy of Mathematics and Systems Science, Chinese Academy of Sciences, Beijing 100080, China Department of Mathematics, Chinese University of Hong Kong, Shatin, N. T., Hong Kong, China

出处《Science China Mathematics》 SCIE 2006年第1期109-129,共21页 中国科学：数学（英文版）

基金 supported by the National Natural Science Foundation(Grant No.10371076) E-Institutes of Shanghai Municipal Education Commission(Grant No.E03004) The Science Foundation of Shanghai(Grant No.04JC14062).

关键词 ELASTIC multi-structures FINITE elements generalized Korn's inequality UNIQUE solvability error estimates. elastic multi-structures, finite elements, generalized Korn's inequality, unique solvability, error estimates.

分类号 O343 [理学—固体力学]

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参考文献2

1石钟慈.关于Morley元的误差估计[J].计算数学,1990,12(2):113-118. 被引量：44
2HUANG Jianguo,SHI Zhongci,XU Yifeng.Some studies on mathematical models for general elastic multi-structures[J].Science China Mathematics,2005,48(7):986-1007. 被引量：3

二级参考文献2

1Frédéric d’Hennezel.Domain decomposition method and elastic multi-structures: The stiffened plate problem[J].Numerische Mathematik.1993(1)
2Feng,K.Elliptic equations on composite manifold and composite elastic structures, Math[].Numer Sinica (in Chinese).1979

共引文献44

1Zhong-ci SHI~1 Xue-jun XU~(1+) Yun-qing HUANG~2 ~1 LSEC,Institute of Computational Mathematics,Academy of Mathematics and Systems Science,Chinese Academy of Sciences,Beijing 100080,China,~2 Hunan Key Laboratory for Computation and Simulation in Science and Engineering,Institute for Computational and Applied Mathematics,Xiangtan University,Xiangtan 411105,China.Economical cascadic multigrid method (ECMG)[J].Science China Mathematics,2007,50(12):1765-1780. 被引量：14
2LAI JunJiang1,HUANG JianGuo2,3,& SHI ZhongCi4 1Department of Mathematics,Minjiang University,Fuzhou 350108,China,2Department of Mathematics,Shanghai Jiao Tong University,Shanghai 200240,China,3Division of Computational Science,E-Institute of Shanghai Universities,Shanghai Normal University,Shanghai 200234,China,4Institute of Computational Mathematics,Academy of Mathematics and Systems Science,Chinese Academy of Sciences,Beijing 100190,China.A lumped mass finite element method for vibration analysis of elastic plate-plate structures[J].Science China Mathematics,2010,53(6):1453-1474. 被引量：1
3YANG YiDu,CHEN Zhen.The order-preserving convergence for spectral approximation of self-adjoint completely continuous operators[J].Science China Mathematics,2008,51(7):1232-1242. 被引量：9
4冷向.关于 Petersson 非协调矩形板元的误差分析[J].安徽建筑工业学院学报（自然科学版）,1998,0(1):3-16. 被引量：1
5徐林荣.关于MZ1元、MZ2元和MB1元的误差估计[J].高校应用数学学报（A辑）,1993,8(3):262-272.
6冷向.非协调、非常规Kirchhoff板元的统一分析——抽象误差分析的数学理论[J].安徽建筑工业学院学报（自然科学版）,2000,8(1):1-15.
7吴端恭,陈绍春.右端项f∈H^(-1)情况下十二参矩形板元的误差估计式[J].工程数学学报,1998,15(3):74-78.
8SHIDongyang,CHENShaochun,IchiroHagiwara.HIGHLY NONCONFORMING FINITE ELEMENT APPROXIMATIONS FOR A FOURTH ORDER VARIATIONAL INEQUALITY WITH CURVATURE OBSTACLE[J].Journal of Systems Science & Complexity,2005,18(1):136-142. 被引量：1
9Shao-chunChen Yong-chengZhao Dong-yangShi.NON C^0 NONCONFORMING ELEMENTS FOR ELLIPTIC FOURTH ORDER SINGULAR PERTURBATION PROBLEM[J].Journal of Computational Mathematics,2005,23(2):185-198. 被引量：5
10黄建国,石钟慈,徐一峰.一般组合弹性结构的有限元分析[J].中国科学（A辑）,2005,35(10):1100-1119. 被引量：2

