References
- Y. Miyamoto, W.A. Kaysser, B.H. Rabin, A. Kawasaki, and R.G. Ford, Functionally Graded Materials: Design, Processing and Applications, Kluwer Academic Publishers, New York, 1999.
- S. Suresh and A. Mortensen, Fundamentals of Functionally Graded Materials: Processing and Thermomechanical Behaviors of Graded Metals and Metal-Ceramic Composites, IOM Communications, London Ltd, London, 1998.
- A.M. Zenkour and N.A. Alghamdi, Bending analysis of functionally graded sandwich plates under the effect of mechanical and thermal loads, Mech. Adv. Mater. Struct., vol. 17, pp. 419–432, 2010.
- A.M. Zenkour and N.A. Alghamdi, Thermoelastic bending analysis of functionally graded sandwich plates, J. Mater. Sci., vol. 43, pp. 2574–2589, 2008.
- X.H. Wu, C. Chen, Y.P. Shen, and X.G. Tian, A high order theory for functionally graded piezoelectric shells, Int. J. Solids Struct., vol. 39, pp. 5325–5344, 2002.
- E. Carrera, Theories and finite elements for multilayered plates and shells: A unified compact formulation with numerical assessment and benchmarks, Arch. Comput. Methods Eng., vol. 10, pp. 215–296, 2003.
- E. Carrera and M. Boscolo, Classical and mixed finite elements for static and dynamic analysis of piezoelectric plates, Int. J. Numer. Methods Eng., vol. 70, pp. 1135–1181, 2007.
- S. Brischetto, R. Leetsch, E. Carrera, T. Wallmersperger, and B. Kroplin, Thermo-mechanical bending of functionally graded plates, J. Therm. Stresses, vol. 31, pp. 286–308, 2008.
- M. Cinefra, E. Carrera, S. Brischetto, and S. Belouettar, Thermo-mechanical analysis of functionally graded shells, J. Therm. Stresses, vol. 33, pp. 942–963, 2010.
- P.C. Dumir, P. Kumari, and S. Kapuria, Assessment of third order smeared and zigzag theories for buckling and vibration of flat angle-ply hybrid piezoelectric panels, Compos. Struct., vol. 90, pp. 346–362, 2009.
- S. Kapuria, P.C. Dumir, and S. Sengupta, Assessment of shell theories for hybrid piezoelectric cylindrical shell under thermoelectric load, J. Therm. Stresses, vol. 21, pp. 519–544, 1998.
- S. Kapuria, S. Sengupta, and P.C. Dumir, Assessment of shell theories for hybrid piezoelectric cylindrical shell under electromechanical load, Int. J. Mech. Sci., vol. 40, pp. 461–477, 1998.
- A. Alibeigloo, Three-dimensional exact solution for functionally graded rectangular plate with integrated surface piezoelectric layers resting on elastic foundation, Mech. Adv. Mater. Struct., vol. 17, pp. 183–195, 2010.
- A. Alibeigloo and W.Q. Chen, Elasticity solution for an FGM cylindrical panel integrated with piezoelectric layers, Eur. J. Mech. A, vol. 29, pp. 714–723, 2010.
- A. Alibeigloo, Static analysis of a functionally graded cylindrical shell with piezoelectric layers as sensor and actuator, Smart Mater. Struct., vol. 18, art. 065004, 2010.
- G.M. Kulikov and S.V. Plotnikova, A new approach to three-dimensional exact solutions for functionally graded piezoelectric laminated plates, Compos. Struct., vol. 106, pp. 33–46, 2013.
- G.M. Kulikov and S.V. Plotnikova, Exact electroelastic analysis of functionally graded piezoelectric shells, Int. J. Solids Struct., vol. 51, pp. 13–25, 2014.
- G.M. Kulikov and S.V. Plotnikova, A sampling surfaces method and its implementation for 3D thermal stress analysis of functionally graded plates, Compos. Struct., vol. 120, pp. 315–325, 2015.
- C.P. Wu and R.Y. Jiang, The 3D coupled analysis of FGPM circular hollow sandwich cylinders under thermal loads, J. Intell. Mater. Syst. Struct., vol. 22, pp. 691–712, 2011.
