MATEC Web Conf.
Volume 151, 20182017 Asia Conference on Mechanical and Aerospace Engineering (ACMAE 2017)
|Number of page(s)||5|
|Section||Material Performance Analysis and Testing|
|Published online||21 February 2018|
- A. M. Zenkour, A comprehensive analysis of functionally graded sandwich plates:part 2-Buckling and free vibration, Int J Solids Struct. 42, 5243-5258 (2005). [CrossRef] [Google Scholar]
- A. M. Zenkour, M. Sobhy, Thermal buckling of various types of FGM sandwich plates, Compos Struct. 93(1), 93-112 (2010) [CrossRef] [Google Scholar]
- Q. Li, V.P. Iu, K.P. Kou, hree-dimensional vibration analysis of functionally graded material sandwich plates, J Sound Vib. 311, 498-515 (2008) [CrossRef] [Google Scholar]
- L.Dozio, Natural frequencies of sandwich plates with FGM core via variable-kinematic 2-D Ritz models, Compos Struct. 96, 561-568 (2013) [CrossRef] [Google Scholar]
- A.M.A.Neves, A.J.M.Ferreira, E.Carrera, M. Cinefra, C.M.C. Roque, R.M.N.Jorge, et al., Static, free vibration and buckling analysis of analysis of isotropic and sandwich functionally graded plates using a quasi-3D higher-order shear deformation theory and a meshless technique, Compos Part B: Eng. 44(1), 657-674 (2013) [CrossRef] [Google Scholar]
- Fiorenzo A. Fazzolari, Erasmo Carrera, Free vibration analysis of sandwich plates with anisotropic face sheets in thermal environment by using the hierarchical trigonometric Ritz formulation, Composites: Part B 50, 67-81 (2013) [Google Scholar]
- Fiorenzo A. Fazzolari, Natural frequencies and critical temperatures of functionally graded sandwich plates subjected to uniform and non-uniform temperature distributions, Composite Structures 121, 197-210 (2015) [CrossRef] [Google Scholar]
- X.W.Wang, Z.X.Yuan, Accurate stress analysis of sandwich panels by differential quadrature method, Applied Mathematical Modeling 43, 548-565 (2017) [Google Scholar]
- J. H.Zhang, and W. Zhang, Multi-pulse chaotic dynamics of non-autonomous nonlinear system for a honeycomb sandwich plate, Acta Mechanica 223, 1047-1066 (2012) [Google Scholar]
- W. Zhang, J. E.Chen., D. X.Cao, L.H. Chen, Nonlinear dynamic responses of a truss core sandwich plate. Composite Structures 108, 367-386 (2014) [CrossRef] [Google Scholar]
- R.Bellman, B.G.Kashef, J.Casti, Differential quadrature: a technique for the rapid solution of nonlinear partial differential equations. Journal of Computational Physics 10, 40-52 (1972) [CrossRef] [Google Scholar]
- C.W. Bert, S.K. Jang, A.G.Striz, Two new approximate methods for analyzing free vibration of structural components, AIAA Journal 26, 612-618 (1988) [CrossRef] [Google Scholar]
- C.W. Bert, S.K. Jang, A.G.Striz, Nonlinear bending analysis of orthotropic rectangular plates by the method of differential quadrature, Computational Mechanics 5, 217-226 (1989) [CrossRef] [Google Scholar]
- P.Malekzadeh, G.Karami, Differential quadrature nonlinear analysis of skew composite plates based on FSDT, Engineering Structures 28, 1307-1318 (2006) [CrossRef] [Google Scholar]
- A.Alibeigloo, R.Madoliat, Static analysis of cross-ply laminated plates with integrated surface piezoelectric layers using differential quadrature, Composite Structures 88, 342-353 (2009) [CrossRef] [Google Scholar]
- J.E.Jam, S. Maleki, A.Andakhshideh, Non-linear bending analysis of moderately thick fundtionally graded plates using generalized differential quadrature method, International Journal of Aerospace Sciences 1, 49-56 (2011) [Google Scholar]
- P.Li, Y.R.Yang, L.Lu, Instability analysis of two-dimensional thin panels in subsonic flow with differential quadrature method, Journal of Dynamics and Control 10, 11-14 (2012) [Google Scholar]
- Y.F.Zhou, Z.M.Wang, Application of the differential quadrature method to free vibration of viscoelastic thin plate with linear thickness variation, Meccanica 49, 2817–2828 (2014) [Google Scholar]
- B.Laxmi, S.Chakraverty, Application of Differential Quadrature method in free vibration analysis of nanobeams based on various nonlocal theories, Computers and Mathematics with Applications 69, 1444-1462 (2015) [CrossRef] [Google Scholar]
- X.W.Wang, Z.X.Yuan, Accurate stress analysis of sandwich panels by the differential quadrature method, Applied Mathematical Modelling 43, 548-565, (2017) [Google Scholar]
- W. Zhang, D.M.Wang, M.H.Yao, Using fourier differential quadrature method to analyze transverse nonlinear vibrations of an axially accelerating viscoelastic beam, Nonlinear Dyn 78, 839-856 (2014) [CrossRef] [Google Scholar]
- C.Shu, Differential Quadrature and its Application in Engineering. (Springer, Berlin 2000) [Google Scholar]
Current usage metrics show cumulative count of Article Views (full-text article views including HTML views, PDF and ePub downloads, according to the available data) and Abstracts Views on Vision4Press platform.
Data correspond to usage on the plateform after 2015. The current usage metrics is available 48-96 hours after online publication and is updated daily on week days.
Initial download of the metrics may take a while.