https://orcid.org/0000-0003-0019-6851
References
- Noor AK. Free vibrations of multilayered composite plates. AIAA J. 1972;11(7):1038–1039.
- Reddy JN. A simple higher-order theory for laminated composite plates. J Appl Mech. 1984;51:745–752.
- Swaminathan K, Patil SS. Analytical solutions using a higher order refined computational model with 12 degrees of freedom for the free vibration analysis of antisymmetric angle-ply plates. Compos Struct. 2008;82:209–216.
- Akgoz B, Civalek O. Nonlinear vibration analysis of laminated plates resting on nonlinear two-parameters elastic foundations. Steel Compos Struct. 2011;11(5):403–421.
- Phan ND, Reddy JN. Analysis of laminated composite plates using a higher order shear deformation theory. Int J Numer Methods Eng. 1985;21:2201–2219.
- Mahapatra TR, Kar VR, Panda SK. Nonlinear free vibration analysis of laminated composite doubly curved shell panel in hygrothermal environment. J Sand Struct Mater. 2015;17(5):511–545.
- Rath MK, Sahu SK. Dynamic response of composite plates in hygrothermal environment. J Multiscale Model. 2012;4(3):1250009.
- Rao VVS, Sinha PK. Dynamic response of multidirectional composites in hygrothermal environments. Compos Struct. 2004;64:329–338.
- Zhen W, Xiaohui R. Finite element analysis of hygrothermal effects on angle-ply composite plates. J Compos Mater. 2016;50(16):2215–2233.
- Whitney JM, Ashton JE. Effect of environment on the elastic response of layered composite plates. AIAA J. 1971;9:1708–1713.
- Ram KSS, Sinha PK. Hygrothermal effects on the vibration of laminated plates. J Sound Vib. 1992;158:133–148.
- Huang X-L, Shen H-S, Zheng J-J. Nonlinear vibration and dynamic response of shear deformable laminated plates in hygrothermal environments. Compos Sci Tech. 2004;64:1419–1435.
- Ribeiroa P, Jansen E. Non-linear vibrations of laminated cylindrical shallow shells under thermomechanical loading. J Sound Vib. 2008;315:626–640.
- Patel BP, Ganapathi M, Makhecha DP. Hygrothermal effects on the structural behaviour of thick composite laminates using higher-order theory. Compos Struct. 2002;56:25–34.
- Wu Z, Xu Q, Lu S, et al. A refined five-unknown higher-order model including transverse normal hygrothermal deformation. Compos Struct. 2016;152:546–557.
- Shimpi RP. Refined plate theory and its variants. AIAA J. 2002;40(1):137–146.
- Shimpi RP, Patel HG. A two variable refined plate theory for orthotropic plate analysis. Int J Solids Struct. 2006;43:6783–6799.
- Shimpi RP, Patel HG. Free vibrations of plate using two variable refined plate theory. J Sound Vib. 2006;296:979–999.
- Thai HT, Kim SE. Free vibration of laminated composite plates using two variable refined plate theory. Int J Mech Sci. 2010;52:626–633.
- Bouazza M, Lairedj A, Benseddiq N, et al. A refined hyperbolic shear deformation theory for thermal buckling analysis of cross-ply laminated plates. Mech Res Commun. 2016;73:117–126.
- Narendar S. Buckling analysis of micro-/nano-scale plates based on two variable refined plate theory incorporating nonlocal scale effects. Compos Struct. 2011;93:3093–3103.
- Zaoui FZ, Ouinas D, Tounsi A. New 2D and quasi-3D shear deformation theories for free vibration of functionally graded plates on elastic foundations. Compos Part B. 2019;159:231–247.
- Becheri T, Amara K, Bouazza M, et al. Buckling of symmetrically laminated plates using nth-order shear deformation theory with curvature effects. Steel Compos Struct. 2016;21(6):1347–1368.
- Bounouara F, Benrahou KH, Belkorissat I, et al. A nonlocal zeroth-order shear deformation theory for free vibration of functionally graded nanoscale plates resting on elastic foundation. Steel Compos Struct. 2016;20(2):227–249.
- Thai HT, Choi DH. An efficient and simple refined theory for buckling analysis of functionally graded plates. Appl Math Mode. 2012;36:1008–1022.
- Mashat DS, Zenkour AM, Radwan AF. A quasi-3D higher-order plate theory for bending of FG plates resting on elastic foundations under hygro-thermo-mechanical loads with porosity. Europ J Mech / A Solids. 2020;82:103985. https://www.sciencedirect.com/science/journal/09977538/82/supp/C.