同被引文献2

1HUANG Jianguo,SHI Zhongci,XU Yifeng.Some studies on mathematical models for general elastic multi-structures[J].Science China Mathematics,2005,48(7):986-1007. 被引量：3
2石钟慈.关于Morley元的误差估计[J].计算数学,1990,12(2):113-118. 被引量：44

引证文献1

1LAI JunJiang1,HUANG JianGuo2,3,& SHI ZhongCi4 1Department of Mathematics,Minjiang University,Fuzhou 350108,China,2Department of Mathematics,Shanghai Jiao Tong University,Shanghai 200240,China,3Division of Computational Science,E-Institute of Shanghai Universities,Shanghai Normal University,Shanghai 200234,China,4Institute of Computational Mathematics,Academy of Mathematics and Systems Science,Chinese Academy of Sciences,Beijing 100190,China.A lumped mass finite element method for vibration analysis of elastic plate-plate structures[J].Science China Mathematics,2010,53(6):1453-1474. 被引量：1

二级引证文献1

1SUN JiaChang.Multi-neighboring grids schemes for solving PDE eigen-problems[J].Science China Mathematics,2013,56(12):2677-2700. 被引量：5

1LAI JunJiang1,HUANG JianGuo2,3,& SHI ZhongCi4 1Department of Mathematics,Minjiang University,Fuzhou 350108,China,2Department of Mathematics,Shanghai Jiao Tong University,Shanghai 200240,China,3Division of Computational Science,E-Institute of Shanghai Universities,Shanghai Normal University,Shanghai 200234,China,4Institute of Computational Mathematics,Academy of Mathematics and Systems Science,Chinese Academy of Sciences,Beijing 100190,China.A lumped mass finite element method for vibration analysis of elastic plate-plate structures[J].Science China Mathematics,2010,53(6):1453-1474. 被引量：1
2HUANG Jianguo,SHI Zhongci,XU Yifeng.Some studies on mathematical models for general elastic multi-structures[J].Science China Mathematics,2005,48(7):986-1007. 被引量：3
3王高峰,侯杰昌,冯德光.THE INTERACTION OF EM WAVE WITH DIELECTRIC BODIES——HYBRID EQUATION FINITE ELEMENT METHOD[J].Science China Mathematics,1992,35(1):110-121.
4李龙元.THEORY OF PERTURBATION FINITE ELEMENT ANALYSIS FOR SOLUTION OF NONLINEAR BUCKLING CRITICAL LOADS OF STRUCTURES[J].Science China Mathematics,1989,32(5):564-569.
5SONG Hui,PENG YingWei,TU DongSheng.Joint modeling of longitudinal proportional measurements and survival time with a cure fraction[J].Science China Mathematics,2016,59(12):2427-2442.
6陈飞武,黎乐民,陈志达,刘执平,梁珍璇.Application of STO basis sets to the finite element method in quantum chemistry[J].Progress in Natural Science:Materials International,1997,7(4):68-74.
7李振春,李子植,谢素英.THE COMPLEX FORM AND EXISTENCE THEOREM OF GENERALIZED SOLUTION FOR NONLINEAR ELLIPTIC SYSTEMS OF THIRD ORDER[J].四川师范大学学报（自然科学版）,1991,14(1):35-36.
8闻国椿.A new approach to quasilinear equations of mixed type in general domains[J].Progress in Natural Science:Materials International,1999,9(8):21-27.
9羊丹平.APPROXIMATION AND ITS OPTIMAL ERROR ESTIMATE OF DISPLACEMENT OF TWO-PHASE INCOMPRESSIBLE FLOW BY MIXED FINITE ELEMENT AND A MODIFIED METHOD OF CHARACTERISTICS[J].Chinese Science Bulletin,1990,35(20):1686-1689. 被引量：1
10朴五省,史希福.EXISTENCE AND UNIQUENESS OF TWO-POINT AND THREE-POINT BOUNDARY VALUE PROBLEMS FOR THIRD ORDER NONLINEAR DIFFERENTIAL EQUATIONS[J].Chinese Science Bulletin,1991,36(5):358-361. 被引量：1

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