Electrothermomechanical behavior of a radially polarized rotating functionally graded piezoelectric cylinder

Ghorbanpour, Ali; Loghman, Abbas; Abdollahitaheri, Ali; Atabakhshian, Vahid

doi:10.2140/jomms.2011.6.869

Cited by 7 publications

(7 citation statements)

References 15 publications

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“…Similar idea of using power function material properties can be found in numerous articles [9][10][11][12][13][14][15][16][17][18]. A few groups proposed different assumptions that [19][20][21] the material parameters were assumed as exponential function. For instance, the elastic stiffness was ij ij 0 ( ) In the above papers, material parameters (the elastic stiffness, piezoelectric coefficient and the dielectric constant) of FGPM cylinder are assumed to be power functions or exponential functions, which imply FGPM cylinder comprises of multi-layers.…”

Section: ( )mentioning

confidence: 92%

“…Furthermore, the distinction between the hoop stress and radial stress is discussed to decrease the pressure concentration in FGPM cylinder. x new variables about r F Hypergeometric function α, β, δ constants in hypergeometric function f i (i=1, 2, K., 6) coefficients in equation (19) P(r), Q(r) two linearly independent solutions of equation (22) G(r) a particular solution of equation (…”

Section: Introductionmentioning

confidence: 99%

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Revisiting the electroelastic solution for an FGPM thick-walled cylinder subjected to mechanical and electric loadings

Wang

Dui

Xin

2020

Mater. Res. Express

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Theoretical analysis for an empty thick-walled FGPM cylinder exposed to electric and mechanical loadings are investigated. The cylinder is a composite material composed of PZT4 and PVDF and the volume fraction of PZT4 is given by the power law with three controllable parameters which can cover more complex circumstances. The hypergeometric equation of the radial displacement is acquired by utilizing the Voigt method, and the solutions of the stresses and the electric potential are obtained after solving the radial displacement. The method in this paper is appropriate for real functionally graded piezoelectric materials and can avoid assumptions about unknown overall material parameters appeared in previous references. Finally, the impacts of the parameter n in volume fraction of FGPM cylinder on mechanical and electric behaviors are examined. Furthermore, the distinction between the hoop stress and radial stress is discussed to decrease the pressure concentration in FGPM cylinder. Nomenclature a, b inner and outer radii r radial coordinate c(r) volume fraction of material A c 0 , k, n material parameters in the volume fraction c(r) p a , p b internal and external pressures j a , j b internal and external electric potentials C ijkl i (i=1, 2) elastic modulus of the component e mij i (i=1, 2) piezoelectric tensor modulus of the component k mk i (i=1, 2) dielectric modulus of the component u radial displacement j electric potential e , r i ( ) e q i ( ) radial and hoop strains of the component e , r e q average radial and hoop strains of the cylinder s , r i ( ) s q , i ( ) s z i ( ) radial, hoop, and axial stresses of the component s , r s q , s z average radial, hoop, and axial stresses of the cylinder E , r i ( ) D r i ( ) radial electric field and electric displacement of the component E , r D r average radial electric field and electric displacement of the cylinder a(r), b(r), d(r), g(r), f (r), h(r), k(r) functions related to the volume fraction c(r)

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Section: ( )mentioning

confidence: 92%

Section: Introductionmentioning

confidence: 99%

Revisiting the electroelastic solution for an FGPM thick-walled cylinder subjected to mechanical and electric loadings

Wang

Dui

Xin

2020

Mater. Res. Express

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“…The FGM and FGPM layers properties are assumed to change along the thickness direction z as follows [18][19] :…”

Section: Theory and Formulationmentioning

confidence: 99%

Free vibration analysis of functionally graded laminated sandwich cylindrical shells integrated with piezoelectric layer

Irani-Rahaghi

Karroubi

Arefi

2016

Appl. Math. Mech.-Engl. Ed.

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An analytical method for the three-dimensional vibration analysis of a functionally graded cylindrical shell integrated by two thin functionally graded piezoelectric (FGP) layers is presented. The first-order shear deformation theory is used to model the electromechanical system. Nonlinear equations of motion are derived by considering the von Karman nonlinear strain-displacement relations using Hamilton's principle. The piezoelectric layers on the inner and outer surfaces of the core can be considered as a sensor and an actuator for controlling characteristic vibration of the system. The equations of motion are derived as partial differential equations and then discretized by the Navier method. Numerical simulation is performed to investigate the effect of different parameters of material and geometry on characteristic vibration of the cylinder. The results of this study show that the natural frequency of the system decreases by increasing the non-homogeneous index of FGP layers and decreases by increasing the non-homogeneous index of the functionally graded core. Furthermore, it is concluded that by increasing the ratio of core thickness to cylinder length, the natural frequencies of the cylinder increase considerably.

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“…The 1D exact solution of this problem was obtained on the assumption of long cylinder while properties of material changes in the thickness direction as well as stress distribution were studied. Ghorbanpour et al (2011), like Arefi and Rahimi (2012), conducted stress analysis in a cylinder with an exponential function expression for material non-homogeneity. The analysis of active control in vibrations for conical shells was carried out by Li et al (2012) using piezoelectric materials.…”

Section: Introductionmentioning

confidence: 99%

Electro-elastic analysis of functionally graded piezoelectric variable thickness cylindrical shells using a first-order electric potential theory and perturbation technique

Yaghoobi

Ghannad

2020

Journal of Intelligent Material Systems and Structures

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In this research, an analytical solution is presented for the functionally graded piezoelectric cylindrical variable wall thickness that is subjected to mechanical and electrical loading. The non-homogeneous distribution of materials is considered as a power function. The first-order electric potential theory, first-order shear deformation theory, and the energy method are used for extracting the system of governing equations. The solution is accomplished using the matched asymptotic expansion method of the perturbation technique. The effects of non-homogeneous properties on the electromechanical are discussed. Since the intensity of variations in the distribution of properties in functionally graded piezoelectric cylinders can be changed using non-homogeneity constant, the electromechanical behavior of the cylinder can be changed by non-homogeneity constant. By reducing the electric or displacement field in functionally graded piezoelectric cylinders, de-polarization or loss of piezoelectric properties may be averted. Results indicate that non-homogeneity constant has a significant effect on the electromechanical behavior. However, in some cases, the effects of non-homogeneity constant may be neglected. Comparing these results with those predicted by the plane elasticity theory and finite element method shows good agreement. In fact, the present solution can be considered as an objective function to optimize the properties and behavior.

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Electrothermomechanical behavior of a radially polarized rotating functionally graded piezoelectric cylinder

Cited by 7 publications

References 15 publications

Revisiting the electroelastic solution for an FGPM thick-walled cylinder subjected to mechanical and electric loadings

Revisiting the electroelastic solution for an FGPM thick-walled cylinder subjected to mechanical and electric loadings

Free vibration analysis of functionally graded laminated sandwich cylindrical shells integrated with piezoelectric layer

Electro-elastic analysis of functionally graded piezoelectric variable thickness cylindrical shells using a first-order electric potential theory and perturbation technique

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