Litcius/Paper detail

Size effect in piezoelectric semiconductor nanostructures

J. Sládek, V. Sládek, Miroslav� Repka, Ernian Pan

2021Journal of Intelligent Material Systems and Structures35 citationsDOI

Abstract

A gradient theory is applied to the mechanical constitutive equations for piezoelectric semiconductor nanostructures. This is achieved by considering the strain gradients in the constitutive equation with high-order stresses and electric displacements in advanced continuum model. The C 1 continuous interpolations of displacements or a mixed formulation is required in the finite element method (FEM) due to the presence of the second-order derivative on the elastic displacements. A mixed FEM is then developed from the principle of virtual work. Numerical examples clearly show the significant effect of flexoelectricity on the induced electric potential and electric current in the piezoelectric semiconductor nanostructures.

Topics & Concepts

FlexoelectricityPiezoelectricityFinite element methodMaterials scienceSemiconductorConstitutive equationNanostructureElectric potentialPiezoelectric coefficientClassical mechanicsElectric fieldMechanicsComposite materialPhysicsStructural engineeringNanotechnologyOptoelectronicsEngineeringVoltageQuantum mechanicsNonlocal and gradient elasticity in micro/nano structuresThermoelastic and Magnetoelastic PhenomenaComposite Material Mechanics