LI Rui, TIAN Yu, ZHENG Xinran, WANG Bo. A Symplectic Superposition Method for Bending Problems of Free-Edge Rectangular Thick Plates Resting on Elastic Foundations[J]. Applied Mathematics and Mechanics, 2018, 39(8): 875-891. doi: 10.21656/1000-0887.390186
Citation: LI Rui, TIAN Yu, ZHENG Xinran, WANG Bo. A Symplectic Superposition Method for Bending Problems of Free-Edge Rectangular Thick Plates Resting on Elastic Foundations[J]. Applied Mathematics and Mechanics, 2018, 39(8): 875-891. doi: 10.21656/1000-0887.390186

A Symplectic Superposition Method for Bending Problems of Free-Edge Rectangular Thick Plates Resting on Elastic Foundations

doi: 10.21656/1000-0887.390186
Funds:  The National Basic Research Program of China(973 Program)(2014CB049000);The National Natural Science Foundation of China(11302038)
  • Received Date: 2018-06-28
  • Publish Date: 2018-08-15
  • Based on the symplectic superposition method proposed in recent years, the bending problems of free-edge rectangular thick plates resting on elastic foundations were analytically solved. The original problem was split into 3 subproblems corresponding to the bending problems of rectangular thick plates with 2 opposite edges slidingly clamped and resting on elastic foundations, which were solved with the symplectic geometry method. The analytic solution of the original problem was then obtained through superposition. Compared to the conventional analytic approaches such as the semi-inverse method, the symplectic superposition method has the advantages of both rationality of the symplectic method and regularity of the superposition method. The solution procedure starts from the basic equations of elasticity, and a rigorous derivation yields the analytic solutions, thus extending the scope of problems to be solved. The present method can serve as an effective analytic approach to complex boundary value problems of high-order partial differential equations in elasticity, as represented by the rectangular plate problems.
  • loading
  • [1]
    MINDLIN R D. Influence of rotary inertia and shear on flexural motions of isotropic, elastic plates[J]. Journal of Applied Mechanics,1951,18(1): 31-38.
    [2]
    LOK T S, CHENG Q H. Bending and forced vibration response of a clamped orthotropic thick plate and sandwich panel[J]. Journal of Sound & Vibration,2001,245(1): 63-78.
    [3]
    HENWOOD D J, WHITEMAN J R, YETTRAM A L. Finite difference solution of a system of first-order partial differential equations[J]. International Journal for Numerical Methods in Engineering,1981,17(9): 1385-1395.
    [4]
    BUCZKOWSKI R, TORBACKI W. Finite element modelling of thick plates on two-parameter elastic foundation[J]. International Journal for Numerical and Analytical Methods in Geomechanics,2001,25(14): 1409-1427.
    [5]
    SHEN P, HE P. Bending analysis of rectangular moderately thick plates using spline finite element method[J].Computers & Structures,1995,54(6): 1023-1029.
    [6]
    PEREIRA W L A, KARAM V J, CARRER J A M, et al. A dynamic formulation for the analysis of thick elastic plates by the boundary element method[J]. Engineering Analysis With Boundary Elements,2012,36(7): 1138-1150.
    [7]
    LIEW K M, HAN J B. Bending solution for thick plates with quadrature boundary[J]. Journal of Engineering Mechanics,1998,124(1): 9-17.
    [8]
    LIU F L, LIEW K M. Differential cubature method for static solutions of arbitrarily shaped thick plates[J].International Journal of Solids and Structures,1998,35(28/29): 3655-3674.
    [9]
    CIVALEK . Three-dimensional vibration, buckling and bending analyses of thick rectangular plates based on discrete singular convolution method[J]. International Journal of Mechanical Sciences,2007,49(6): 752-765.
    [10]
    FERREIRA A J M, CASTRO L M S, BERTOLUZZA S. Analysis of plates on Winkler foundation by wavelet collocation[J]. Meccanica,2011,46(4): 865-873.
    [11]
    L C F, LIM C W, CHEN W Q. Semi-analytical analysis for multi-directional functionally graded plates: 3-D elasticity solutions[J]. International Journal for Numerical Methods in Engineering,2010,79(1): 25-44.
    [12]
    YAO W, ZHONG W, LIM C W. Symplectic Elasticity[M]. Singapore: World Scientific, 2009.
    [13]
    LI R, ZHONG Y, LI M. Analytic bending solutions of free rectangular thin plates resting on elastic foundations by a new symplectic superposition method[J]. Proceedings of the Royal Society A: Mathematical Physical & Engineering Sciences,2013,469(2153): 20681.
    [14]
    LI R, NI X Q, CHEN G G. Symplectic superposition method for benchmark flexure solutions for rectangular thick plates[J]. Journal of Engineering Mechanics,2015,141(2): 04014119.
    [15]
    LI R, WANG B, LI G. Benchmark bending solutions of rectangular thin plates point-supported at two adjacent corners[J]. Applied Mathematics Letters,2015,40: 53-58.
    [16]
    LI R, WANG P, TIAN Y, et al. A unified analytic solution approach to static bending and free vibration problems of rectangular thin plates[J]. Scientific Reports,2015,5: 17054.
    [17]
    WANG B, LI P, LI R. Symplectic superposition method for new analytic buckling solutions of rectangular thin plates[J]. International Journal of Mechanical Science s, 2016,119: 432-441.
    [18]
    LI R, TIANY, ZHENGX, et al. New analytic bending solutions of rectangular thin plates with a corner point-supported and its adjacent corner free[J]. European Journal of Mechanics: A/Solids,2017,66: 103-113.
    [19]
    LI R, WANG P, ZHENG X, et al. New benchmark solutions for free vibration of clamped rectangular thick plates and their variants[J]. Applied Mathematics Letters,2017,78: 88-94.
    [20]
    LI R, WANG P, WANG B, et al. New analytic free vibration solutions of rectangular thick plates with a free corner by the symplectic superposition method[J]. Journal of Vibration and Acoustics,2018,140(3): 031016.
    [21]
    LI R, ZHENG X, WANG H, et al. New analytic buckling solutions of rectangular thin plates with all edges free[J]. International Journal of Mechanical Sciences,2018,144: 67-73.
  • 加载中

Catalog

    通讯作者: 陈斌, bchen63@163.com
    • 1. 

      沈阳化工大学材料科学与工程学院 沈阳 110142

    1. 本站搜索
    2. 百度学术搜索
    3. 万方数据库搜索
    4. CNKI搜索

    Article Metrics

    Article views (1510) PDF downloads(972) Cited by()
    Proportional views
    Related

    /

    DownLoad:  Full-Size Img  PowerPoint
    Return
    Return