- Belarbi M-O, Zenkour AM, Tati A, et al. An efficient eight-node quadrilateral element for free vibration analysis of multilayer sandwich plates. Int J Numer Methods Eng. doi:10.1002/nme.6624
- Bouazza M, Kenouza Y, Benseddiq N, et al. A two-variable simplified nth-higher-order theory for free vibration behavior of laminated plates. Compos Struct. 2017;182:533–541.
- Xiang S, Jin YX, Bi ZY, et al. A n-order shear deformation theory for free vibration of functionally graded and composite sandwich plates. Compos Struct. 2011;93:2826–2832.
- Zenkour AM. Hygrothermal effects on the bending of angle-ply composite plates using a sinusoidal theory. Compos Struct. 2012;94(12):3685–3696.
- Zenkour AM. Hygrothermal analysis of exponentially graded rectangular plates. J Mech Mater Struct. 2012;7(7):687–700.
- Al Khateeb SA, Zenkour AM. A refined four-unknown plate theory for advanced plates resting on elastic foundations in hygrothermal environment. Compos Struct. 2014;111(1):240–248.
- Mashat DS, Zenkour AM. Hygrothermal bending analysis of a sector-shaped annular plate with variable radial thickness. Compos Struct. 2014;113:446–458.
- Zenkour AM. Simplified theory for hygrothermal response of angle-ply composite plates. AIAA J. 2014;52(7):1466–1473.
- Bouazza M, Becheri T, Boucheta A, et al. Thermal buckling analysis of nanoplates based on nonlocal elasticity theory with four-unknown shear deformation theory resting on Winkler–Pasternak elastic foundation. Int J Comput Methods Eng Sci Mech. 2016;17(5–6):362–373.
- Ellali M, Amara K, Bouazza M, et al. The buckling of piezoelectric plates on Pasternak elastic foundation using higher-order shear deformation plate theories. Smart Struct Sys. 2018;21(1):113–122.
- Zenkour AM. Bending of thin rectangular plates with variable-thickness in a hygrothermal environment. Thin-Walled Struct. 2018;123:333–340.
- Bouazza M, Becheri T, Boucheta A, et al. Bending behavior of laminated composite plates using the refined four-variable theory and the finite element method. Earthq Struct. 2019;17(3):257–270.
- Zenkour AM, Sobhy M. Nonlocal piezo-hygrothermal analysis for vibration characteristics of a piezoelectric Kelvin–Voigt viscoelastic nanoplate embedded in a viscoelastic medium. Acta Mech. 2018;229(1):3–19.
- Carrera E. A class of two dimensional theories for multilayered plates analysis. Atti Accademia delle Scienze di Torino, Memorie Scienze Fisiche. 1995;19–20:49–87.
- Carrera E. Multilayered shell theories that account for a layer-wise mixed description. Part I. Governing equations. AIAA J. 1999;37:1107–1116.
- Carrera E. Multilayered shell theories that account for a layer-wise mixed description. Part ii. Numerical evaluations. AIAA J. 1999;37:1117–1124.
- Brischetto S, Leetsch R, Carrera E, et al. Thermo-mechanical bending of functionally graded plates. J Therm Stresses. 2008;31(3):286–308.
- Ferreira AJM, Roque CMC, Carrera E, et al. Analysis of thick isotropic and cross-ply laminated plates by radial basis functions and a Unified Formulation. J Sound Vib. 2011;330:771–787.
- Carrera E, Petrolo M, Zappino E. Performance of CUF approach to analyze the structural behavior of slender bodies. J Struct Eng. 2012;138:285–298.
- Pagani A, Carrera E, Boscolo M, et al. Refined dynamic stiffness elements applied to free vibration analysis of generally laminated composite beams with arbitrary boundary conditions. Compos Struct. 2014;110:305–316.
- Keshava Kumar S, Harursampath D, Carrera E, et al. Modal analysis of delaminated plates and shells using Carrera Unified Formulation – MITC9 shell element. Mech Advanc Mater Struct. 2018;25(8):681–697.
- Wu B, Pagani A, Chen WQ, et al. Geometrically nonlinear refined shell theories by Carrera Unified Formulation. Mech Advanc Mater Struct. doi:10.1080/15376494.2019.1702237
- Carrera E, Zozulya VV. Carrera unified formulation (CUF) for the micropolar plates and shells. II. Complete linear expansion case. Mech Advanc Mater Struct. doi:10.1080/15376494.2020.1793242
- Cinefra M, de Miguel AG, Filippi M, et al. Homogenization and free-vibration analysis of elastic metamaterial plates by Carrera Unified Formulation finite elements. Mech Advanc Mater Struct. doi:10.1080/15376494.2019.1578005
- Nouri Z, Sarrami-Foroushani S, Azhari F, et al. Application of Carrera unified formulation in conjunction with finite strip method in static and stability analysis of functionally graded plates. Mech Advanc Mater Struct. doi:10.1080/15376494.2020.1762265