Generalized buckling analysis of laminated plates with random material properties using stochastic finite elements

A generalized layer-wise stochastic finite element formulation is developed for the buckling analysis of both homogeneous and laminated plates with random material properties. The pre-buckled stresses are considered in the derivation of geometric stiffness matrix and the effect of variation in these stresses on the mean and coefficient of variation of buckling strength is studied. The mean buckling strength of plates under uniform stress assumption exactly matches with those reported in the literature. However, it is shown that the actual mean buckling strength of plates can be significantly different based on the pre-buckled stress analysis which depends on boundary constraints, principal material directions, aspect and thickness ratios of plates. The statistics of buckling strength is determined using a Taylor series expansion based mean centered first order perturbation technique. The stochastic finite element solutions obtained using layer-wise plate theory is also validated with analytical solutions presented in this paper. Parametric studies are conducted for different aspect ratios, ply orientations and boundary conditions.

[1]  Hiroyuki Matsunaga,et al.  Vibration and stability of angle-ply laminated composite plates subjected to in-plane stresses , 2001 .

[2]  Humberto Contreras,et al.  The stochastic finite-element method , 1980 .

[3]  Prodyot K. Basu,et al.  Higher‐order finite element modelling of laminated composite plates , 1994 .

[4]  Gajbir Singh,et al.  Buckling of moderately thick rectangular composite plates subjected to partial edge compression , 1998 .

[5]  Bruce R. Ellingwood,et al.  Effects of Uncertain Material Properties on Structural Stability , 1995 .

[6]  Masanobu Shinozuka,et al.  Random Eigenvalue Problems in Structural Analysis , 1971 .

[7]  Jae-Hoon Kang,et al.  Exact solutions for vibration and buckling of an SS-C-SS-C rectangular plate loaded by linearly varying in-plane stresses , 2002 .

[8]  G. Venkateswara Rao,et al.  Stability of laminated composite plates subjected to various types of in-plane loadings , 1996 .

[9]  Hiroyuki Matsunaga,et al.  Vibration and stability of cross-ply laminated composite plates according to a global higher-order plate theory , 2000 .

[10]  S. C. Lin,et al.  Buckling failure analysis of random composite laminates subjected to random loads , 2000 .

[11]  Aditi Chattopadhyay,et al.  Dynamic instability of composite laminates using a higher order theory , 2000 .

[12]  Ayo O. Abatan,et al.  Buckling behavior of a graphite/epoxy composite plate under parabolic variation of axial loads , 2003 .

[13]  George Stefanou,et al.  Stochastic finite element analysis of shells , 2002 .

[14]  Michael P. Nemeth,et al.  Buckling of long compression-loaded anisotropic plates restrained against inplane lateral and shear deformations , 2003 .

[15]  Buckling of composite plates by global–local plate theory , 2001 .

[16]  J. N. Reddy,et al.  Buckling and vibration of laminated composite plates using various plate theories , 1989 .

[17]  Carlos A. Mota Soares,et al.  Buckling behaviour of laminated composite structures using a discrete higher-order displacement model , 1996 .

[18]  J. Z. Zhu,et al.  The finite element method , 1977 .

[19]  N. Iyengar,et al.  Initial buckling of composite cylindrical panels with random material properties , 2001 .

[20]  Shigeru Nakagiri,et al.  Uncertain Eigenvalue Analysis of Composite Laminated Plates by the Stochastic Finite Element Method , 1987 .

[21]  N.G.R. Iyengar,et al.  Natural frequencies of composite plates with random material properties using higher-order shear deformation theory , 2001 .

[22]  J. N. Reddy,et al.  Energy and variational methods in applied mechanics , 1984 .

[23]  George Stefanou,et al.  Stochastic finite element analysis of shells with combined random material and geometric properties , 2004 .

[24]  Barna A. Szabó,et al.  Hierarchic models for laminated plates and shells , 1999 .

[25]  J. Reddy,et al.  Stability and vibration of isotropic, orthotropic and laminated plates according to a higher-order shear deformation theory , 1985 .

[26]  Aditi Chattopadhyay,et al.  Three-dimensional elasticity solution for buckling of composite laminates , 2000 .

[27]  I. Elishakoff Uncertain buckling: its past, present and future , 2000 .

[28]  R. Cook,et al.  Concepts and Applications of Finite Element Analysis , 1974 .