Flexoelectric effects in second-order extension of rods

[1]  Jiashi Yang,et al.  Effects of mechanical fields on mobile charges in a composite beam of flexoelectric dielectrics and semiconductors , 2020 .

[2]  A. Giannakopoulos,et al.  Dynamics of Flexoelectric Materials: Subsonic, Intersonic, and Supersonic Ruptures and Mach Cone Formation , 2020, Journal of Applied Mechanics.

[3]  Bing-Bing Wang,et al.  Theoretical analysis on the extension of a piezoelectric semi-conductor nanowire: Effects of flexoelectricity and strain gradient , 2020 .

[4]  S. Shen,et al.  Rayleigh wave propagation in a homogeneous centrosymmetric flexoelectric half-space. , 2020, Ultrasonics.

[5]  Zhong Lin Wang,et al.  Boosting the Solar Cell Efficiency by Flexo-photovoltaic Effect? , 2019, ACS nano.

[6]  Baolin Wang,et al.  Anti-plane fracture mechanics analysis of a piezoelectric material layer with strain and electric field gradient effects , 2019 .

[7]  A. J. Gil,et al.  On a family of numerical models for couple stress based flexoelectricity for continua and beams , 2019, Journal of the Mechanics and Physics of Solids.

[8]  S. Shen,et al.  Lamb wave propagation with flexoelectricity and strain gradient elasticity considered , 2018, Smart Materials and Structures.

[9]  M. Alexe,et al.  Flexo-photovoltaic effect , 2018, Science.

[10]  S. Shen,et al.  Wave Propagation in Flexoelectric Microstructured Solids , 2018 .

[11]  C. Yang,et al.  Electromechanical coupling in piezoelectric nanobeams due to the flexoelectric effect , 2017 .

[12]  Y. Beni Size-dependent analysis of piezoelectric nanobeams including electro-mechanical coupling , 2016 .

[13]  S. Shen,et al.  A Timoshenko dielectric beam model with flexoelectric effect , 2016 .

[14]  Pradeep Sharma,et al.  Flexoelectricity: A Perspective on an Unusual Electromechanical Coupling , 2016 .

[15]  Wenjun Yang,et al.  Electromechanical responses of piezoelectric nanoplates with flexoelectricity , 2015 .

[16]  Amir Abdollahi Hosnijeh,et al.  Revisiting pyramid compression to quantify flexoelectricity: a three-dimensional simulation study , 2015 .

[17]  A. Erturk,et al.  Nanoscale flexoelectric energy harvesting , 2014 .

[18]  B. Wu,et al.  One-dimensional equations for coupled extensional, radial, and axial-shear motions of circular piezoelectric ceramic rods with axial poling , 2014 .

[19]  S. Shen,et al.  Effects of surface and flexoelectricity on a piezoelectric nanobeam , 2014 .

[20]  S. Shen,et al.  SIZE-DEPENDENT PIEZOELECTRICITY AND ELASTICITY DUE TO THE ELECTRIC FIELD-STRAIN GRADIENT COUPLING AND STRAIN GRADIENT ELASTICITY , 2013 .

[21]  P. Sharma,et al.  Erratum: Piezoelectric thin-film super-lattices without using piezoelectric materials [J. Appl. Phys. 108, 024304 (2010)] , 2012 .

[22]  Huan Xue,et al.  The effects of first-order strain gradient in micro piezoelectric-bimorph power harvesters , 2011, IEEE Transactions on Ultrasonics, Ferroelectrics and Frequency Control.

[23]  Shuling Hu,et al.  A theory of flexoelectricity with surface effect for elastic dielectrics , 2010 .

[24]  C. Landis,et al.  Piezoelectric thin-film superlattices without using piezoelectric materials , 2010, 1003.2745.

[25]  A. Tagantsev,et al.  Novel Electromechanical Phenomena at the Nanoscale: Phenomenological Theory and Atomistic Modeling , 2009 .

[26]  R. Maranganti,et al.  Atomistic determination of flexoelectric properties of crystalline dielectrics , 2009, 0903.0684.

[27]  Neha Sharma,et al.  Electromechanical coupling in nonpiezoelectric materials due to nanoscale nonlocal size effects: Green's function solutions and embedded inclusions , 2006 .

[28]  L. Eric Cross,et al.  Flexoelectricity of barium titanate , 2006 .

[29]  L. Eric Cross,et al.  Flexoelectric effects: Charge separation in insulating solids subjected to elastic strain gradients , 2006 .

[30]  L. Eric Cross,et al.  Flexoelectric effect in ceramic lead zirconate titanate , 2005 .

[31]  L. Eric Cross,et al.  Flexoelectric polarization of barium strontium titanate in the paraelectric state , 2002 .

[32]  Raymond D. Mindlin,et al.  A One-Dimensional Theory of Compressional Waves in an Elastic Rod , 1989 .

[33]  S. Dost,et al.  A strain-gradients theory of elastic dielectrics with spatial dispersion , 1988 .

[34]  A. Tagantsev,et al.  Piezoelectricity and flexoelectricity in crystalline dielectrics. , 1986, Physical review. B, Condensed matter.

[35]  A. Tagantsev A theory of the flexoelectric effect in crystals , 1985 .

[36]  H. D. McNiven,et al.  AXIALLY SYMMETRIC WAVES IN ELASTIC RODS , 1960 .