- C.P. Wu and S.E. Huang, Three-dimensional solutions of functionally graded piezo-thermo-elastic shells and plates using a modified Pagano method, Comput. Mater. Continua, vol. 12, pp. 251–282, 2009.
- C.P. Wu and T.C. Tsai, Exact solutions of functionally graded piezoelectric material sandwich cylinders by a modified Pagano method, Appl. Math. Model., vol. 36, pp. 1910–1930, 2012.
- C.P. Wu and Y.S. Syu, Exact solutions of functionally graded piezoelectric shells under cylindrical bending, Int. J. Solids Struct., vol. 44, pp. 6450–6472, 2007.
- C.P. Wu and Y.H. Tsai, Cylindrical bending vibration of functionally graded piezoelectric shells using the method of perturbation, J. Eng. Math., vol. 63, pp. 95–119, 2009.
- C.P. Wu and Y.H. Tsai, Asymptotic DQ solutions of functionally graded annular spherical shells, Eur. J. Mech. A, vol. 23, pp. 283–299, 2004.
- C.P. Wu and Y.H. Tsai, Dynamic responses of functionally graded magneto-electro-elastic shells with closed-circuit surface conditions using the method of multiple scales, Eur. J. Mech. A, vol. 29, pp. 166–181, 2010.
- Z.S. Shao, Mechanical and thermal stresses of a functionally graded circular hollow cylinder with finite length, Int. J. Press. Vess. Pip., vol. 82, pp. 155–163, 2005.
- C.F. Lü, C.W. Lim, and W.Q. Chen, Exact solutions for free vibrations of functionally graded thick plates on elastic foundations, Mech. Adv. Mater. Struct., vol. 16, pp. 576–584, 2009.
- Z. Zhong, S. Chen, and E. Shang, Analytical solution of a functionally graded plate in cylindrical bending, Mech. Adv. Mater. Struct., vol. 17, pp. 595–602, 2010.
- A. Alibeigloo and V. Nouri, Static analysis of functionally graded cylindrical shell with piezoelectric layers using differential quadrature method, Compos. Struct., vol. 92, pp. 1775–1785, 2010.
- A.B. Rad and A. Alibeigloo, Semi-analytical solution for the static analysis of 2D functionally graded solid and annular circular plates resting on elastic foundation, Mech. Adv. Mater. Struct., vol. 20, pp. 515–528, 2013.
- R.A. Alashti and M. Khorsand, Three-dimensional dynamo-thermo-elastic analysis of a functionally graded cylindrical shell with piezoelectric layers by DQ-FD coupled, Int. J. Press. Vess. Pip., vol. 96, pp. 49–67, 2012.
- R.A. Alashti and M. Khorsand, Three-dimensional thermo-elastic analysis of a functionally graded cylindrical shell with piezoelectric layers by differential quadrature method, Int. J. Press. Vess. Pip., vol. 88, pp. 167–180, 2011.
- J.H. Zhang and S.R. Li, Free vibration of functionally graded truncated conical shells using the GDQ method, Mech. Adv. Mater. Struct., vol. 20, pp. 61–73, 2013.
- T.T. Yu, S. Yin, T.Q. Bui, and S. Hirose, A simple FSDT-based isogeometric analysis for geometrically nonlinear analysis of functionally graded plates, Finite Elem. Anal. Des., vol. 96, pp. 1–10, 2015.
- M.K. Singha, T. Prakash, and M. Ganapathi, Finite element analysis of functionally graded plates under transverse load, Finite Elem. Anal. Des., vol. 47, pp. 453–460, 2011.
- L.V. Tran, C.H. Thai, and H. Nguyen-Xuan, An isogeometric finite element formulation for thermal buckling analysis of functionally graded plates, Finite Elem. Anal. Des., vol. 73, pp. 65–76, 2013.
- H.T. Thai and D.H. Choi, Finite element formulation of various four unknown shear deformation theories for functionally graded plates, Finite Elem. Anal. Des., vol. 75, pp. 50–61, 2013.
