Static bending and free vibration of a functionally graded piezoelectric microplate based on the modified couple-stress theory
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Ernian Pan | Y. S. Li | E. Pan
[1] Alireza Daneshmehr,et al. Modified couple stress theory applied to dynamic analysis of composite laminated beams by considering different beam theories , 2015 .
[2] M. Bahrami,et al. Size-dependent dynamic stability analysis of microbeams actuated by piezoelectric voltage based on strain gradient elasticity theory , 2015, Journal of Mechanical Science and Technology.
[3] M. Nikkhah-bahrami,et al. A discussion on incorporating the Poisson effect in microbeam models based on modified couple stress theory , 2015 .
[4] Jie Yang,et al. Axisymmetric postbuckling analysis of size-dependent functionally graded annular microplates using the physical neutral plane , 2014 .
[5] Woo-Young Jung,et al. A modified couple stress theory for buckling analysis of S-FGM nanoplates embedded in Pasternak elastic medium , 2014 .
[6] J. N. Reddy,et al. Nonlinear analysis of microstructure-dependent functionally graded piezoelectric material actuators , 2014 .
[7] F. F. Mahmoud,et al. Size-dependent bending analysis of Kirchhoff nano-plates based on a modified couple-stress theory including surface effects , 2014 .
[8] Gennady M. Kulikov,et al. A new approach to three-dimensional exact solutions for functionally graded piezoelectric laminated plates , 2013 .
[9] J. Reddy,et al. Analytical solutions for bending, vibration, and buckling of FGM plates using a couple stress-based third-order theory , 2013 .
[10] J. Reddy,et al. A non-classical third-order shear deformation plate model based on a modified couple stress theory , 2013 .
[11] M. Eslami,et al. Vibration of thermo-electrically post-buckled rectangular functionally graded piezoelectric beams , 2013 .
[12] J. Reddy,et al. Analysis of Mindlin micro plates with a modified couple stress theory and a meshless method , 2013 .
[13] J. Reddy,et al. Bending and vibration of functionally graded microbeams using a new higher order beam theory and the modified couple stress theory , 2013 .
[14] Huu-Tai Thai,et al. A SIZE-DEPENDENT FUNCTIONALLY GRADED SINUSOIDAL PLATE MODEL BASED ON A MODIFIED COUPLE STRESS THEORY , 2013 .
[15] I. Sevostianov,et al. Effective Properties of Heterogeneous Materials , 2013 .
[16] Mohsen Asghari,et al. Geometrically nonlinear micro-plate formulation based on the modified couple stress theory , 2012 .
[17] Sritawat Kitipornchai,et al. Free vibration of size-dependent Mindlin microplates based on the modified couple stress theory , 2012 .
[18] J. Reddy,et al. A NONLOCAL CURVED BEAM MODEL BASED ON A MODIFIED COUPLE STRESS THEORY , 2011 .
[19] J. Reddy. MICROSTRUCTURE-DEPENDENT COUPLE STRESS THEORIES OF FUNCTIONALLY GRADED BEAMS , 2011 .
[20] Ömer Civalek,et al. Strain gradient elasticity and modified couple stress models for buckling analysis of axially loaded micro-scaled beams , 2011 .
[21] Wanji Chen,et al. A modified couple stress model for bending analysis of composite laminated beams with first order shear deformation , 2011 .
[22] J. N. Reddy,et al. A non-classical Mindlin plate model based on a modified couple stress theory , 2011 .
[23] M. Asghari,et al. The modified couple stress functionally graded Timoshenko beam formulation , 2011 .
[24] S. Hirose,et al. Effects of covering layer thickness on Love waves in functionally graded piezoelectric substrates , 2011 .
[25] H. Noori,et al. The size-dependent vibration analysis of micro-plates based on a modified couple stress theory , 2011 .
[26] Liying Jiang,et al. Interaction of parallel dielectric cracks in functionally graded piezoelectric materials , 2010 .
[27] J. N. Reddy,et al. A Nonclassical Reddy-Levinson Beam Model Based on a Modified Couple Stress Theory , 2010 .
[28] F. Jin,et al. Propagation of Love waves in a functionally graded piezoelectric material (FGPM) layered composite system , 2009 .
[29] George C. Tsiatas,et al. A new Kirchhoff plate model based on a modified couple stress theory , 2009 .
[30] K. Lee,et al. Interaction between an electrically permeable crack and the imperfect interface in a functionally graded piezoelectric sensor , 2009 .
[31] J. N. Reddy,et al. A microstructure-dependent Timoshenko beam model based on a modified couple stress theory , 2008 .
[32] S. Kitipornchai,et al. Electro-mechanical frictionless contact behavior of a functionally graded piezoelectric layered half-plane under a rigid punch , 2008 .
[33] E. Pan,et al. On the screw dislocation in a functionally graded piezoelectric plane and half-plane , 2008 .
[34] S. Ueda. Functionally graded piezoelectric strip with a penny-shaped crack under electromechanical loadings , 2008 .
[35] Z. Zhong,et al. Vibration of a simply supported functionally graded piezoelectric rectangular plate , 2006 .
[36] S. K. Park,et al. Bernoulli–Euler beam model based on a modified couple stress theory , 2006 .
[37] A. Zenkour. Generalized shear deformation theory for bending analysis of functionally graded plates , 2006 .
[38] Andrew W. Mcfarland,et al. Role of material microstructure in plate stiffness with relevance to microcantilever sensors , 2005 .
[39] I. Sevostianov,et al. On quantitative characterization of microstructures and effective properties , 2005 .
[40] Fan Yang,et al. Experiments and theory in strain gradient elasticity , 2003 .
[41] Chunyu Li,et al. Antiplane Crack Problem in Functionally Graded Piezoelectric Materials , 2002 .
[42] P. Tong,et al. Couple stress based strain gradient theory for elasticity , 2002 .
[43] Quan Wang,et al. ON BUCKLING OF COLUMN STRUCTURES WITH A PAIR OF PIEZOELECTRIC LAYERS , 2002 .
[44] Romesh C. Batra,et al. Cylindrical Bending of Laminated Plates with Distributed and Segmented Piezoelectric Actuators/Sensors , 2000 .
[45] Paul R. Heyliger,et al. Exact Solutions for Simply Supported Laminated Piezoelectric Plates , 1997 .
[46] Jong S. Lee,et al. Exact electroelastic analysis of piezoelectric laminae via state space approach , 1996 .
[47] M. Touratier,et al. An efficient standard plate theory , 1991 .
[48] N. Pagano,et al. Exact Solutions for Rectangular Bidirectional Composites and Sandwich Plates , 1970 .
[49] W. T. Koiter. Couple-stresses in the theory of elasticity , 1963 .
[50] Raymond D. Mindlin,et al. Influence of couple-stresses on stress concentrations , 1963 .
[51] H. F. Tiersten,et al. Effects of couple-stresses in linear elasticity , 1962 .
[52] R. Toupin. Elastic materials with couple-stresses , 1962 .