- M. Shakeri and R. Mirzaeifar, Static and dynamic analysis of thick functionally graded plates with piezoelectric layers using layerwise finite element model, Mech. Adv. Mater. Struct., vol. 16, pp. 561–575, 2009.
- S. Xiang, Y.T. Chen, and G.W. Kang, Local collocation method for prediction of natural frequency of functionally graded cylindrical shells, Mech. Adv. Mater. Struct., vol. 22, pp. 969–977, 2015.
- E. Carrera, S. Brischetto, M. Cinefra, and M. Soave, Refined and advanced models for multilayered plates and shells embedding functionally graded material layers, Mech. Adv. Mater. Struct., vol. 17, pp. 603–621, 2010.
- C.P. Wu, K.H. Chiu, and Y.M. Wang, A review on the three-dimensional analytical approaches of multilayered and functionally graded piezoelectric plates and shells, Comput. Mater. Continua, vol. 8, pp. 93–132, 2008.
- D.A. Saravanos and P.R. Heyliger, Mechanics and computational models for laminated piezoelectric beams, plates, and shells, Appl. Mech. Rev., vol. 52, pp. 305–320, 1999.
- C.P. Wu and Y.C. Liu, A review of semi-analytical numerical methods for laminated composite and multilayered functionally graded elastic/piezoelectric plates and shells, Compos. Struct., vol. 147, pp. 1–15, 2016.
- E. Reissner, On a certain mixed variational theorem and a proposed application, Int. J. Numer. Methods Eng., vol. 20, pp. 1366–1368, 1984.
- E. Reissner, On a mixed variational theorem and on a shear deformable plate theory, Int. J. Numer. Methods Eng., vol. 23, pp. 193–198, 1986.
- S. Brischetto and E. Carrera, Refined 2D models for the analysis of functionally graded piezoelectric plates, J. Intell. Mater. Syst. Struct., vol. 20, pp. 1783–1797, 2009.
- C.P. Wu and W.W. Lai, Reissner's mixed variational theorem-based nonlocal Timoshenko beam theory for a single-walled carbon nanotube embedded in an elastic medium and with various boundary conditions, Compos. Struct., vol. 122, pp. 390–404, 2015.
- C.P. Wu and W.W. Lai, Free vibration of an embedded single-walled carbon nanotube with various boundary conditions using the RMVT-based nonlocal Timoshenko beam theory and DQ method, Physica E, vol. 68, pp. 8–21, 2015.
- C.P. Wu and H.Y. Li, The RMVT- and PVD-based finite layer methods for the three-dimensional analysis of multilayered composite and FGM plates, Compos. Struct., vol. 92, pp. 2476–2496, 2010.
- C.P. Wu and H.Y. Li, RMVT-based finite cylindrical prism methods for multilayered functionally graded circular hollow cylinders with various boundary conditions, Compos. Struct., vol. 100, pp. 592–608, 2013.
- C.P. Wu and Y.T. Chang, A unified formulation of RMVT-based finite cylindrical layer methods for sandwich circular hollow cylinders with an embedded FGM layer, Composites Part B, vol. 43, pp. 3318–3333, 2012.
- C.P. Wu, Y.C. Chen, and S.T. Peng, Buckling analysis of functionally graded material circular hollow cylinders under combined axial compression and external pressure, Thin-Walled Struct., vol. 69, pp. 54–66, 2013.
- C.P. Wu, S.T. Peng, and Y.C. Chen, RMVT- and PVD-based finite cylindrical layer methods for the three-dimensional buckling analysis of multilayered FGM cylinders under axial compression, Appl. Math. Model., vol. 38, pp. 233–252, 2014.
- S. Kapuria, S. Sengupta, and P.C. Dumir, Three-dimensional solutions for simply-supported piezoelectric cylindrical shell for axisymmetric load, Comput. Methods Appl. Mech. Eng., vol. 140, pp. 139–155, 1997.
- C.P. Wu, Y.S. Syu, and J.Y. Lo, Three-dimensional solutions of multilayered piezoelectric hollow cylinders by an asymptotic approach, Int. J. Mech. Sci., vol. 49, pp. 669–689, 2007.